Add to ORKGLet $ A$ be a Nakayama algebra with $ n$ simple modules and a simple module $ S$ of even projective dimension. Choose $ m$ minimal such that a simple $ A$-module with projective dimension $ 2m$ exists. Then we show that the global dimension of $ A$ is bounded by $ n+m-1$. This gives a combined generalisation of results of Gustafson [J. Algebra 97 (1985), pp. 14-16] and Madsen [Projective dimensions and Nakayama algebras, Amer. Math. Soc., Providence, RI, 2005]. In [Comm. Algebra 22 (1994), pp. 1271-1280], Brown proved that the global dimension of quasi-hereditary Nakayama algebras with $ n$ simple modules is bounded by $ n$. Using our result on the bounds of global dimensions of Nakayama algebras, we give a short new proof of this result an...
Homological techniques provide potent tools in commutative algebra. For example, successive approxim...
Ringel CM. Iyama's finiteness theorem via strongly quasi-hereditary algebras. Journal of Pure and Ap...
AbstractWe show that, if T is a selfsmall and selforthogonal module over a noetherian ring R of fini...
Let $ A$ be a Nakayama algebra with $ n$ simple modules and a simple module $ S$ of even projective ...
Author's accepted version (postprint).This is an Accepted Manuscript of an article published by Else...
We introduce a method "syzygy filtration" to give building blocks of syzygies appearing in projectiv...
Ringel CM. Linear Nakayama algebras which are higher Auslander algebras. Communications in Algebra....
For Nakayama algebras $A$, we prove that in case $Ext_A^1(M,M) \neq 0$ for an indecomposable $A$-mod...
summary:In this note we show that for a $\ast ^{n}$-module, in particular, an almost $n$-tilting mod...
AbstractIt is shown that, given any left artinian ring Λ which has vanishing radical cube and n isom...
AbstractIn this paper, we consider how the ∇-, Δ- and global dimensions of a quasi-hereditary algebr...
AbstractA new homological dimension, called G*-dimension, is defined for every finitely generated mo...
AbstractLet Λ be an artin algebra and X a finitely generated Λ-module. Iyama has shown that there ex...
The Nakayama conjecture states that every finite dimensional algebra of infinite dominant dimension ...
AbstractWe study Auslander's representation dimension of Artin algebras, which is by definition the ...
Homological techniques provide potent tools in commutative algebra. For example, successive approxim...
Ringel CM. Iyama's finiteness theorem via strongly quasi-hereditary algebras. Journal of Pure and Ap...
AbstractWe show that, if T is a selfsmall and selforthogonal module over a noetherian ring R of fini...
Let $ A$ be a Nakayama algebra with $ n$ simple modules and a simple module $ S$ of even projective ...
Author's accepted version (postprint).This is an Accepted Manuscript of an article published by Else...
We introduce a method "syzygy filtration" to give building blocks of syzygies appearing in projectiv...
Ringel CM. Linear Nakayama algebras which are higher Auslander algebras. Communications in Algebra....
For Nakayama algebras $A$, we prove that in case $Ext_A^1(M,M) \neq 0$ for an indecomposable $A$-mod...
summary:In this note we show that for a $\ast ^{n}$-module, in particular, an almost $n$-tilting mod...
AbstractIt is shown that, given any left artinian ring Λ which has vanishing radical cube and n isom...
AbstractIn this paper, we consider how the ∇-, Δ- and global dimensions of a quasi-hereditary algebr...
AbstractA new homological dimension, called G*-dimension, is defined for every finitely generated mo...
AbstractLet Λ be an artin algebra and X a finitely generated Λ-module. Iyama has shown that there ex...
The Nakayama conjecture states that every finite dimensional algebra of infinite dominant dimension ...
AbstractWe study Auslander's representation dimension of Artin algebras, which is by definition the ...
Homological techniques provide potent tools in commutative algebra. For example, successive approxim...
Ringel CM. Iyama's finiteness theorem via strongly quasi-hereditary algebras. Journal of Pure and Ap...
AbstractWe show that, if T is a selfsmall and selforthogonal module over a noetherian ring R of fini...