Difference between revisions of "Talk:Subdifferential"
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::To me this does not agree with the claim about the subdifferential of the support function of a compact subset.--Edouard 14:14, 8 October 2013 (CEST) | ::To me this does not agree with the claim about the subdifferential of the support function of a compact subset.--Edouard 14:14, 8 October 2013 (CEST) | ||
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+ | :::Yes, it seems I see what happens. The phrase from our article does not make sense, since subdifferential ''at a point'' is a set (and the point is not specified). Probably it if forgotten to say "at 0". Then the statement looks believable, and conforms with the corollary quoted by you. Indeed, ''x''=0, and the zero function achieves its maximum over ''C'' at every point of ''C''. Does it make sense? --[[User:Boris Tsirelson|Boris Tsirelson]] ([[User talk:Boris Tsirelson|talk]]) 17:44, 8 October 2013 (CEST) |
Revision as of 15:44, 8 October 2013
The article says
"The subdifferential of the support function of a convex set coincides with the set itself"
This seems to disagree with corollary 25.5.3 of Rockafellar's book. Or am I mistaken?
- Could you please explain a little, what is the problem? I do not have that book on my table. I also note that compactness is required. --Boris Tsirelson (talk) 23:22, 7 October 2013 (CEST)
- This is a corollary 23.5.3 of Theorem 23.5 that relates the subdifferential of a convex function to its dual function. It says
- Let C be a non empty closed convex set. Then for h the support function of C and each vector x, the subdifferential of h at x consists of the points (if any) where the linear function <.,x> achieves its maximum over C.
- To me this does not agree with the claim about the subdifferential of the support function of a compact subset.--Edouard 14:14, 8 October 2013 (CEST)
- Yes, it seems I see what happens. The phrase from our article does not make sense, since subdifferential at a point is a set (and the point is not specified). Probably it if forgotten to say "at 0". Then the statement looks believable, and conforms with the corollary quoted by you. Indeed, x=0, and the zero function achieves its maximum over C at every point of C. Does it make sense? --Boris Tsirelson (talk) 17:44, 8 October 2013 (CEST)
How to Cite This Entry:
Subdifferential. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Subdifferential&oldid=30610
Subdifferential. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Subdifferential&oldid=30610