Integral linear operator

rdf:langString Integral linear operator

rdf:langString Theorem

rdf:langString An integral bilinear form is a bilinear functional that belongs to the continuous dual space of , the injective tensor product of the locally convex topological vector spaces (TVSs) X and Y. An integral linear operator is a continuous linear operator that arises in a canonical way from an integral bilinear form. These maps play an important role in the theory of nuclear spaces and nuclear maps.

rdf:langString The dual of consists of exactly those continuous bilinear forms on that can be represented in the form of a map : where and are some closed, equicontinuous subsets of and , respectively, and is a positive Radon measure on the compact set with total mass Furthermore, if is an equicontinuous subset of then the elements can be represented with fixed and running through a norm bounded subset of the space of Radon measures on