Products of Toeplitz operators on the Fock space
Abstract
Let f and g be functions, not identically zero, in the Fock space F2 of Cn. We show that the product TfT g of Toeplitz operators on F2 is bounded if and only if f(z)=eq(z) and g(z)=ce-q(z), where c is a nonzero constant and q is a linear polynomial.
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