Inverse Holder inequalities - CMU.pdf

Carnegie Mellon University Research Showcase @ CMU Department of Mathe atical Sciences Mellon College of Science 1967 Inverse Holder inequalities Nehari Carneg ie Mellon University Follow this and additional works at : http://repository.c / ath This Technical Report is brought to you for free and open access by the Mellon College of Science at Research Showcase @ CMU. It has been accepted for inclusion in Department of Mathe atical Sciences by an authorized administrator of Research Showcase @ CMU. For more infor ation, please contact research-showcase@andrew.c . Inverse Holder Inequalities by Zeev Nehari Report 67-22 May, 1967 Libraries Uni Inverse Holder Inequalities Zeev Nehari It is known that, for various classes of non-negative functions f,g, the Schwarz inequality 2 2 ( J fgdll ) J f dil J X X X X X X has an inverse of the form (1.1) J / f X X where C9 is a positive constant which depends on the classes considered. For instance, if X is a finite interval, L^ is the Lebesgue measure, and f,g are non-negative concave functions on X, it was shown by Blaschke and Pick [3] that C = 2 . If 2 (X, 2^, u) is a positive measure space, and f,g€L (X, 2T^/C) and are such that (1.