Subduals and tensor products of spaces of harmonic functions
Working in the axiomatic potential theory of M. Brelot, a description of the subdual of the vector space generated by the cone of positive harmonic functions on a harmonic space, , is given. Under certain hypothesis this is seen to be a function space on the Martin boundary of . Some ancillary results are proved. Next, it is shown, using this result and the theory of tensor products of simplexes, that the cone of positive separately harmonic functions is the tensor product of the cones of positive...