Toeplitz operators on the Fock space with quasi-radial symbols

Abstract

The Fock space F(Cn) is the space of holomorphic functions on Cn that are square-integrable with respect to the Gaussian measure on Cn. This space plays an important role in several subfields of analysis and representation theory. In particular, it has for a long time been a model to study Toeplitz operators. Esmeral and Maximenko showed in 2016 that radial Toeplitz operators on F(C) generate a commutative C*-algebra which is isometrically isomorphic to the C*-algebra Cb,u(N0,1). In this article, we extend the result to k-quasi-radial symbols acting on the Fock space F(Cn). We calculate the spectra of the said Toeplitz operators and show that the set of all eigenvalue functions is dense in the C*-algebra Cb,u(N0k,k) of bounded functions on N0k which are uniformly continuous with respect to the square-root metric. In fact, the C*-algebra generated by Toeplitz operators with quasi-radial symbols is Cb,u(N0k,k).