Criteria for solvability of left invariant operators on nilpotent Lie groups

Corwin, Lawrence

doi:10.1090/S0002-9947-1983-0712249-3

Criteria for solvability of left invariant operators on nilpotent Lie groups
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Trans. Amer. Math. Soc. 280 (1983), 53-72 Request permission

Abstract:

We define a special nilpotent Lie group $N$ to be one which has a $1$-dimensional center, dilations, square-integrable representations, and a maximal subordinate algebra common to almost all functionals on the Lie algebra $\mathfrak {N}$. Every nilpotent Lie group with dilations imbeds in such a special group so that the dilations extend. Let $L$ be a homogeneous left invariant differential operator on $N$. We give a representation-theoretic condition on $L$ which $L$ must satisfy if it has a tempered fundamental solution and which implies global solvability of $L$. (The sufficiency is a corollary of a more general theorem, valid on all nilpotent $N$.) For the Heisenberg group, the condition is equivalent to having a tempered fundamental solution.

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