We use the Weierstrass σ-function associated with a lattice in the complex plane to construct finite dimensional zero-based subspaces and quasi-invariant subspaces of given index in the Bargmann-Fock space.
The authors introduce a kind of slowly increasing cohomology HS*(X) for a discrete metric space X with polynomial growth,and construct a character map from the slowly increasing cohomology HS*(X) into HC*cont(S(X)),the continuous cyclic cohomology of the smooth subalgebra S(X) of the uniform Roe algebra B*(X).As an application,it is shown that the fundamental cocycle,associated with a uniformly contractible complete Riemannian manifold M with polynomial volume growth and polynomial contractibility radius growth,is slowly increasing.
This paper gives a note on weighted composition operators on the weighted Bergman space, which shows that for a fixed composition symbol, the weighted composition operators are bounded on the weighted Bergman space only with bounded weighted symbols if and only if the composition symbol is a finite Blaschke product.