Advances in inequalities for special functions.9781600219191Advances in inequalities for special functions In mathematics, special functions are particular functions such as the trigonometric functions that have useful or attractive properties, and which occur in different applications often enough to warrant a name and attention of their own. . Ed. by Pietro Cerone Pietro Cerone (1566–1625) was an Italian music theorist, singer and priest of the late Renaissance. He is most famous for an enormous music treatise he wrote in 1613, which is useful in the studying compositional practices of the 16th century. and Sever S. Dragomir. Nova Science Publishers 2008 170 pages $89.00 Hardcover Advances in mathematical inequalities QA351 This collection of 12 surveys of previous published works and new results relate to elements of special function theory. Topics include special functions approximations and bounds though integral representation, inequalities for positive Dirichlet series In mathematics, a Dirichlet series is any series of the form where s and an, n = 1, 2, 3, ... are complex numbers. , the monotonicity of the mean value function of normalized Bessel functions of the first kind, the application of Sturm Theory for some classes of Sturm-Liouville equations and inequalities (and the monotonicity properties for the zeros of Bessel functions, inequalities for the gamma function through convexity Convexity A measure of the curvature in the relationship between bond prices and bond yields. Notes: Positive convexity corresponds to curvature that opens upward. Negative convexity corresponds to curvature that opens downward. , inequalities for hyperharmonic series, Hermite-Hadamard inequalities for double Dirichlet averages and their applications to special functions, new inequalities involving convex functions, growth rates Growth Rates The compounded annualized rate of growth of a company's revenues, earnings, dividends, or other figures. Notes: Remember, historically high growth rates don't always mean a high rate of growth looking into the future. in Weierstrab invariants, certain special functions of number theory and mathematical analysis, an operator related to the Bessel-wave equation and Laplacian Bessel, and inequalities for Walsh polynomials with semi-monotone coefficients of higher order. ([c]20082005 Book News, Inc., Portland, OR) |
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