JournalszaaVol. 4, No. 2pp. 125–132

Mean Value Theorem for Functions Possessing First Order Convex Approximations. Applications in Optimization Theory

  • Marcin Studniarski

    Uniwersytet Lodzki, Poland
Mean Value Theorem for Functions Possessing First Order Convex Approximations. Applications in Optimization Theory cover
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Abstract

A mean value theorem for functions possessing first order convex approximations in the sense of Ioffe [6] is derived. It comprises two known results for convex and locally Lipschitzian functions as particular cases. This theorem is used in order to obtain a sufficient condition for a function defined on the Cartesian product of two topological vector spaces to possess a first order convex approximation. Some applications in optimization theory are also given.

Cite this article

Marcin Studniarski, Mean Value Theorem for Functions Possessing First Order Convex Approximations. Applications in Optimization Theory. Z. Anal. Anwend. 4 (1985), no. 2, pp. 125–132

DOI 10.4171/ZAA/142