The constant term of tempered functions on a real spherical space
Abstract
Let Z be a unimodular real spherical space. We develop a theory of constant terms for tempered functions on Z which parallels the work of Harish-Chandra. The constant terms fI of an eigenfunction f are parametrized by subsets I of the set S of spherical roots which determine the fine geometry of Z at infinity. Constant terms are transitive i.e. (fJ)I=fI for I⊂ J, and our main result is a quantitative bound of the difference f-fI, which is uniform in the parameter of the eigenfunction.
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