Commutants and Complex Symmetry of Finite Blaschke Product Multiplication Operator in L2()
Abstract
Consider the multiplication operator MB in L2(), where the symbol B is a finite Blaschke product. In this article, we characterize the commutant of MB in L2(), noting the fact that L2() is not an RKHS. As an application of this characterization result, we explicitly determine the class of conjugations commuting with Mz2 or making Mz2 complex symmetric by introducing a new class of conjugations in L2(). Moreover, we analyze their properties while keeping the whole Hardy space, model space, and Beurling-type subspaces invariant. Furthermore, we extended our study concerning conjugations in the case of finite Blaschke.
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