An Arnold-type principle for non-smooth objects

Abstract: In this article we study the Arnold conjecture in settings where objects under consideration are no longer smooth but only continuous. The example of a Hamiltonian homeomorphism, on any closed symplectic manifold of dimension greater than 2, having only one fixed point shows that the conjecture does not admit a direct generalization to continuous settings. However, it appears that the following Arnoldtype principle continues to hold in C 0 settings: Suppose that X is a non-smooth object for which one can defin… Show more

Completeness of derived interleaving distances and sheaf quantization of non-smooth objects

Completeness of derived interleaving distances and sheaf quantization of non-smooth objects

Viterbo conjecture for Zoll symmetric spaces

Some results of Hamiltonian homeomorphisms on closed aspherical surfaces