Using moving total mortality counts to obtain improved estimates for the effect of air pollution on mortality.In many cities of the United States United States, officially United States of America, republic (2005 est. pop. 295,734,000), 3,539,227 sq mi (9,166,598 sq km), North America. The United States is the world's third largest country in population and the fourth largest country in area. , measurements of ambient Surrounding. For example, ambient temperature and humidity are atmospheric conditions that exist at the moment. See ambient lighting. particulate matter particulate matter n. Abbr. PM Material suspended in the air in the form of minute solid particles or liquid droplets, especially when considered as an atmospheric pollutant. Noun 1. air pollution (PM) are available only once every 6 days. Time-series studies conducted in these cities that investigate the relationship between mortality and PM are restricted to using a single day's PM as the measure of PM exposure. This is undesirable because current evidence suggests that the effects of PM on mortality are spread over multiple days. And studies have shown that using a single day's PM as the measure of PM exposure can result in estimates that have a large negative bias. In this article, I introduce a new model for estimating the mortality effects of PM when only every-sixth-day PM data are available. This new model uses information available in the daily mortality time series to infer otherwise lost information about the effect of PM on mortality over a period of more than a single day. This new model typically offers an increase in both statistical estimation estimation In mathematics, use of a function or formula to derive a solution or make a prediction. Unlike approximation, it has precise connotations. In statistics, for example, it connotes the careful selection and testing of a function called an estimator. precision and accuracy compared with existing models. Key words: air pollution, distributed lag model, mortality, particulate matter, time series. doi:10.1289/ehp.7774 available via http://dx.doi.org/[Online 10 May 2005] ********** Numerous time-series studies have investigated the association between daily mortality and some measure of daily ambient particulate matter air pollution (PM) (Chock et al. 2000; Cifuentes Cifuentes may refer to:
The company was founded in Böblingen in 1926 by Hanns Klemm, who had previously worked for both Zeppelin and the et al. 2000; Kwon Kwon is a Korean family name. List of famous Kwons
Ostro is the traditional Italian name of a southerly wind in the Mediterranean Sea, especially the Adriatic. et al. 1999; Roemer Roemer is a surname, and may refer to
In statistics, the generalized linear model (GLM) is a useful generalization of ordinary least squares regression. It relates the random distribution of the measured variable of the experiment (the (McCullagh and Nelder 1989) to concurrent time series of daily mortality, PM, and meteorologic me·te·or·ol·o·gy n. The science that deals with the phenomena of the atmosphere, especially weather and weather conditions. [French météorologie, from Greek covariates. The fitted models are then used to quantify Quantify - A performance analysis tool from Pure Software. the effect of PM on mortality. The general consensus from these studies is that a 2- or 3-day moving average of PM better describes the relationship between PM and mortality than does a single day's PM (Schwartz Schwartz is a Canadian spices brand. It is also a common surname and may refer to:
Historically, in the United States most monitors that measure PM operate on an every-sixth-day collection schedule (Ito et al. 1995). This is a consequence of the U.S. Environmental Protection Agency Environmental Protection Agency (EPA), independent agency of the U.S. government, with headquarters in Washington, D.C. It was established in 1970 to reduce and control air and water pollution, noise pollution, and radiation and to ensure the safe handling and often requiring PM concentrations to be collected only every sixth day. For most of the 108 cities contained in the National Morbidity morbidity /mor·bid·i·ty/ (mor-bid´it-e) 1. a diseased condition or state. 2. the incidence or prevalence of a disease or of all diseases in a population. mor·bid·i·ty n. , Mortality, and Air Pollution Study (NMMAPS NMMAPS National Morbidity, Mortality, and Air Pollution Study ) database (Peng et al. 2004), measurements of ambient PM < 10 [micro]m in diameter (P[M.sub.10]) are available only once every sixth day. Consequently, in most large cities in the United States, time-series studies conducted to investigate the health effects of PM cannot use a moving average of PM or a DLM See ILM. DLM - Distributed Lock Manager on distributed VMS systems. for PM. Instead, they must use a single day's PM as the measure of PM exposure. An example of this is the recent 90-city NMMAPS analysis that was restricted to using either a lag 0, lag 1, or lag 2 PM concentration as the measure of PM exposure (Dominici For other uses, see Christophe Dominici. Dominici is a progressive metal band that was formed in 2005 by ex-Dream Theater vocalist, Charlie Dominici. Dominici was an opening-act for three Dream Theater "Chaos in Motion Tour" concerts that were held in Croatia, et al. 2003). The constraint Constraint A restriction on the natural degrees of freedom of a system. If n and m are the numbers of the natural and actual degrees of freedom, the difference n - m is the number of constraints. of being able to use only a single day's PM is problematic. Studies have shown that using a single day's PM can result in a large underestimation of the relationship between PM and mortality (Roberts 2005; Schwartz 2000). The reason for this is that if the effects of PM on mortality last for > 1 day, a single-day PM exposure measure will detect the effect of PM only on 1 day's mortality. Even worse, the wrong single-day PM exposure measure may be used. Several PM mortality time-series studies have demonstrated that the effects of PM on mortality last for multiple days (Schwartz 2000; Zanobetti et al. 2003). In addition, toxicologic evidence has shown that the morbidity effects of PM can persist for > 1 day (Clarke Clarke , Arthur Charles Born 1917. British writer, scientist, and underwater explorer noted for his stories of space exploration. His works include 2001: A Space Odyssey (1968). et al. 1999). It has been shown that DLMs avoid the problems of underestimation experienced by single-day PM exposure measures. For this reason, it has been suggested that DLMs should be the preferred measure of PM exposure if daily PM measurements are available (Roberts 2005; Schwartz 2000). In this article, I introduce a model that typically improves both the accuracy and precision of the PM mortality effect estimates obtainable from time-series studies where PM measurements are available only every sixth day. This model uses the daily mortality time-series data to create a moving total