TY - BOOK AU - Gradshteĭn,I.S. AU - Ryzhik,I.M. AU - Jeffrey,Alan TI - Table of integrals, series, and products SN - 0122947576 (acidfree paper) AV - QA55 .G6613 2000 PY - 2000/// CY - San Diego PB - Academic Press KW - Mathematics KW - Tables N1 - Includes bibliographical references (p. 1133-1142) and indexes; Preface to the Sixth Edition. Acknowledgements. The order of presentation of the formulas. Use of the tables. Special functions. Notation. Note on the bibliographic references. Introduction. Elementary Functions. Indefinite Integrals of Elementary Functions. Definite Integrals of Elementary Functions. Indefinite Integrals of Special Functions. Definite Integrals of Special Functions. Special Functions. Vector Field Theory. Algebraic Inequalities. Integral Inequalities. Matrices and related results. Determinants. Norms. Ordinary differential equations. Fourier, Laplace, and Mellin Transforms. The z-transform. References. Supplemental references. Function and constant index. General index N2 - The Table of Integrals, Series, and Products is the major reference source for integrals in the English language. It is essential for mathematicians, scientists, and engineers, who rely on it when identifying and subsequently solving extremely complex problems. The Sixth Edition is a corrected and expanded version of the previous edition. It was completely reset in order to add more material and to enhance the visual appearance of the information. To preserve compatibility with the previous edition, the original numbering system for entries has been retained. New entries and sections have been inserted in a manner consistent with the original scheme. Whenever possible, new entries and corrections have been checked by means of symbolic computation. This work is a completely reset edition of Gradshteyn and Ryzhik reference book. In it, new entries and sections are kept in original numbering system with an expanded bibliography. It also provides enlargement of material on orthogonal polynomials, theta functions, Laplace and Fourier transform pairs and much more ER -