Topological Bounds for Fourier Coefficients and Applications to Torsion

Abstract

Let ⊂ R2 be a bounded convex domain in the plane and consider align* - u &=1 in~ \\ u &= 0 on~∂ . align* If u assumes its maximum in x0 ∈ , then the eccentricity of level sets close to the maximum is determined by the Hessian D2u(x0). We prove that D2u(x0) is negative definite and give a quantitative bound on the spectral gap λ(D2u(x0)) ≤ - c1( -c2diam()inrad() ) for universal c1, c2 This is sharp up to constants. The proof is based on a new lower bound for Fourier coefficients whose proof has a topological component: if f:T → R is continuous and has n sign changes, then Σk=0n/2 | f, kx | + | f, kx | n | f\|n+1L1(T) \| f\|n L∞(T). This statement immediately implies estimates on higher derivatives of harmonic functions u in the unit ball: if u is very flat in the origin, then the boundary function u(t, t):T → R has to have either large amplitude or many roots. It also implies that the solution of the heat equation starting with f:T → R cannot decay faster than (-(\# sign changes)2 t/4).