For each n=2, we define an algebra satisfying many properties that one might expect to hold for a Brauer algebra of type C_n. The monomials of this algebra correspond to scalar multiples of symmetric Brauer diagrams on 2n strands. The algebra is shown to be free of rank the number of such diagrams and cellular, in the sense of Graham and Lehrer
For each n=1, we define an algebra having many properties that one might expect to hold for a Brauer...
For each n>0, we define an algebra having many properties that one might expect to hold for a Brauer...
For each n>0, we define an algebra having many properties that one might expect to hold for a Bra...
For each n=2, we define an algebra satisfying many properties that one might expect to hold for a Br...
For each n=2, we define an algebra satisfying many properties that one might expect to hold for a Br...
AbstractFor each n≥2, we define an algebra satisfying many properties that one might expect to hold ...
For each natural number n greater than 1, we define an algebra satisfying many properties that one m...
For each natural number n greater than 1, we define an algebra satisfying many properties that one m...
For each n≥2, we define an algebra satisfying many properties that one might expect to hold for a Br...
For each natural number n greater than 1, we define an algebra satisfying many properties that one m...
For each natural number n greater than 1, we define an algebra satisfying many properties that one m...
AbstractFor each n≥2, we define an algebra satisfying many properties that one might expect to hold ...
For each n ≥ 1, we define an algebra having many properties that one might expect to hold for a Brau...
For each n ≥ 1, we define an algebra having many properties that one might expect to hold for a Brau...
For each n=1, we define an algebra having many properties that one might expect to hold for a Brauer...
For each n=1, we define an algebra having many properties that one might expect to hold for a Brauer...
For each n>0, we define an algebra having many properties that one might expect to hold for a Brauer...
For each n>0, we define an algebra having many properties that one might expect to hold for a Bra...
For each n=2, we define an algebra satisfying many properties that one might expect to hold for a Br...
For each n=2, we define an algebra satisfying many properties that one might expect to hold for a Br...
AbstractFor each n≥2, we define an algebra satisfying many properties that one might expect to hold ...
For each natural number n greater than 1, we define an algebra satisfying many properties that one m...
For each natural number n greater than 1, we define an algebra satisfying many properties that one m...
For each n≥2, we define an algebra satisfying many properties that one might expect to hold for a Br...
For each natural number n greater than 1, we define an algebra satisfying many properties that one m...
For each natural number n greater than 1, we define an algebra satisfying many properties that one m...
AbstractFor each n≥2, we define an algebra satisfying many properties that one might expect to hold ...
For each n ≥ 1, we define an algebra having many properties that one might expect to hold for a Brau...
For each n ≥ 1, we define an algebra having many properties that one might expect to hold for a Brau...
For each n=1, we define an algebra having many properties that one might expect to hold for a Brauer...
For each n=1, we define an algebra having many properties that one might expect to hold for a Brauer...
For each n>0, we define an algebra having many properties that one might expect to hold for a Brauer...
For each n>0, we define an algebra having many properties that one might expect to hold for a Bra...