An Introduction to the Theory of Functional Equations and Inequalities: Cauchy's Equation and Jensen's InequalityPaństwowe Wydawn. Naukowe, 1985 - 523 strani |
Vsebina
Introduction | 11 |
PRELIMINARIES 1 Axioms of Set Theory | 13 |
Ordered sets 3 Ordinal numbers 4 Sets of ordinal numbers | 20 |
Avtorske pravice | |
120 preostalih delov ni prikazanih
Druge izdaje - Prikaži vse
An Introduction to the Theory of Functional Equations and Inequalities ... Marek Kuczma Omejen predogled - 2008 |
An Introduction to the Theory of Functional Equations and Inequalities ... Marek Kuczma Omejen predogled - 2009 |
An Introduction to the Theory of Functional Equations and Inequalities ... Marek Kuczma Predogled ni na voljo - 2009 |
Pogosti izrazi in povedi
a₁ algebraically independent analytic set arbitrary set assume B₁ Baire property Consequently contains continuous and convex continuous function convex and open convex function convex set Corollary countable D₁ defined denoted dense discontinuous additive function elements exists a set f:RN f(x+y F₁ finite following THEOREM function f ƒ is bounded ƒ is continuous h₁ h₂ Hamel basis homomorphism implies inequality Kerf Lebesgue measure Lemma Let DCRN let f Let f:RN→R Let G linear space linear subspace linearly independent locally bounded Math measure zero non-empty open interval open set ordinal number p-convex polynomial function prove Q-radial RN→R satisfies equation saturated non-measurable second category sequence Show subadditive function subgroup subset Suppose t₁ Take an arbitrary Take arbitrary whence x₁ xe RN ye RN