Lie algebras of linear systems and their automorphisms

Abstract

The objective of this thesis is to study the automorphism groups of the Lie algebras attached to linear systems. A linear system is a pair of vector spaces (U,W) with a nondegenerate pairing ·,· U W C, to which we attach three Lie algebras slU,W⊂ glU,W⊂glMU,W. If both U and W are countable dimensional, then, up to isomorphism, there is a unique linear system (V,V*). In this case slV,V* and glV,V* are the well-known Lie algebras sl∞ and gl∞, while the Lie algebra glMV,V* is the Mackey Lie algebra introduced in PSer. We review results about the monoidal categories TslU,W and TglMU,W of tensor modules, both of which turn out to be equivalent as monoidal categories to the category Tsl∞ introduced earlier in DPS. Using the relations between the categories Tsl∞ and TglM∞, we compute the automorphism group of glM∞.