Toeplitz Operators on Two Poly-Bergman-Type Spaces of the Siegel Domain D2 ⊂ C2 with Continuous Nilpotent Symbols

Abstract

We describe certain C*-algebras generated by Toeplitz operators with nilpotent symbols and acting on a poly-Bergman type space of the Siegel domain D2 ⊂ C2. Bounded measurable functions of the form c(ζ) = c(Im\, ζ1, Im\, ζ2 - |ζ1|2) are called nilpotent symbols. In this work we consider symbols of the form a(ζ) = a(Im\, ζ1) and b(ζ) = b(Im\, ζ2 -|ζ1|2), where both limits s→ 0+ b(s) and s→ +∞ b(s) exist, and a belongs to the set of piece-wise continuous functions on R=[-∞,+∞] and with one-sided limits at 0. We describe certain C*-algebras generated by such Toeplitz operators that turn out to be isomorphic to subalgebras of Mn(C) C(), where =R × R+ and R+=[0,+∞].