Finite Sections of Segal-bargmann Space Toeplitz Operators with Polyradially Continuous Symbols

We establish a criterion for the asymptotic invertibility of Toeplitz operators on the Segal-Bargmann space on C whose symbols have the property that the polyradial limits r 1 ^ 0 0 a ( r l ' l » " » ' V t f ) \ ,-,rN-KX> exist for all (t{, . . . , tN) € T^ and represent a continuous function on T^ .