Combinatorics and structure of Hecke-Kiselman algebras

Abstract

Hecke-Kiselman monoids HK and their algebras K[HK], over a field K, associated to finite oriented graphs are studied. In the case is a cycle of length n≥slant 3, a hierarchy of certain unexpected structures of matrix type is discovered within the monoid Cn=HK and it is used to describe the structure and the properties of the algebra K[Cn]. In particular, it is shown that K[Cn] is a right and left Noetherian algebra, while it has been known that it is a PI-algebra of Gelfand-Kirillov dimension one. This is used to characterize all Noetherian algebras K[HK] in terms of the graphs . The strategy of our approach is based on the crucial role played by submonoids of the form Cn in combinatorics and structure of arbitrary Hecke-Kiselman monoids HK.