Representations of tensor algebras as quotients of group algebras

amenability of banach algebras

chapters 1 and 2 establish the basic theory of amenability of topological groups and amenability of banach algebras. also we prove that. if g is a topological group, then r (wluc (g)) (resp. r (luc (g))) if and only if there exists a mean m on wluc (g) (resp. luc (g)) such that for every wluc (g) (resp. every luc (g)) and every element d of a dense subset d od g, m (r)m (f) holds. chapter 3 inv...

On Fox Quotients of Arbitrary Group Algebras

For a group G and N-series G of G let In R,G(G), n ≥ 0, denote the filtration of the group algebra R(G) induced by G , and IR(G) its augmentation ideal. For subgroups H of G , left ideals J of R(H) and right H -submodules M of IZZ(G) the quotients IR(G)J/MJ are studied by homological methods, notably for M = IZZ(G)IZZ(H), IZZ(H)IZZ(G) + IZZ([H,G])ZZ(G) and ZZ(G)IZZ(N) + In ZZ,G(G) with N CG whe...

Title: Q-schur Algebras as Quotients of Quantized Enveloping Algebras

Algebras of Quotients of Path Algebras

Leavitt path algebras are shown to be algebras of right quotients of their corresponding path algebras. Using this fact we obtain maximal algebras of right quotients from those (Leavitt) path algebras whose associated graph satisfies that every vertex connects to a line point (equivalently, the Leavitt path algebra has essential socle). We also introduce and characterize the algebraic counterpa...

Algebras of Quotients of Leavitt Path Algebras

We start this paper by showing that the Leavitt path algebra of a (row-finite) graph is an algebra of quotients of the corresponding path algebra. The path algebra is semiprime if and only if whenever there is a path connecting two vertices, there is another one in the opposite direction. Semiprimeness is studied because, for acyclic graphs, the Leavitt path algebra is a Fountain-Gould algebra ...