On a P\'olya functional for rhombi, isosceles triangles, and thinning convex sets

Abstract

Let be an open convex set in Rm with finite width, and let v be the torsion function for , i.e. the solution of - v=1, v∈ H01(). An upper bound is obtained for the product of v_L∞()λ(), where λ() is the bottom of the spectrum of the Dirichlet Laplacian acting in L2(). The upper bound is sharp in the limit of a thinning sequence of convex sets. For planar rhombi and isosceles triangles with area 1, it is shown that v_L1()λ() π224, and that this bound is sharp.