Blocks of the Brauer category over the complex field

Abstract

Let B(δ) be the Brauer category over the complex field C with the parameter δ. In non-semisimple case, δ is an integer, and each weight space of (δ2-1)th semi-infinite wedge space corresponds to either a single block or a union of two different blocks of B(δ)-lfdmod, the category of the locally finite-dimensional representations of B(δ). Furthermore, each block contains an infinite number of irreducible representations of B(δ), and all blocks of B(δ)-lfdmod can be obtained in this way