mortality time series. The moving total mortality time series is then used in place of the current day's mortality time series in the subsequent analysis. Simulation studies will show that for estimating the mortality effects of PM, this model offers a substantial decrease in estimation variance The discrepancy between what a party to a lawsuit alleges will be proved in pleadings and what the party actually proves at trial. In Zoning law, an official permit to use property in a manner that departs from the way in which other property in the same locality and typically a decrease in estimation bias compared with the standard method of using the current day's mortality time series. With this new model, improved estimates of the effect of PM on mortality will be available for a large number of cities in the United States. This may in turn lead to a better understanding of the public health significance of PM exposure. Materials and Methods Materials The data used in this article were obtained from the publicly available NMMAPS database (Peng et al. 2004). The data extracted consist of concurrent daily time series of mortality, weather, and PM for Cook County, Illinois Cook County is a county located in the U.S. state of Illinois. As of 2000, the population was 5,376,741, making it the second largest county by population in the United States (after Los Angeles County, California), and accounting for 43. , and Allegheny County, Pennsylvania Allegheny County is a county in the southwestern part of the U.S. state of Pennsylvania. As of the 2000 census, the population was 1,281,666. The county seat is Pittsburgh. , for 1987-2000. The Allegheny Allegheny (ăl`əgā'nē, ăl`əgä'nē), river, 325 mi (523 km) long, rising in N central Pa., and flowing NW into N.Y., then SW through Pa. County data were subsequently truncated truncated adjective Shortened at the end of the year 1998 because PM measurements were unavailable from this time forward. The mortality time-series data, aggregated at the level of county, are nonaccidental daily deaths of individuals [greater than or equal to] 65 years of age. Deaths of nonresidents were excluded from the mortality counts. The weather time-series data are 24-hr averages of temperature and dew point dew point: see dew. temperature, computed from hourly observations. The measure of PM used was the ambient 24-hr concentration of P[M.sub.10], measured in micrograms per cubic meter Noun 1. cubic meter - a metric unit of volume or capacity equal to 1000 liters cubic metre, kiloliter, kilolitre metric capacity unit - a capacity unit defined in metric terms . P[M.sub.10] is the most commonly used measure of PM in air pollution mortality time-series studies. The Cook County PM time series of length 5,114 days had 251 days that were missing PM concentrations, and the Allegheny County PM time series of length 4,383 days had 24 days that were missing PM concentrations. The missing PM concentrations were imputed Attributed vicariously. In the legal sense, the term imputed is used to describe an action, fact, or quality, the knowledge of which is charged to an individual based upon the actions of another for whom the individual is responsible rather than on the individual's by taking the average of the previous and subsequent day's PM concentration. If either the previous or subsequent day's PM concentration was missing, the average was set equal to the nonmissing value. This method has previously been used to impute impute v. 1) to attach to a person responsibility (and therefore financial liability) for acts or injuries to another, because of a particular relationship, such as mother to child, guardian to ward, employer to employee, or business associates. missing PM concentrations (Roberts 2004). The missing PM concentrations were imputed because a DLM of PM will be fit to the data, and missing values In statistics, missing values are a common occurrence. Several statistical methods have been developed to deal with this problem. Missing values mean that no data value is stored for the variable in the current observation. propagate prop·a·gate v. 1. To cause an organism to multiply or breed. 2. To breed offspring. 3. To transmit characteristics from one generation to another. 4. by up to a factor of 5 when DLMs are used. Methods In many community time-series studies on the effect of PM on mortality, an additive additive In foods, any of various chemical substances added to produce desirable effects. Additives include such substances as artificial or natural colourings and flavourings; stabilizers, emulsifiers, and thickeners; preservatives and humectants (moisture-retainers); and Poisson log-linear model log-linear model a statistical model which models frequency counts in contingency tables by using an analysis of variance approach. is fit to the time series of observed mortality. Under this model, the daily mortality counts are modeled as independent Poisson random variables with a time-varying mean [[Mu].sub.t] on day t given by log([[Mu].sub.t]) = [confounders.sub.t] + [beta]P[M.sub.t]. [1] Here, [confounders.sub.t] represents other time-varying variables that are related to daily mortality. P[M.sub.t] is the time series containing the PM exposure measure, and [beta] is the effect of this PM exposure measure on mortality. Equation 1 will be referred to as the "standard model." Because of data limitations, the PM exposure measure used in the standard model is typically restricted to be a single day's PM rather than a moving average of PM or a DLM of PM. In this article, I assume that we are in such a situation; that is, only every-sixth-day PM measurements are available. As discussed above, using a single day's PM is undesirable because it can result in estimates that have a large negative bias. And even in the unlikely event that the effect of PM on mortality is concentrated on a single day, it is possible that the wrong single-day PM exposure measure will be used. These problems would be avoided if daily PM measurements were available, making it possible for a DLM of PM to be used. Daily mortality counts are available for cities in the NMMAPS database regardless of the sampling frequency used for PM. The model I introduce takes advantage of this fact by using information available in the daily mortality data to extract information about the effect of PM on mortality over a period of more than a single day, information otherwise unavailable with every-sixth-day PM measurements. To do this, I replace the current day's mortality count used in the standard model with a moving total mortality count. The moving total used is a forward-moving Adj. 1. forward-moving - moving forward advancing, forward progressive - favoring or promoting progress; "progressive schools" total, meaning that the current day's mortality count is replaced by the sum of the current day's mortality count, the next day's mortality, and so on, for some specified number of days. I use the term "k day moving total" to mean the sum of today's and