On fully commutative elements of type B and D

Abstract

We define a tower of injections of B-type (resp. D-type) Coxeter groups W( Bn) (resp. W( Dn)) for n≥ 3. Let Wc( Bn) (resp. Wc( Dn)) be the set of fully commutative elements in W( Bn) (resp. W( Dn)), we classify the elements of this set by giving a normal form for them. We define a B-type tower of Hecke algebras and we use the faithfulness at the Coxeter level to show that this last tower is a tower of injections. We use this normal form to define two injections from Wc( Bn-1) into Wc( Bn). We then define the tower of affine Temperley-Lieb algebras of type B and use the injections above to prove the faithfulness of this tower. We follow the same track for D-type objects