Analytic and geometric inequalities and applications /
Analytic and geometric inequalities and applications / Book /
edited by Themistocles M. Rassias and Hari M. Srivastava.
- Dordrecht ; Boston, Mass. : Kluwer Academic Publishers, é1999.
- vii, 378 pages : 25 cm.
- Mathematics and its applications (Kluwer Academic Publishers) ; v. 478. .
- Mathematics and its applications ; v. 478 .
This volume is devoted to recent advances in a variety of inequalities in mathematical analysis and geometry. Subjects dealt with include: differential and integral inequalities; fractional order inequalities of Hardy type; multi-dimensional integral inequalities; Grüss' inequality; Laguerre-Samuelson inequality; Opial type inequalities; Furuta inequality; distortion inequalities; problem of infimum in the positive cone; external problems for polynomials; Chebyshev polynomials; bounds for the zeros of polynomials; open problems on eigenvalues of the Laplacian; obstacle boundary value problems; bounds on entropy measures for mixed populations; connections between the theory of univalent functions and the theory of special functions; and degree of convergence for a class of linear operators. A wealth of applications of the above is also included. Audience: This book will be of interest to mathematicians whose work involves real functions, functions of a complex variable, special functions, integral transforms, operational calculus, or functional analysis.
All.
079235690X (hc. : alk. paper)
99021369
Inequalities (Mathematics)
Mathematical analysis.
Geometry.
515.26
This volume is devoted to recent advances in a variety of inequalities in mathematical analysis and geometry. Subjects dealt with include: differential and integral inequalities; fractional order inequalities of Hardy type; multi-dimensional integral inequalities; Grüss' inequality; Laguerre-Samuelson inequality; Opial type inequalities; Furuta inequality; distortion inequalities; problem of infimum in the positive cone; external problems for polynomials; Chebyshev polynomials; bounds for the zeros of polynomials; open problems on eigenvalues of the Laplacian; obstacle boundary value problems; bounds on entropy measures for mixed populations; connections between the theory of univalent functions and the theory of special functions; and degree of convergence for a class of linear operators. A wealth of applications of the above is also included. Audience: This book will be of interest to mathematicians whose work involves real functions, functions of a complex variable, special functions, integral transforms, operational calculus, or functional analysis.
All.
079235690X (hc. : alk. paper)
99021369
Inequalities (Mathematics)
Mathematical analysis.
Geometry.
515.26