Higher Laplacians on pseudo-Hermitian symmetric spaces
Abstract
Let X=G/H be a symmetric space for a real simple Lie group G, equipped with a G-invariant complex structure. Then, X is a pseudo-Hermitian manifold, and in this geometric setting, higher Laplacians Lm are defined for each positive integer m, which generalize the ordinary Laplace-Beltrami operator. We show that L1,L3,…, L2r-1 form a set of algebraically independent generators for the algebra DG(X) of G-invariant differential operators on X, where r denotes the rank of X. This confirms a conjecture of Englis and Peetre, originally stated for the class of Hermitian symmetric spaces.
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