Mimura, Critical mass of degenerate Keller--Segel system with no-flux and Neumann boundary conditions

· 2017

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The evolution variational inequality for weighted Wasserstein metrics in non-convex bounded domains

math.AP · 2026-05-13 · accept · novelty 7.0

The evolution variational inequality for weighted Wasserstein metrics holds on non-convex bounded domains by absorbing boundary integrals via Sobolev trace embeddings and a variant of Kato's inequality.

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The evolution variational inequality for weighted Wasserstein metrics in non-convex bounded domains math.AP · 2026-05-13 · accept · none · ref 15
The evolution variational inequality for weighted Wasserstein metrics holds on non-convex bounded domains by absorbing boundary integrals via Sobolev trace embeddings and a variant of Kato's inequality.

Mimura, Critical mass of degenerate Keller--Segel system with no-flux and Neumann boundary conditions

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