论文信息 - A global uniqueness result for an evolution problem arising in superconductivity

A global uniqueness result for an evolution problem arising in superconductivity

We consider an energy functional on measures in R arising in superconductivity as a limit case of the well-known Ginzburg Landau functionals. We study its gradient flow with respect to the Wasserstein metric of probability measures, whose corresponding time evolutive problem can be seen as a mean field model for the evolution of vortex densities. Improving the analysis made in [AS], we obtain a new existence and uniqueness result for the evolution problem.

Edoardo Mainini

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