Keller-Lieb-Thirring inequalities for Schrödinger operators on cylinders

both use a change of unknown function and variables (gauge transformation) to remove the electric potential from the equation such that they only have to deal with the usual

The results we obtained in the case d ≥ 4 are similar to the case d = 3, with V γ,d,1 as the maximizer for small γ, until it is outperformed by branches with a larger number of

[DMc] X.T. McIntosh, Singular integral operators with non-smooth kernels on irregular domains. Yan, Endpoint estimates for Riesz transforms of magnetic Schr¨odinger operators.

Lieb-Thirring type inequalities for non self-adjoint perturbations of magnetic Schrödinger operators..

We propose a general framework to build full symmetry-breaking inequalities in order to handle sub-symmetries arising from solution subsets whose symmetry groups contain the

We show that the proposed sub-symmetry-breaking inequalities outperform state-of-the-art symmetry-breaking formulations, such as the aggregated interval MUCP formulation [22] as well

We propose multivariate parametric and nonparametric (distribution-free) tests for the hypothesis of elliptical symmetry (with respect to some specified location θθθ) which (based on

Nevertheless we shall be able to construct spectral projections (not uniformly bounded) and to prove completeness, in a sense that will be made more precise below