Heat Semigroups on Weyl Algebra
Abstract
We study the algebra of semigroups of Laplacians on the Weyl algebra. We consider first-order partial differential operators ∇i forming the Lie algebra [∇j,∇k]= iRjk and [∇+j,∇-k] =i12(R+jk+R-jk) with some anti-symmetric matrices Rij and define the corresponding Laplacians =gij∇i∇j with some positive matrices gij. We show that the heat semigroups (t) can be represented as a Gaussian average of the operators <,∇> and use these representations to compute the product of the semigroups, (t+)(s-) and the corresponding heat kernel.
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