the subsequent k - 1 days' mortality counts. Under this model, the k-day moving total mortality counts are modeled as independent Poisson random variables with a time varying mean [[Mu].sub.t, k] on day t given by log([[Mu].sub.t,k]) = [confounders.sub.t] + [beta]P[M.sub.t] [2] Here, [confounders.sub.t] has the same specification as in the standard model, and P[M.sub.t] is a single day's PM, as is the case for the standard model. Simulation studies will show that the mortality effect estimates for PM obtained from Equation 2 are typically both more accurate and more precise compared with those obtained from the standard model. Equation 2 will be referred to as the "moving total model." A heuristic argument The introduction to this article provides insufficient context for those unfamiliar with the subject matter. Please help [ improve the introduction] to meet Wikipedia's layout standards. You can discuss the issue on the talk page. for why the moving total model may provide more accurate estimates of the mortality effect of PM compared with the standard model is now provided. If the mortality effect of PM lasts for more than a single day, a day of high PM will cause not only the current day's mortality count to be elevated but also the mortality counts on subsequent days. By using a moving total mortality count, we are able to capture the increased mortality on subsequent days, information that is lost if only the current day's mortality count is used. Obviously, if daily PM measurements are available, the best way to capture the effect of PM on mortality is through a DLM of PM. However, in the more common situation where PM measurements are available only every sixth day, using a moving total mortality count provides a "poor person's" substitute for a DLM. Implementing the moving total model is no harder than implementing the standard model. To fit the moving total model instead of using the current day's mortality count ([d.sub.t]) as the response variable, as done in the standard model, a moving total mortality count ([d.sub.t,k]) is used instead, [d.sub.t,k] represents the k-day moving total mortality count for day t; that is, [d.sub.t,k] = [d.sub.t] + [d.sub.t+1] + 4 ... [d.sub.t+k-1]. Simulation Study The simulation study compares the statistical properties of the standard model for estimating the mortality effects of PM with those of the moving total model. In the simulations, the actual weather and PM data from Cook County are used. Although the weather and PM time series are actual, the corresponding mortality time series are generated using models that describe PM mortality effects. Realistic mortality generation. To conduct the simulations, we need a way to generate realistic mortality time series. I used a method previously shown to generate realistic mortality time series (Roberts 2005), which proceeds by estimating the effects of time, temperature, dew point temperature, and day of the week on mortality using the data from Cook County. This was done by fitting the following Poisson log-linear model similar to those used in previous NMMAPS analyses (Daniels Daniels is a surname that may refer to:
log([[Mu].sub.t]) = [Mu] + [S.sub.t1] (time, 7 df per year) + [S.sub.t2] ([temp.sub.0], 6 df) + [S.sub.t3] ([temp.sub.1-3, 6 df) + [S.sub.t4] ([dew.sub.0], 3 df) + [S.sub.t5] ([dew.sub.1-3], 3 df) + [gamma] DO[W.sub.t] [3] Here the subscript (1) In word processing and scientific notation, a digit or symbol that appears below the line; for example, H2O, the symbol for water. Contrast with superscript. (2) In programming, a method for referencing data in a table. t refers to the day of the study; [[Mu].sub.t] is the mean number of deaths on day t; the [S.sub.ti]( ) are smooth functions of time, temperature, and dew point temperature with the indicated degrees of freedom (the smooth functions are represented using natural cubic splines); [temp.sub.0] is the current day's mean 24-hr temperature; [temp.sub.1-3] is the average of the previous 3 days' 24-hr mean temperatures; [dew.sub.0] and [dew.sub.1-3] are similarly defined for the 24-hr mean dew point temperature; DO[W.sub.t] is a set of indicator variables for the day of the week. All the models in this article were fit using the glm function in R (version 2.0.0; R Development Core Team 2005). Once Equation 3 was fit, I extracted the estimated mean mortality counts, denoted [u.sub.fit, t]. The effects of PM on mortality were explicitly specified and incorporated in the generated mortality time series. I did this by generating mortality time series that were Poisson distributed with mean [PSI] on day t given by log([[PSI].sub.t]) = log([[Mu].sub.fit, t]) + [theta Theta A measure of the rate of decline in the value of an option due to the passage of time. Theta can also be referred to as the time decay on the value of an option. If everything is held constant, then the option will lose value as time moves closer to the maturity of the option. ]([[alpha].sub.0] P[M.sub.t] + [[alpha].sub.1] P[M.sub.t-1], + ... + [[alpha].sub.5] P[M.sub.t-5]). [4] Here P[M.sub.t-i] is the time series of lag i PM concentrations; [theta] is the total mortality effect of a unit increase in PM over time (1,000[theta] is approximately the percentage increase in mean daily mortality for each 10-[micro]g/[m.sup.3] increment To add a number to another number. Incrementing a counter means adding 1 to its current value. in PM), and [theta][[alpha].sub.i] is the mortality effect of a unit increase in PM at lag i. Equation 4 assumes the mortality effects of PM can last for a maximum of 6 days. Mortality time series were generated using various specifications for the "true" effect of PM on mortality in Equation 4. Because previous studies have shown that PM lags of more than a few days have little correlation with daily mortality (Schwartz 2000), the specifications used span a suite of plausible lag structures for the effect of PM on mortality: no effect, PM has no effect on mortality; single-day effect, the effect of PM on mortality is concentrated on a single day [the single days considered were the current day's PM (lag 0), the previous day's PM (lag 1), or the 2 day's previous PM (lag 2)]; moving average effect, the effect of PM on mortality depends on a moving average of PM [the moving averages considered were the average of the current and previous day's PM (lag 0-1), and the average of the current and previous 2 days' PM (lag 0-2)]; distributed lag effect, differential effects of PM on mortality over time were allowed. The distributed lag effects considered were as follows: [[alpha].sub.0] = 6/21, [[alpha].sub.1] = 5/21, [[alpha].sub.2] = 4/21, [[alpha].sub.3] = 3/21, [[alpha].sub.4] = 2/21, [[alpha].sub.5] = 1/21 [DLM 1] [[alpha].sub.0] = 3/6, [[alpha].sub.1] = 2/6, [[alpha].sub.2] = 1/6, [[alpha].sub.3] = 0, [[alpha].sub.4] = 0, [[alpha].sub.5] = 0 [DLM 2] [[alpha].sub.0] = 0, [[alpha].sub.1] = 5/15, [[alpha].sub.2] = 4/15, [[alpha].sub.3] = 3/15, [[alpha].sub.4] = 2/15, [[alpha].sub.5] = 1/15 [DLM 3] [[alpha].sub.0] = 8/15, [[alpha].sub.1] = 4/15, [[alpha].sub.2] = 2/15, [[alpha].sub.3] = 1/15, [[alpha].sub.4] = 0, [[alpha].sub.5] = 0 [DLM 4] For the moving average and distributed lag effects, five [theta] values corresponding to 0.25, 0.5, 1, 2, and 4% increases in mortality for each 10-[micro] g/[m.sup.3] increment in PM were used. For the single-day effects, four [theta] values corresponding to 0.25, 0.5, 1, and 2% increases in mortality for each 10-[micro]g/[m.sup.3] increment in PM were used. These values of [theta] span a plausible range for the total effect of PM on mortality. Fitting models to generated mortality. For each specification of the "true" effect of PM on mortality and [theta] combination 400 mortality time series were generated using Equation 4. Because we are interested in the situation where PM measurements are available only every sixth day, after the mortality time series were generated, I extracted every sixth PM measurement from the PM time series of length 5,114 days that was used to generate mortality. These 852 every-sixth-day PM measurements, assumed to be the only PM measurements available, were then used in both the standard model and moving total model to estimate the effect of PM on mortality ([theta]). The [confounders.sub.t] term in both the standard and moving total models had the same specification as the confounder con·found tr.v. con·found·ed, con·found·ing, con·founds 1. To cause to become confused or perplexed. See Synonyms at puzzle. 2. adjustment used in the mortality generating Equation 4. It is important to remember that in the NMMAPS database daily measurements are available for mortality, temperature, and dew point temperature irrespective of irrespective of prep. Without consideration of; regardless of. irrespective of preposition despite the sampling frequency used for PM. The standard model was fit to each generated mortality, time series using in turn the current day's PM (standard model - lag 0), the previous day's PM (standard model - lag 1), and the 2 day's previous PM (standard model - lag 2) as the PM exposure measure (P[M.sub.t] in Equation l). The moving total model was fit to each generated mortality time series using the current day's PM as the PM exposure measure (P[M.sub.t] in Equation 2) and 2-, 3-, 4-, and 5-day moving total mortality counts (k = 2, 3, 4, 5 in Equation 2). Moving total mortality counts with k > 5 were not considered because the current evidence suggests that mortality counts more than a few days forward have little association with the current day's PM concentration (Schwartz 2000). The standard and moving total models that are being fit to the generated mortality time series are identical except for the specification of the mortality response variable: For the standard models, a single day's mortality count is used, whereas for the moving total models a moving total mortality count is used. This means that for both the standard and moving total models, the same every-sixth-day PM time series is used. Results Tables 1 and 2 contain the results of the simulations. Table 1 contains the results for mortality generated using the no effect, single-day effect, and moving average effect specifications for the "true" effect of PM on mortality. Table 2 contains the results for the distributed lag effect specifications for the "true" effect of PM on mortality. These tables contain the standard deviation In statistics, the average amount a number varies from the average number in a series of numbers. (statistics) standard deviation - (SD) A measure of the range of values in a set of numbers. and bias of the estimates of the effect of PM on mortality ([theta]) obtained from the three forms of the standard model and the moving total models with k = 2, 3, and 4. A moving total model with k = 5 was also investigated, but the results for this model were not reported because it performed poorly compared with the moving total models with k = 2, 3, and 4. The reason for this is discussed further below. Tables 1 and 2 show that the moving total models always offer a substantial reduction in estimation variance compared with the standard models. The reduction in estimation variance increases as the number of days used in the moving total mortality count (k) increases. The reason for this is that as the number of days used in the moving total mortality count increases, the estimates for the effect of PM on mortality are based on successively more data. For a given model, the standard deviation remains constant across the simulations because the amount of data used remains constant. Tables 1 and 2 also show that the estimation bias is typically smaller for the moving total models than for the standard models. The smaller bias for the moving total models is a consequence of the moving total mortality counts allowing the moving total models to capture the effect of PM on more than a single day's mortality. This is something that is not possible with the standard models. For a given model, the bias increases as the total PM effect ([theta]) increases because the absolute amount of information lost by not observing the daily PM time series increases as [theta] increases. These results show that the moving total model offers a way to estimate the effect of PM on mortality that is both more precise (smaller variance) and typically more accurate (smaller bias) than the standard model. The results reported in Tables 1 and 2 suggest that a moving total model with k = 2 or k = 3 would be preferred to moving total models with k [greater than or equal to] 4. The reason for this is that k = 2 or k = 3 offers a better compromise between bias and variance. That is, the increased variance of using a moving total model with k = 2 or k = 3, as opposed to k [greater than or equal to] 4, is more than offset by a decrease in bias. This is supported by the fact that in the simulations the mean squared error In statistics, the mean squared error or MSE of an estimator is the expected value of the square of the "error." The error is the amount by which the estimator differs from the quantity to be estimated. (for brevity Brevity Adonis’ garden of short life. [Br. Lit.: I Henry IV] bubbles symbolic of transitoriness of life. [Art: Hall, 54] cherry fair cherry orchards where fruit was briefly sold; symbolic of transience. , values are not reported here) for the moving total models with k = 2 or k = 3 was typically smaller than the mean squared error for the moving total models with k = 4 or k = 5. The reason for the poorer performance of the moving total models with k [greater than or equal to] 4 was that in the simulations, because of evidence from previous studies (Schwartz 2000), the effect of PM on mortality was mainly concentrated at lags of up to 2 days. This meant that the last 1 or 2 days of mortality included in the moving total mortality counts when k = 4 or k = 5, respectively, were typically not associated with the measure of PM used in the model. This resulted