Decomposition of L2-vector fields on Lipschitz surfaces: characterization via null-spaces of the scalar potential

Abstract

For ∂ the boundary of a bounded and connected strongly Lipschitz domain in Rd with d≥3, we prove that any field f∈ L2 (∂ ; Rd) decomposes, in an unique way, as the sum of three silent vector fields---fields whose magnetic potential vanishes in one or both components of Rd∂ . Moreover, this decomposition is orthogonal if and only if ∂ is a sphere. We also show that any f in L2 (∂ ; Rd) is uniquely the sum of two silent fields and a Hardy function, in which case the sum is orthogonal regardless of ∂ ; we express the corresponding orthogonal projections in terms of layer potentials. When ∂ is a sphere, both decompositions coincide and match what has been called the Hardy-Hodge decomposition in the literature.