On the L2-Stokes theorem and Hodge theory for singular algebraic varieties
Abstract
For a projective algebraic variety V with isolated singularities, endowed with a metric induced from an embedding, we consider the analysis of the natural partial differential operators on the regular part of V. We show that, in the complex case, the Laplacians of the de Rham and Dolbeault complexes are discrete operators except possibly in degrees n,n 1, where n is the complex dimension of V. We also prove a Hodge theorem on the operator level and the L2--Stokes theorem outside the degrees n-1,n. We show that the L2-Stokes theorem may fail to hold in the case of real algebraic varieties, and also discuss the L2-Stokes theorem on more general non-compact spaces.
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