in a dampening of the estimated effect of PM on mortality for the moving total models with k = 4 or 5, and hence an increase in estimation bias compared with the moving total models with k = 2 or k = 3. Application. In this section 1 compare the results of applying the standard and moving total models to the actual Cook County and Allegheny County mortality time-series data. To do this, I first fit a DLM of PM to the mortality, meteorologic, and PM time-series data from both counties described in "Materials and Methods." The DLM of PM contained PM concentrations lagged for 5 days, and the confounder adjustments used in this model were the same as those used in Equation 3. The effect of PM on mortality obtained from the DLM of PM was then used as a basis for judging the performance of the standard and moving total models. The rationale rationale (rash´  nal´),n the fundamental reasons used as the basis for a decision or action. is that, in the ideal situation where daily PM data are available, a DLM of PM should be the method of choice for estimating the effect of PM on mortality (Roberts 2005; Schwartz 2000; Smith et al. 2000). Hence, in the situation where only every-sixth-day PM data are available, it is desirable that the method used to estimate the effect of PM on mortality return an estimate as close as possible to that obtainable in the ideal situation of daily PM data. After fitting the DLM of PM, an every-sixth-day PM time series was obtained by extracting every-sixth-day PM concentration from the daily PM time series. With the every-sixth-day PM time series, I then estimated the effect of PM on mortality using both the standard and moving total models. The confounder adjustments used in the standard and moving total models were the same as those used in Equation 3. The estimates obtained from the standard and moving total models were then compared with the basis estimates obtained from the DLM of PM. Table 3 contains the estimates obtained from fitting the DLM of PM, the standard models, and the moving total models to the data from both Cook County and Allegheny County. Using the estimates obtained from the DLM of PM as the basis for comparison, we can see that the moving total model with k = 2 provides the "best" estimates for the effect of PM on mortality. In both counties, this model produces an estimate that is closer to the basis value than the estimates obtained from the standard models. In addition, the estimate obtained from the moving total model with k = 2 has smaller variance than the estimates obtained from the standard models. These results reinforce the conclusions from the simulations that the moving total model offers a way to estimate the effect of PM on mortality that is both more precise and more accurate than the standard model. These results also show that the moving total model may provide a more robust estimate of the effect of PM on mortality than that obtained from the standard model. This is illustrated by the moving total models with k = 2, 3, and 4, avoiding the relatively poor estimates obtained from the standard model-lag 2 in Cook County and standard model-lag 1 in Allegheny County. It is important to note the substantially smaller estimates obtained from the moving total models of Cook County data with k = 3 and k = 4 compared with that obtained with k = 2. The reason for this is that the large negative effect of PM on mortality observed for this data at a lag of 2 days (see standard model-lag 2) is incorporated into the estimates obtained from the moving total models with k = 3 and k = 4 but not the moving total model with k = 2. Discussion PM air pollution is an important determinant determinant, a polynomial expression that is inherent in the entries of a square matrix. The size n of the square matrix, as determined from the number of entries in any row or column, is called the order of the determinant. of community health, and numerous time-series studies in the United States have investigated the association between PM and mortality (Crosignani et al. 2002; Health Effects Institute The Health Effects Institute (HEI) is a non-partisan, non-profit corporation specializing in research on the health effects of air pollution. It is headquartered in Charlestown, Massachusetts, USA. 2001). One major limitation of these studies is that in most large cities PM measurements are available only every sixth day. Time-series studies conducted in these cities cannot investigate how the effects of PM on mortality are distributed over time; instead, they are forced to examine the mortality effects of PM on a single day only. However, because the current evidence suggests that the mortality effects of PM are spread over multiple days, examining the effect of PM on a single day results in important information about the effect of PM on mortality being lost and estimates that have a large negative bias (Roberts 2005; Schwartz 2000). The moving total model introduced in this article uses information available in the daily mortality time-series data to infer some of this lost information. The results presented here show that, for estimating the total effect of PM on mortality, the moving total model produced estimates that were substantially more precise (smaller variance) compared with those obtained from the standard model. In addition, the moving total model typically produced estimates that were more accurate (smaller bias) compared with those obtained from the standard model. These results indicate that the moving total model should be used in future air pollution mortality time-series studies where only every-sixth-day PM measurements are available. In conclusion, because in most of the largest cities in the United States PM measurements are available only every sixth day, the moving total model has the potential, in a large number of locations, to provide improved estimates of the effect of PM on mortality that have both smaller variance and smaller bias than the estimates that are currently obtainable using existing models. This means that in multicity studies on the health effects of PM, improved estimates could be obtained for the city-specific estimates and hence for the pooled regional and national effect estimates. These improved estimates would allow researchers to better understand the health effects of PM exposure and in turn allow more informed decisions about the public health significance of PM exposure. For these reasons and the ease at which the moving total model can be implemented, I believe that the moving total model is an important contribution to the current air pollution mortality time-series methodology. I thank M. Martin and P. Switzer Swit·zer n. 1. A Swiss. 2. A Swiss Guard. [Ultimately from Middle High German Sw  zer; see Swiss.] for their helpful comments.The author declares he has no competing financial interests. Received 20 November November: see month. 2004: accepted 10 May 2005. REFERENCES Chock DP, Winkler Winkler may refer to:
