L2 estimate for polynomials of the Laplace operator with Gaussian measure
Abstract
Let P() be a polynomial of the Laplace operator =Σj=1n∂2∂ x2j on Rn. We prove the existence of weak solutions of the equation P()u=f and the existence of a bounded right inverse of the differential operator P() in the weighted Hilbert space with Gaussian measure, i.e., L2(Rn,e-|x|2).
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