A Simplified Calculation for the Fundamental Solution to the Heat Equation on the Heisenberg Group

Abstract

Let L = -1/4 (Σj=1n(Xj2+Yj2)+iγ T) where γ is a complex number, Xj, Yj, and T are the left invariant vector fields of the Heisenberg group structure for Rn × Rn × R. We explicitly compute the Fourier transform (in the spatial variables) of the fundamental solution of the Heat Equation ∂s = -L. As a consequence, we have a simplified computation of the Fourier transform of the fundamental solution of the b-heat equation on the Heisenberg group and an explicit kernel of the heat equation associated to the weighted dbar-operator in Cn with weight (-τ P(z1,...,zn)) where P(z1,...,zn) = 1/2(x12 + >... xn2), zj=xj+iyj, and τ∈ R.