Tensorization of quasi-Hilbertian Sobolev spaces

Abstract

The tensorization problem for Sobolev spaces asks for a characterization of how the Sobolev space on a product metric measure space X× Y can be determined from its factors. We show that two natural descriptions of the Sobolev space from the literature coincide, W1,2(X× Y)=J1,2(X,Y), thus settling the tensorization problem for Sobolev spaces in the case p=2, when X and Y are infinitesimally quasi-Hilbertian, i.e. the Sobolev space W1,2 admits an equivalent renorming by a Dirichlet form. This class includes in particular metric measure spaces X,Y of finite Hausdorff dimension as well as infinitesimally Hilbertian spaces. More generally for p∈ (1,∞) we obtain the norm-one inclusion \|f\|J1,p(X,Y) \|f\|W1,p(X× Y) and show that the norms agree on the algebraic tensor product W1,p(X) W1,p(Y)⊂ W1,p(X× Y). When p=2 and X and Y are infinitesimally quasi-Hilbertian, standard Dirichlet form theory yields the density of W1,2(X) W1,2(Y) in J1,2(X,Y) thus implying the equality of the spaces. Our approach raises the question of the density of W1,p(X) W1,p(Y) in J1,p(X,Y) in the general case.