n. Something that pollutes, especially a waste material that contaminates air, soil, or water. concentrations in Pittsburgh, Pennsylvania “Pittsburgh” redirects here. For the region, see Pittsburgh Metropolitan Area. Pittsburgh (pronounced IPA: /ˈpɪtsbɚg/) is the second largest city in the Commonwealth of Pennsylvania. . J Air Waste Manage Assoc 50:1481-1500. Cifuentes LA, Vega Vega (vā`gə), brightest star in the constellation Lyra; Bayer designation Alpha Lyrae; 1992 position R.A. 18h36.7m, Dec. +38°47'. A white main-sequence star of spectral class A0 V, its apparent magnitude is 0. J, Kopfer K, Lave LB. 2000. Effect of the fine fraction of particulate matter versus the coarse mass and other pollutants pollutants see environmental pollution. on daily mortality in Santiago, Chile Santiago, officially Santiago de Chile (Spanish: (helpinfo)), is the capital of Chile, and the center of its largest conurbation (Greater Santiago). . J Air Waste Manage Assoc 50:1287-1298. Clarke RW, Catalano PJ, Koutrakis P, Murthy GG, Sioutas C, Paulauskis J, et al. 1999. Urban air particulate par·tic·u·late adj. Of or occurring in the form of fine particles. n. A particulate substance. particulate composed of separate particles. inhalation inhalation /in·ha·la·tion/ (in?hah-la´shun) 1. the drawing of air or other substances into the lungs.inhala´tional 2. the drawing of an aerosolized drug into the lungs with the breath. 3. alters pulmonary pulmonary /pul·mo·nary/ (pool´mo-nar?e) 1. pertaining to the lungs. 2. pertaining to the pulmonary artery. pul·mo·nar·y adj. Of, relating to, or affecting the lungs. function and induces pulmonary inflammation inflammation, reaction of the body to injury or to infectious, allergic, or chemical irritation. The symptoms are redness, swelling, heat, and pain resulting from dilation of the blood vessels in the affected part with loss of plasma and leucocytes (white blood in a rodent rodent, member of the mammalian order Rodentia, characterized by front teeth adapted for gnawing and cheek teeth adapted for chewing. The Rodentia is by far the largest mammalian order; nearly half of all mammal species are rodents. model of chronic bronchitis chronic bronchitis n. Inflammation of the bronchial mucous membrane, characterized by cough, hypersecretion of mucus, and expectoration of sputum over a long period of time and associated with increased vulnerability to bronchial infection. . Inhal Toxicol 11:637-656. Crosignani P, Borgini A, Cadum E, Mirabelli D, Porro E. 2002. New directions: air pollution--how many victims? [Letter]. Atmos Environ en·vi·ron tr.v. en·vi·roned, en·vi·ron·ing, en·vi·rons To encircle; surround. See Synonyms at surround. [Middle English envirounen, from Old French environner 36:4705-4706. Daniels MJ, Dominici F, Samet JM, Zeger SL. 2000. Estimating particulate matter mortality dose-response curves dose-response curve A graphic representation of the effects that varous doses of an agent–eg, ionizing radiation or a chemotherapeutic agent, have on a given parameter–eg, cell viability, mutation frequency, DNA damage, tumor growth or metastasis or and threshold levels Noun 1. threshold level - the intensity level that is just barely perceptible intensity, intensity level, strength - the amount of energy transmitted (as by acoustic or electromagnetic radiation); "he adjusted the intensity of the sound"; "they measured the : an analysis of daily time-series for the 20 largest US cities. Am J Epidemiol 152:397-406. Dominici E, McDermott A, Daniels M, Zeger SL, Samet JM. 2003. Mortality among residents of 90 cities. Revised Analysis of Time-Series Studies of Air Pollution and Health. Part II. Boston:Health Effects Institute, 9-24. Available: http:// www.healtheffects.org/Pubs/TimeSeries.pdf [accessed 28 June 2005]. Goldberg MS, Burnett RT, Valois MF, Flegel K, Bailar JC III, Brook J, et al. 2003. Associations between ambient air pollution and daily mortality among persons with congestive heart failure congestive heart failure, inability of the heart to expel sufficient blood to keep pace with the metabolic demands of the body. In the healthy individual the heart can tolerate large increases of workload for a considerable length of time. . Environ Des 91:8-20. Hastie TJ, Tibshirani RJ. 1990. Generalized Additive Models. London:Chapman & Hall. Health Effects Institute. 2001. Airborne airborne /air·borne/ (ar´born) suspended in, transported by, or spread by air. airborne, adj carried through the air. In health care settings, viruses or bacteria may become airborne, e.g. Particles <onlyinclude> This is a list of particles in particle physics, including currently known and hypothetical elementary particles, as well as the composite particles that can be built up from them. and Health: HEI HEI Higher Education Institution (UK) HEI Health Effects Institute HEI Hautes Études Internationales HEI House Ear Institute HEI Healthy Eating Index HEI Hautes Etudes d'Ingénieur HEI High-Explosive Incendiary Epidemiologic ep·i·de·mi·ol·o·gy n. The branch of medicine that deals with the study of the causes, distribution, and control of disease in populations. [Medieval Latin epid Evidence. HEI Perspectives. Boston:Health Effects Institute. Available: http://www.healtheffects.org/ Pubs/Perspectives-1.pdf [accessed 28 June 2005]. Ito K, Kinney PL, Thurston GD. 1895. Variations in PM-10 concentrations within two metropolitan areas and their implications for health effects analyses. Inhal Toxicol 7:735-745. Kelsall JE, Samet JM, Zeger SL, Xu J. 1997. Air pollution and mortality in Philadelphia, 1874-1988. Am J Epidemiol 146:750-762. Klemm RJ, Mason RM Jr, Heilig CM, Neas LM, Bockery DW. 2000. Is daily mortality associated specifically with fine particles Fine particles are an air pollutant mainly produced by cars running on diesel. Other sources are the combustion of fossil fuels in power plants and various industrial processes. ? Data reconstruction and replication In database management, the ability to keep distributed databases synchronized by routinely copying the entire database or subsets of the database to other servers in the network. There are various replication methods. analyses. J Air Waste Manage Assoc 50:1215-1222. Kwon HJ, Cho SH, Nyberg F, Pershagen 6. 2001. Effects of ambient air pollution on daily mortality in a cohort cohort /co·hort/ (ko´hort) 1. in epidemiology, a group of individuals sharing a common characteristic and observed over time in the group. 