Ludovic Dan Lemle
Published 2008-01-17Version 1
The main purpose of this paper is to show that the generalized Schr\"odinger operator ${\cal A}^Vf={1/2}\Delta f+b\nabla f-Vf$, $f\in C_0^\infty(\R^d)$, is a pre-generator for which we can prove its $L^\infty(\R^d,dx)$-uniqueness. Moreover, we prove the $L^1(\R^d,dx)$-uniqueness of weak solutions for the Fokker-Planck equation associated with this pre-generator.
$L^\infty$-uniqueness of Schrödinger operators restricted in an open domain
Embedded eigenvalues of generalized Schrödinger operators
CKN theory of singularities of weak solutions of the Navier-Stokes equations
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