On the continuity of the product of distributions in local Sobolev spaces

Abstract

We consider the space HL s,r (O) consisting of all local Sobolev distributions of order s on an open set O whose Sobolev wave front set of order r is contained in the closed conic set L⊂eq O×(Rm\0\). We introduce a locally convex topology on HL s,r (O) and show that the ordinary product of smooth functions uniquely extends to a continuous bilinear mapping HL1 r1,r' (O) × HL2 r2,r'' (O) HL s,r (O), for appropriate s and r when L1 and L2 are in a favorable position. The key ingredient in our proof is to employ H\"ormander's idea of considering the pullback by the diagonal map x (x,x) of the tensor product of two distributions.

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