2. of patients with congestive heart failure. Epidemiology epidemiology, field of medicine concerned with the study of epidemics, outbreaks of disease that affect large numbers of people. Epidemiologists, using sophisticated statistical analyses, field investigations, and complex laboratory techniques, investigate the cause 12:413-419. McCullagh P, Nelder JA. 1989. Generalized Linear Models. London:Chapman & Hall. Moolgavkar SH. 2000. Air pollution and daily mortality in three U.S. counties. Environ Health Perspect 108:777-784. Ostro BB, Hurley S Hurley has become the English version of at least three distinct original Irish names: the Ó hUirthile, part of the Dál gCais tribal group, based in Clare and North Tipperary; the Ó Muirthile, based around Kilbritain in west Cork; and the OhIarlatha, from the district of , Lipsett MJ. 1999. Air pollution and daily mortality in the Coachella Valley Coachella Valley (kō'əchĕl`ə), arid region, SE Calif., N of the Salton Sea. Water is brought into the region by artesian wells and by the Coachella Canal (123 mi/198 km long), a branch of the All-American Canal built between 1938 and , California California (kăl'ĭfôr`nyə), most populous state in the United States, located in the Far West; bordered by Oregon (N), Nevada and, across the Colorado River, Arizona (E), Mexico (S), and the Pacific Ocean (W). : a study of PM10 dominated by coarse particles. Environ Res 81:231-238. Peng RD, Welty LJ, McDermott A. 2004. The National Morbidity, Mortality, and Air Porlution Study Database in R. Working Paper 44. Baltimore Baltimore, city (1990 pop. 736,014), N central Md., surrounded by but politically independent of Baltimore co., on the Patapsco River estuary, an arm of Chesapeake Bay; inc. 1745. , MD:Johns Hopkins University Johns Hopkins University, mainly at Baltimore, Md. Johns Hopkins in 1867 had a group of his associates incorporated as the trustees of a university and a hospital, endowing each with $3.5 million. Daniel C. Department of Biostatistics biostatistics /bio·sta·tis·tics/ (-stah-tis´tiks) biometry. bi·o·sta·tis·tics n. The science of statistics applied to the analysis of biological or medical data. . R Development Core Team. 2005. R: A Language and Environment for Statistical Computing computing - computer . Vienna:R Foundation for Statistical Computing. Available: http://www.r-project.org/[accessed 28 June 2005]. Roberts S. 2004. Biologically plausible particulate air pollution mortality concentration--response functions. Environ Health Perspect 112:309-313. Roberts S. 2005. An investigation of distributed lag models in the context of air pollution and mortality time series analysis. J Air Waste Manage Assoc 55:273-282. Roemer WH, van Wijnen JH. 2001. Daily mortality and air pollution along busy streets in Amsterdam, 1887-1998. Epidemiology 12:649-653. Schwartz J. 2000. The distributed lag between air pollution and daily deaths. Epidemiology 11:320-326. Smith RL, Davis JM, Sacks J, Speckman P, Styer P. 2000. Regression regression, in psychology: see defense mechanism. regression In statistics, a process for determining a line or curve that best represents the general trend of a data set. models for air pollution and daily mortality: analysis of data from Birmingham, Alabama Birmingham (pronounced [ˈbɝmɪŋˌhæm]) is the largest city in the U.S. state of Alabama and is the county seat of Jefferson County. . Environmetrics 11:719-743. Stieb DM, Judek S, Burnett RT. 2002. Meta-analysis meta-analysis /meta-anal·y·sis/ (met?ah-ah-nal´i-sis) a systematic method that takes data from a number of independent studies and integrates them using statistical analysis. of time-series studies of air pollution and mortality: effects of gases and particles and the influence of cause of death, age, and season. J Air Waste Manage Assoc 52:470-484. Styer P, McMillan N, Gao F, Davis J, Sacks J. 1995. Effect of outdoor airborne particulate matter on daily death counts. Environ Health Perspect 103:490-497. Zanobetti A, Schwartz J, Samoli E, Gryparis A, Touloumi G, Peacock peacock or peafowl, large bird of the genus Pavo, in the pheasant family, native to E Asia. There are two main species, the common (Pavo cristatus), and the Javanese (P. J, et al. 2003. The temporal Having to do with time. Contrast with "spatial," which deals with space. pattern of respiratory and heart disease mortality in response to air pollution. Environ Health Perspect 111:1188-1193. Steven Roberts School of Finance and Applied Statistics, Faculty of Economics and Commerce, Australian National University Australian National University, located in Canberra and state-sponsored, founded 1946 as Australia's only completely research-oriented university. Originally limited to graduate studies, it expanded in 1960, merging with Canberra University College (est. 1929). , Canberra, Australia Address correspondence to S. Roberts, School of Finance and Applied Statistics, Faculty of Economics and Commerce, Australian National University, Canberra ACT 0200, Australia. Telephone: 61-2-6125-3470. Fax: 61-2-6125-0087. E-mail: steven.roberts@anu.edu.au
Table 1. Standard deviation and bias for the estimates of the total
PM effect ([theta]) obtained from the standard models and the moving
total models.
Model fit to generated mortality
Standard
Truth Lag 0 Lag 1 Lag 2
0.00 (a) 0.266 (b) (-0.01) (c) 0.26 (-0.02) 0.28 (-0.01)
Lag 0 (d)
0.25 0.27 (0.01) 0.26 (-0.211 0.29 (-0.24)
0.50 0.25 (0.01) 0.28 (-0.38) 0.29 (-0.49)
1.00 0.26 (0.01) 0.28 (-0.78) 0.27 (-1.00)
2.00 0.26 (-0.02) 0.27 (-1.57) 0.29 (-1.971
Lag 1
0.25 0.27 (-0.17) 0.27 (-0.01) 0.29 (-0.19)
0.50 0.26 (-0.37) 0.26 (0.00) 0.30 (-0.35)
1.00 0.27 (-0.79) 0.27 (-0.01) 0.29 (-0.75)
2.00 0.26 (-1.55) 0.26 (0.02) 0.28 (-1.44)
Lag 2
0.25 0.28 (-0.26) 0.27 (-0.20) 0.27 (0.00)
0.50 0.27 (-0.49) 0.26 (-0.40) 0.28 (-0.03)
1.00 0.25 (-0.95) 0.26 (-0.73) 0.29 (0.00)
2.00 0.26 (-1.98) 0.26 (-1.50) 0.28 (0.00)
Lag 0-1
0.25 0.26 (-0.16) 0.25 (-0.18) 0.26 (-0.19)
0.50 0.25 (-0.33) 0.28 (-0.32) 0.30 (-0.36)
1.00 0.26 (-0.65) 0.28 (-0.66) 0.28 (-0.72)
2.00 0.27 (-1.31) 0.29 (-1.34) 0.28 (-1.44)
4.00 0.27 (-2.59) 0.25 1-2.63) 0.27 (-2.88)
Lag 0-2
0.25 0.27 (-0.10) 0.27 (-0.14) 0.29 (-0.18)
0.50 0.28 (-0.21) 0.26 (-0.25) 0.28 (-0.38)
1.00 0.26 1-0.43) 0.25 (-0.52) 0.28 (-0.73)
2.00 0.27 (-0.85) 0.26 (-1.03) 0.27 (-1.46)
4.00 0.26 (-1.68) 0.26 (-2.06) 0.30 (-2.93)
Model fit to generated mortality
Moving total
Truth k = 2 k = 3 k = 4
0.00 (a) 0.19 (0.08) 0.15 (0.11) 0.13 (0.07)
Lag 0 (d)
0.25 0.18 (0.01) 0.15 (-0.02) 0.13 (-0.08)
0.50 0.18 (-0.07) 0.15 (-0.14) 0.13 (-0.24)
1.00 0.18 (-0.25) 0.15 (-0.41) 0.13 (-0.56)
2.00 0.18 (-0.60) 0.14 (-0.96) 0.13 (-1.22)
Lag 1
0.25 0.18 (0.00) 0.15 (0.00) 0.13 (-0.07)
0.50 0.19 (-0.11) 0.15 (-0.14) 0.13 (-0.22)
1.00 0.18 (-0.33) 0.15 (-0.39) 0.13 (-0.52)
2.00 0.19 (-0.75) 0.15 (-0.89) 0.13 (-1.10)
Lag 2
0.25 0.18 (-0.14) 0.15 (-0.05) 0.13 (-0.08)
0.50 0.19 (-0.35) 0.14 (-0.19) 0.12 (-0.22)
1.00 0.19 (-0.78) 0.16 (-0.47) 0.14 (-0.52)
2.00 0.19 (-1.69) 0.16 (-1.08) 0.13 (-1.14)
Lag 0-1
0.25 0.18 (-0.08) 0.15 (-0.06) 0.12 (-0.09)
0.50 0.18 (-0.24) 0.14 (-0.22) 0.13 (-0.26)
1.00 0.18 (-0.55) 0.15 (-0.53) 0.14 (-0.59)
2.00 0.19 (-1.19) 0.15 (-1.19) 0.13 (-1.27)
4.00 0.18 (-2.46) 0.14 (-2.49) 0.13 (-2.62)
Lag 0-2
0.25 0.18 (-0.01) 0.15 (0.00) 0.13 (-0.07)
0.50 0.18 (-0.14) 0.15 (-0.16) 0.13 (-0.24)
1.00 0.18 (-0.37) 0.15 (-0.42) 0.13 (-0.55)
2.00 0.20 (-0.83) 0.16 (-0.96) 0.14 (-1.17)
4.00 0.19 (-1.73) 0.15 (-2.01) 0.14 (-2.40)
Truth is the specification of the "true" effect of PM on mortality
and 1,000 times the [theta] value that were used to generate mortality.
