Library of American University of Madaba
Functional Equations and Inequalities
by Forte, B.
Authors: SpringerLink (Online service) Series: C.I.M.E. Summer Schools ; . 54 Physical details: 425 p. 2 illus. online resource. ISBN: 3642110045 Subject(s): Mathematics. | Functional equations. | Mathematics. | Difference and Functional Equations.| Item type | Location | Call Number | Status | Date Due |
|---|---|---|---|---|
 E-Book |
AUM Main Library | 515.625 (Browse Shelf) | Not for loan |
J. Aczél: Some applications of functional equations and inequalities to information measures -- J.A. Baker: Functional equations in vector space, part II -- I Fenyo: Sur les équations distributionnelles -- B. Forte: Applications of functional equations and inequalities to information theory -- S. Golab: Sur l’équation fonctionnelle des brigade -- E. Hille: Mean-values and functional equations -- J. Kampé de Feriet: Applications of functional equations and inequalities to information theory. Measure of information by a set of observers: a functional equation -- M. Kuczma: Convex functions -- S. Kurepa: Functional equations on vector spaces -- E. Lukacs: Inequalities and functional equations in probability theory -- M.A. McKiernan: Difference and mean-value type functional equations -- T.S. Motzkin: Solutions of differential and functional inequalities -- C.T. Ng: Uniqueness theorems in the theory of functional equations and related homotopy -- A.M. Ostrowski: Integral inequalities -- H. Schwerdtfeger: Remark on an inequality for monotonic functions.
J. Aczél: Some applications of functional equations and inequalities to information measures.- J.A. Baker: Functional equations in vector space, part II.- I Fenyo: Sur les équations distributionnelles.- B. Forte: Applications of functional equations and inequalities to information theory.- S. Golab: Sur l’équation fonctionnelle des brigade.- E. Hille: Mean-values and functional equations.- J. Kampé de Feriet: Applications of functional equations and inequalities to information theory. Measure of information by a set of observers: a functional equation.- M. Kuczma: Convex functions.- S. Kurepa: Functional equations on vector spaces.- E. Lukacs: Inequalities and functional equations in probability theory.- M.A. McKiernan: Difference and mean-value type functional equations.- T.S. Motzkin: Solutions of differential and functional inequalities.- C.T. Ng: Uniqueness theorems in the theory of functional equations and related homotopy.- A.M. Ostrowski: Integral inequalities.- H. Schwerdtfeger: Remark on an inequality for monotonic functions.
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