Hausdorff operators on Fock Spaces
Abstract
Let μ be a positive Borel measure on the positive real axis. We study the integral operator Hμ(f)(z)=∫0∞1tf(zt)\,dμ(t), z∈ C\,, acting on the Fock spaces Fpα, p∈ [1,∞],\,α >0. Its action is easily seen to be a coefficient multiplication by the moment sequence μn= ∫1∞1tn+1\,dμ(t) . We prove that equation* ||Hμ||Fpα Fpα=n∈Nμn,\,\,\,\,\,1≤ p≤ ∞\,\,. equation* A little-o,condition describes the compactness of Hμ on every Fpα,\,p∈ (1,∞ ). In addition, we completely characterize the Schatten class membership of Hμ.
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