On the Lr Hodge theory in complete non compact riemannian manifolds
Abstract
We study solutions for the Hodge laplace equation u=ω on p forms with Lr estimates for r>1. Our main hypothesis is that has a spectral gap in L2. We use this to get non classical Lr Hodge decomposition theorems. An interesting feature is that to prove these decompositions we never use the boundedness of the Riesz transforms in Ls. These results are based on a generalisation of the Raising Steps Method to complete non compact riemannian manifolds.
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