On ∂ homotopy formulae for product domains: Nijenhuis-Woolf's formulae and optimal Sobolev estimates

Abstract

We construct homotopy formulae f=∂ Hqf+ Hq+1∂ f for (0,q) forms on the product domain 1×…×m, where each j is either a bounded Lipschitz domain in C1, a bounded strongly pseudoconvex domain with C2 boundary, or a smooth convex domain of finite type. Such homotopy operators Hq yield solutions to the ∂ equation with optimal Sobolev regularity Wk,p Wk,p simultaneously for all k∈ Z and 1<p<∞.

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