AKOR Seminar: Differentiable locally Lipschitz functions with surjective Clarke Jacobians

VADOR Events Calendar

Our team is constantly involved in research projects, frequently involving collaboration with international scientists and institutions. Research is carried out in a number of languages, however we present mostly in English.

We frequently host one off lectures on topics relating to variational analysis, dynamics and operations research. In term-time, we host different speakers at our weekly AKOR seminar. Seminars take place most Thursdays at 3pm in Sem. R. DB gelb 04. Once a month, the AKOR seminar will be replaced by the Vienna Seminar on Optimization, opens an external URL in a new window - a joint venture with Radu Bot and Yurii Malitskyi of the University of Vienna

We organise the Viennese Conference on Optimal Control and Dynamic Games, typically every three years. The next iteration - VC2025 - will take place in July 2025. For further details on this conference, and its forerunners, please visit the VC2025, opens an external URL in a new window website.

Topics and speakers for all forthcoming events will be posted below.

09. January 2025, 15:00 until 17:00

AKOR Seminar: Differentiable locally Lipschitz functions with surjective Clarke Jacobians

Seminar

Sebastian Tapia Garcia, TU Wien

In this talk we construct a differentiable locally Lipschitz function f from R^n to R^m satisfying the following property: for any nonempty convex compact subset C of R^(mn), there is a point x in Rn such that the Clarke Jacobian of f at x is exactly C.

In fact, our construction allows us to recover every nonempty compact connected subset of R^(mn) in the image of the limiting Jacobian of f.

This is a joint work with A. Daniilidis.

Calendar entry

Event location

Sem. R. DB gelb 04
1040 Wien
Wiedner Hauptstraße 8

Organiser

VADOR
vador@tuwien.ac.at

Public

Entrance fee

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09. January 2025

AKOR Seminar: Differentiable locally Lipschitz functions with surjective Clarke Jacobians

Sebastian Tapia Garcia, TU Wien

In fact, our construction allows us to recover every nonempty compact connected subset of R^(mn) in the image of the limiting Jacobian of f.

This is a joint work with A. Daniilidis.

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