On Pointwise Products of Elliptic Eigenfunctions

Abstract

We consider eigenfunctions of Schr\"odinger operators on a d-dimensional bounded domain (or a d-dimensional compact manifold ) with Dirichlet conditions. These operators give rise to a sequence of eigenfunctions (φn)n ∈ N. We study the subspace of all pointwise products An = span \ φi(x) φj(x): 1 ≤ i,j ≤ n\ ⊂eq L2(). Clearly, that vector space has dimension dim(An) = n(n+1)/2. We prove that products φi φj of eigenfunctions are simple in a certain sense: for any > 0, there exists a low-dimensional vector space Bn that almost contains all products. More precisely, denoting the orthogonal projection Bn:L2() → Bn, we have ∀~1 ≤ i,j ≤ n~ \|φiφj - Bn( φi φj) \|L2 ≤ and the size of the space dim(Bn) is relatively small dim(Bn) ( 1 1 ≤ i ≤ n \|φi\|L∞ )d n. In the generic delocalized setting, this bound grows linearly up to logarithmic factors: pointwise products of eigenfunctions are low-rank. This has implications, among other things, for the validity of fast algorithms in electronic structure computations.