Lipschitz Gradient Theorem

In course

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Description

This lecture covers the Lipschitz gradient theorem, which states that for an arbitrary sequence X0, X, X2, the function f satisfies certain properties related to Lipschitz continuity and accumulation points. The theorem is presented with various mathematical expressions and examples, illustrating the conditions under which the function f meets the Lipschitz gradient criteria. The lecture also discusses the concept of strict and non-strict local minimizers, accumulation points, and saddle points in the context of function optimization.

Instructor

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Official source

https://mediaspace.epfl.ch/media/0_e796tn4z

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Ontological neighbourhood

Mathematics

Analysis: Complex analysis, Calculus

Topology: General topology

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