Syzygy Filtrations of Cyclic Nakayama Algebras

Abstract

For any cyclic Nakayama algebra , we construct syzygy filtered algebra () which corresponds to various syzygy modules as the name suggests. We prove that the category of modules over the syzygy filtered algebra () is equivalent to the wide subcategory cogenerated by projective-injective modules of the original algebra along with other categorical equivalences. In terms of this new algebra, we interpret the following homological invariants of : left and right finitistic dimension, left and right -dimension, Gorenstein dimension, dominant dimension and their upper bounds. For all of them, we obtain a unified upper bound 2r where r is the number of relations defining the algebra . We show that the left finitistic and -dimensions are equal to the right finitistic and -dimensions respectively, as well as the difference between -dimension and the finitistic dimension is at most one. Furthermore, we recover various seemingly unrelated results in a uniform way.