Characterization of the traces on the boundary of functions in magnetic Sobolev spaces

Abstract

We characterize the trace of magnetic Sobolev spaces defined in a half-space or in a smooth bounded domain in which the magnetic field A is differentiable and its exterior derivative corresponding to the magnetic field dA is bounded. In particular, we prove that, for d 1 and p>1, the trace of the magnetic Sobolev space W1, pA(Rd+1+) is exactly W1-1/p, pA(Rd) where A(x) =( A1, …c, Ad)(x, 0) for x ∈ Rd with the convention A = (A1, …c, Ad+1) when A ∈ C1(Rd+1+, Rd+1). We also characterize fractional magnetic Sobolev spaces as interpolation spaces and give extension theorems from a half-space to the entire space.