Inducing Riesz and orthonormal bases in L2 via composition operators

Abstract

Let Ch be a composition operator mapping L2(1) into L2(2) for some open sets 1, 2 ⊂eq Rn. We characterize the mappings h that transform Riesz bases of L2(1) into Riesz bases of L2(2). Restricting our analysis to differentiable mappings, we demonstrate that mappings h that preserve Riesz bases have Jacobian determinants that are bounded away from zero and infinity. We discuss implications of these results for approximation theory, highlighting the potential of using bijective neural networks to construct Riesz bases with favorable approximation properties.