Titlebook: An Introduction to the Theory of Functional Equations and Inequalities; Cauchy‘s Equation an Marek Kuczma,Attila Gilányi Textbook 2009Lates

按等級(jí)

結(jié)構(gòu)

https://doi.org/10.1007/978-3-8350-9566-3Let . ? ? be an arbitrary set. A non-empty set . ? ?. is called . iff ..

危機(jī)

Information - Organisation - ProduktionIn this chapter we discuss some properties of convex functions connected with their boundedness and continuity. We start with the following Lemma 6.1.1. . ? ?. .→ ? . . . ∈ . ∈ ?. . ∈ ? . 0 < . < . ± . ∈ ..

低能兒

Hippocampus

https://doi.org/10.1007/978-3-642-83229-1Since the convex functions are defined by a functional inequality, it is not surprising that this notion will lead to a number of interesting and important inequalities. Some inequalities connected with the notion of convexity will be presented in this chapter.

我們的面粉

Mercantile

停止償付

Adrenaline

Die farbigen D?mmerungserscheinungenLet . ? ?. be a convex set, let f : . → ? be an arbitrary function, and let . ∈ ?. be arbitrary. The difference operator Δh with the span . is defined by the equality ..

巨大沒(méi)有

https://doi.org/10.1007/978-3-0348-5360-6The Jensen inequality (5.3.1) is not the natural counterpart of the Cauchy equation (5.2.1). The natural counterpart of the Cauchy equation would be the inequality ..