(a) 1,000 times the total effect of PM on mortality (theta]0) that was
used to generate mortality. (b) 1,000 times the standard deviation
for the estimate of the total effect of PM on mortality ([theta]).
(c) 1,000 times the bias for the estimate of the total effect of PM on
mortality ([theta]). (d) The specification of the "true" effect of PM
on mortality that was used to generate mortality.
Table 2. Standard deviation and bias for the estimates of the total
PM effect ([theta]) obtained from the standard models and the moving
total models.
Model fit to generated mortality
Standard
Truth Lag 0 Lag 1 Lag 2
DLM 1 (a)
0.25 (b) 0.27 (c) (-0.16) (d) 0.26 (-0.11) 0.28 (-0.16)
0.50 0.27 (-0.31) 0.27 (-0.27) 0.28 (-0.27)
1.00 0.26 (-0.61) 0.28 (-0.52) 0.29 (-0.57)
2.00 0.25 (-1.15) 0.27 (-0.99) 0.27 (-1.12)
4.00 0.26 (-2.33) 0.26 (-2.03) 0.28 (-2.29)
DLM 2
0.25 0.26 (-0.11) 0.27 (-0.08) 0.27 (-0.22)
0.50 0.27 (-0.22) 0.27 (-0.20) 0.27 (-0.42)
1.00 0.27 (-0.40) 0.26 (-0.39) 0.28 (-0.85)
2.00 0.27 (-0.79) 0.27 (-0.76) 0.29 (-1.70)
4.00 0.26 (-1.56) 0.28 (-1.56) 0.28 (-3.39)
DLM 3
0.25 0.25 (-0.22) 0.26 (-0.16) 0.26 (-0.14)
0.50 0.27 (-0.46) 0.27 (-0.31) 0.29 (-0.35)
1.00 0.28 (-0.92) 0.27 (-0.62) 0.27 (-0.63)
2.00 0.27 (-1.81) 0.27 (-1.22) 0.27 (-1.23)
4.00 0.26 (-3.64) 0.25 (-2.48) 0.27 (-2.46)
DLM 4
0.25 0.26 (-0.13) 0.26 (-0.15) 0.29 (-0.22)
0.50 0.25 (-0.21) 0.26 (-0.29) 0.27 (-0.41)
1.00 0.27 (-0.40) 0.26 (-0.59) 0.29 (-0.77)
2.00 0.28 (-0.80) 0.26 (-1.16) 0.27 (-1.53)
4.00 0.26 (-1.61) 0.27 (-2.32) 0.29 (-3.11)
Model fit to generated mortality
Moving total
Truth k = 2 k = 3 k = 4
DLM 1 (a)
0.25 (b) 0.19 (-0.06) 0.16 (-0.03) 0.13 (-0.08)
0.50 0.19 (-0.20) 0.16 (-0.17) 0.13 (-0.24)
1.00 0.18 (-0.47) 0.15 (-0.44) 0.13 (-0.55)
2.00 0.18 (-0.99) 0.14 (-0.97) 0.12 (-1.15)
4.00 0.18 (-2.10) 0.15 (-2.07) 0.13 (-2.39)
DLM 2
0.25 0.20 (0.00) 0.15 (-0.01) 0.13 (-0.07)
0.50 0.19 (-0.12) 0.16 (-0.15) 0.14 (-0.24)
1.00 0.19 (-0.29) 0.16 (-0.41) 0.14 (-0.54)
2.00 0.18 (-0.68) 0.15 (-0.92) 0.13 (-1.15)
4.00 0.19 (-1.43) 0.15 (-1.96) 0.13 (-2.40)
DLM 3
0.25 0.18 (-0.11) 0.15 (-0.07) 0.13 (-0.10)
0.50 0.19 (-0.30) 0.16 (-0.24) 0.14 (-0.26)
1.00 0.19 (-0.66) 0.16 (-0.58) 0.13 (-0.61)
2.00 0.19 (-1.42) 0.15 (-1.27) 0.13 (-1.29)
4.00 0.19 (-2.94) 0.15 (-2.67) 0.13 (-2.66)
DLM 4
0.25 0.19 (-0.04) 0.15 (-0.04) 0.13 (-0.08)
0.50 0.18 (-0.16) 0.15 (-0.17) 0.14 (-024)
1.00 0.20 (-0.38) 0.16 (-0.44) 0.14 (-0.55)
2.00 0.19 (-0.86) 0.15 (-1.00) 0.13 (-1.18)
4.00 0.18 (-1.81) 0.16 (-2.11) 0.13 (-2.42)
Truth is the specification of the "true" effect of PM on mortality
and 1,000 times the [theta] value that were used to generate
mortality. (a) The specification of the "true" effect of PM on
mortality that was used to generate mortality. (b) 1,000 times the
total effect of PM on mortality ([theta]) that was used to generate
mortality. (c) 1,000 times the standard deviation for the estimate
of the total effect of PM on mortality ([theta]). (d) 1,000 times the
bias for the estimate of the total effect of PM on mortality ([theta]).
Table 3. Results of fitting both the standard and moving total models
to the actual data from Cook County, Illinois, and Allegheny County,
Pennsylvania.
Model fit to mortality
Standard
County Lag 0 Lag 1 Lag 2
Cook County 0.127 (a) (0.264) (b) -0.042 (0.249) -0.441 (0.246)
Allegheny 0.693 (0.437) 0.356 (0.423) 0.524 (0.415)
County
Model fit to mortality
Moving total
County k = 2 k = 3 k = 4
Cook County 0.150 (0.187) -0.047 (0.153) 0.009 (0.133)
Allegheny 0.633 (0.310) 0.542 (0.255) 0.528 (0.221)
County
County Baseline
Cook County 0.462 (0.212)
Allegheny 0.598 (0.351)
County
Baseline is the baseline estimate of the total effect of PM on
mortality obtained from the OLM of PM fit to the daily data.
(a) 1,000 times the estimated effect of PM on mortality. (b) 1,000
times the standard deviation of the estimated effect of PM on
mortality.
|
|
||||||||||||||||||
Printer friendly
Cite/link
Email
Feedback
Reader Opinion