On efficiency and localisation for the torsion function

Abstract

We consider the torsion function for the Dirichlet Laplacian -, and for the Schr\"odinger operator - + V on an open set ⊂ m of finite Lebesgue measure 0<||<∞ with a real-valued, non-negative, measurable potential V. We investigate the efficiency and the phenomenon of localisation for the torsion function, and their interplay with the geometry of the first Dirichlet eigenfunction.