Inner products on the Hilbert space S2 of Hilbert--Schmidt operators
Abstract
This work presents a rigorous characterization of inner products on the Hilbert space S2 of Hilbert--Schmidt operators. We first deal with a general setting of continuous sesquilinear forms on a Hilbert space H, and provide a characterization of all inner products by means of positive operators in B(H). Next, we establish necessary and sufficient conditions for an operator in B(S2) to be positive. Identifying an inner product with a positive operator enables us to rigorously describe inner products on S2.
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