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The dimension of semialgebraic subdifferential graphs

Examples exist of extended-real-valued closed functions on ${\bf R}^n$ whose subdifferentials (in the standard, limiting sense) have large graphs. By contrast, if such a function is semi-algebraic, then its subdifferential graph must have everywhere constant local dimension $n$. This result is related to a celebrated theorem of Minty, and surprisingly may fail for the Clarke subdifferential.

preprint2011arXivOpen access

Dmitriy Drusvyatskiy Alexander D. Ioffe Adrian S. Lewis

math.OC math.AG

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Dmitriy Drusvyatskiy Alexander D. Ioffe Adrian S. Lewis

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