About: Generic Frechet Differentiability on Asplund Spaces via A.E. Strict Differentiability on Many Lines     Goto   Sponge   Distinct   Permalink

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  • We prove that a locally Lipschitz function on an open subset G of an Asplund space X, whose restrictions to %22many lines%22 are essentially smooth (i.e., almost everywhere strictly differentiable), is generically Frechet differentiable on X. In this way we obtain new proofs of known Frechet differentiability properties of approximately convex functions, Lipschitz regular functions, saddle (or biconvex) Lipschitz functions, and essentially smooth functions (in the sense of Borwein and Moors), and also some new differentiability results (e.g., for partially DC functions). We show that classes of functions S-e(g)(G) and R-e(g)(G) (defined via linear essential smoothness) are respectively larger than classes S-e(G) (of essentially smooth functions) and R-e(G) studied by Borwein and Moors, and have also nice properties. In particular, we prove that members of S-e(g)(G) are uniquely determined by their Clarke subdifferentials. We also show the inclusion S-e(G) subset of R-e(G) for Borwein-Moors classes.
  • We prove that a locally Lipschitz function on an open subset G of an Asplund space X, whose restrictions to %22many lines%22 are essentially smooth (i.e., almost everywhere strictly differentiable), is generically Frechet differentiable on X. In this way we obtain new proofs of known Frechet differentiability properties of approximately convex functions, Lipschitz regular functions, saddle (or biconvex) Lipschitz functions, and essentially smooth functions (in the sense of Borwein and Moors), and also some new differentiability results (e.g., for partially DC functions). We show that classes of functions S-e(g)(G) and R-e(g)(G) (defined via linear essential smoothness) are respectively larger than classes S-e(G) (of essentially smooth functions) and R-e(G) studied by Borwein and Moors, and have also nice properties. In particular, we prove that members of S-e(g)(G) are uniquely determined by their Clarke subdifferentials. We also show the inclusion S-e(G) subset of R-e(G) for Borwein-Moors classes. (en)
Title
  • Generic Frechet Differentiability on Asplund Spaces via A.E. Strict Differentiability on Many Lines
  • Generic Frechet Differentiability on Asplund Spaces via A.E. Strict Differentiability on Many Lines (en)
skos:prefLabel
  • Generic Frechet Differentiability on Asplund Spaces via A.E. Strict Differentiability on Many Lines
  • Generic Frechet Differentiability on Asplund Spaces via A.E. Strict Differentiability on Many Lines (en)
skos:notation
  • RIV/00216208:11320/12:10127167!RIV13-GA0-11320___
http://linked.open...avai/riv/aktivita
http://linked.open...avai/riv/aktivity
  • I, P(GA201/09/0067), Z(MSM0021620839)
http://linked.open...iv/cisloPeriodika
  • 1
http://linked.open...vai/riv/dodaniDat
http://linked.open...aciTvurceVysledku
http://linked.open.../riv/druhVysledku
http://linked.open...iv/duvernostUdaju
http://linked.open...titaPredkladatele
http://linked.open...dnocenehoVysledku
  • 137875
http://linked.open...ai/riv/idVysledku
  • RIV/00216208:11320/12:10127167
http://linked.open...riv/jazykVysledku
http://linked.open.../riv/klicovaSlova
  • separable reduction; essentially smooth functions; Generic Frechet differentiability (en)
http://linked.open.../riv/klicoveSlovo
http://linked.open...odStatuVydavatele
  • DE - Spolková republika Německo
http://linked.open...ontrolniKodProRIV
  • [9D43A5426E95]
http://linked.open...i/riv/nazevZdroje
  • Journal of Convex Analysis
http://linked.open...in/vavai/riv/obor
http://linked.open...ichTvurcuVysledku
http://linked.open...cetTvurcuVysledku
http://linked.open...vavai/riv/projekt
http://linked.open...UplatneniVysledku
http://linked.open...v/svazekPeriodika
  • 19
http://linked.open...iv/tvurceVysledku
  • Zajíček, Luděk
http://linked.open...ain/vavai/riv/wos
  • 000301551300002
http://linked.open...n/vavai/riv/zamer
issn
  • 0944-6532
number of pages
http://localhost/t...ganizacniJednotka
  • 11320
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