Open AccessClarke's generalized gradient and Edalat's L-derivative
Author(s) -
Peter Hertling
Publication year - 2017
Publication title -
journal of logic and analysis
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.278
H-Index - 4
ISSN - 1759-9008
DOI - 10.4115/jla.2017.9.c1
Subject(s) - mathematics , lipschitz continuity , banach space , fréchet derivative , derivative (finance) , pure mathematics , directional derivative , mathematical analysis , space (punctuation) , computer science , financial economics , economics , operating system
Clarke (1973, 1975, 1983) introduced a generalized gradient for real-valued Lipschitz continuous functions on Banach spaces. Edalat (2007, 2008) introduced a so-called L-derivative for real-valued functions and showed that for Lipschitz continuous functions Clarke's generalized gradient is always contained in this L-derivative and that these two notions coincide if the underlying Banach space is finite dimensional. He asked whether they coincide as well if the Banach space is infinite dimensional. We show that this is the case.
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