Uniqueness results for quasi-analytic functions on compact Lie groups and homogeneous spaces

Abstract

In this article, we establish a quantitative uniqueness theorem for quasi-analytic functions defined on compact, connected Lie groups G and on homogeneous spaces G/H, where H is any closed subgroup of G. Our result extends classical Logvinenko-Sereda-type theorems to the setting of quasi-analytic functions on compact Lie groups and their homogeneous spaces. We introduce the quasi-analytic class of functions using iterates of the Casimir operator on G. This construction is justified by establishing that every function in this class possesses the strong unique continuation property. In particular, our result extends a result of P. Chernoff (Bull. Amer. Math. Soc., 1975) to the framework of compact Lie groups and their homogeneous spaces.