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Heat Semigroups on Weyl Algebra

Mathematical Physics 2021-02-02 v2 High Energy Physics - Theory math.MP

Abstract

We study the algebra of semigroups of Laplacians on the Weyl algebra. We consider first-order partial differential operators i±\nabla^\pm_i forming the Lie algebra [j±,k±]=iRjk±[\nabla^\pm_j,\nabla^\pm_k]= i\mathcal{R}^\pm_{jk} and [j+,k]=i12(Rjk++Rjk)[\nabla^+_j,\nabla^-_k] =i\frac{1}{2}(\mathcal{R}^+_{jk}+\mathcal{R}^-_{jk}) with some anti-symmetric matrices Rij±\mathcal{R}^\pm_{ij} and define the corresponding Laplacians Δ±=g±iji±j±\Delta_\pm=g_\pm^{ij}\nabla^\pm_i\nabla^\pm_j with some positive matrices g±ijg_\pm^{ij}. We show that the heat semigroups exp(tΔ±)\exp(t\Delta_\pm) can be represented as a Gaussian average of the operators exp<ξ,±>\exp\left<\xi,\nabla^\pm\right> and use these representations to compute the product of the semigroups, exp(tΔ+)exp(sΔ)\exp(t\Delta_+)\exp(s\Delta_-) and the corresponding heat kernel.

Cite

@article{arxiv.2008.12344,
  title  = {Heat Semigroups on Weyl Algebra},
  author = {Ivan G. Avramidi},
  journal= {arXiv preprint arXiv:2008.12344},
  year   = {2021}
}

Comments

42 pages; version accepted in J. Geom. Phys

R2 v1 2026-06-23T18:09:05.953Z