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Related papers: Delooping levels

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In this paper, we develop new ideas regarding the finitistic dimension conjecture, or the findim conjecture for short. Specifically, we improve upon the delooping level by introducing three new invariants called the effective delooping…

Representation Theory · Mathematics 2025-04-15 Ruoyu Guo , Kiyoshi Igusa

We investigate the relationship between the delooping level (dell) and the finitistic dimension of left and right serial path algebras. These 2-syzygy finite algebras have finite delooping level, and it can be calculated with an easy and…

Representation Theory · Mathematics 2025-06-04 Ruoyu Guo

A new homological dimension, called the Igusa-Todorov distance, is introduced to measure how far an Artin algebra is from being an Igusa-Todorov algebra. An upper bound for the dimension is established in terms of the Loewy length, leading…

Representation Theory · Mathematics 2025-08-11 Jinbi Zhang , Junling Zheng

For any Artin algebra, we construct a related algebra that increases the delooping level on one side while decreasing it to zero on the opposite side. This dual construction corresponds to Cummings' original work on finite dimensional…

Representation Theory · Mathematics 2026-04-17 YongLiang Sun , Jinbi Zhang

We investigate the inequality ${\rm Findim}\ \! \Lambda^{op} \leq {\rm dell}\ \! \Lambda$ between the finitistic dimension and the delooping level of an Artin algebra $\Lambda$, and whether equality holds in general. We prove that equality…

Representation Theory · Mathematics 2020-05-12 Vincent Gélinas

K. Igusa and G. Todorov introduced two functions $\phi$ and $\psi,$ which are natural and important homological measures generalising the notion of the projective dimension. These Igusa-Todorov functions have become into a powerful tool to…

Representation Theory · Mathematics 2014-04-22 Sonia Fernandes , Marcelo Lanzilotta , Octavio Mendoza

The finitistic dimension conjecture is closely connected to the symmetry of the finitistic dimension. Recent work indicates that such connection extends to one of its upper bounds, the delooping level. In this paper, we show that the same…

Representation Theory · Mathematics 2025-08-05 Ruoyu Guo

If A is an artin algebra, G\'elinas has introduced an interesting upper bound for the finitistic dimension of A, namely the delooping level del A. We assert that for any Nakayama algebra, its finitistic dimension is equal to del A. This…

Representation Theory · Mathematics 2021-01-21 Claus Michael Ringel

Let $A$ be an Artin algebra and $F$ a non-zero subfunctor of $\Ext_A^{1}(-,-)$. In this paper, we characterize the relative $\phi$-dimension of $A$ by the bi-functor $\Ext_F^1(-,-)$. Furthermore, we show that the finiteness of relative…

Representation Theory · Mathematics 2025-04-23 Peizheng Guo , Shengyong Pan

We investigate two invariants of Noetherian semiperfect rings, namely the depth and a new invariant we call the "delooping level". These give lower and upper bounds for the finitistic dimension, respectively. As first theorems, we give a…

Representation Theory · Mathematics 2020-04-13 Vincent Gélinas

We give another proof of the recent result of Ringel, which asserts equality between the finitistic dimension and delooping level of Nakayama algebras. The main tool is syzygy filtration method introduced in \cite{sen2019}. In particular,…

Representation Theory · Mathematics 2020-09-21 Emre Sen

The article primarily surveys work that followed from the formulas discovered by Avramov and Iyengar in 2008, which permit one to compute certain Hochschild homology and cohomology modules as expressions involving dualizing complexes. One…

Algebraic Geometry · Mathematics 2017-06-22 Amnon Neeman

In this paper we suggest a new general formalism for studying the invariants of polyhedra and manifolds comming from the theory of von Neumann algebras. First, we examine generality in which one may apply the construction of the extended…

dg-ga · Mathematics 2008-02-03 Michael Farber

We give an example of a finite dimensional algebra with infinite delooping level, based on an example of a semi-Gorenstein-projective module due to Ringel and Zhang.

Representation Theory · Mathematics 2023-05-17 Luke Kershaw , Jeremy Rickard

In this paper, we study homological dimensions of algebras linked by recollements of derived module categories, and establish a series of new upper bounds and relationships among their finitistic or global dimensions. This is closely…

Rings and Algebras · Mathematics 2018-05-01 Hongxing Chen , Changchang Xi

There is a well-known class of algebras called Igusa-Todorov algebras which were introduced in relation to finitistic dimension conjecture. As a generalization of Igusa-Todorov algebras, the new notion of $(m,n)$-Igusa-Todorov algebras…

Representation Theory · Mathematics 2024-10-11 Junling Zheng , Yingying Zhang

In this paper we study the behaviour of the Igusa-Todorov functions for Artin algebras A with finite injective dimension, and Gorenstein algebras as a particular case. We show that the $\phi$-dimension and $\psi$-dimension are finite in…

Representation Theory · Mathematics 2016-06-03 Marcelo Lanzilotta , Gustavo Mata

In this article we prove that, under certain hypotheses, Morita context algebras that have zero bimodule morphisms have finite $\phi$-dimension. We also study the behaviour of the $\phi$-dimension for an algebra and its opposite. In…

Representation Theory · Mathematics 2022-11-15 Marcos Barrios , Gustavo Mata

In this paper we show that the (un)bounded derived categories$\colon$(i) of the monomorphism category, (ii) of the morphism category and (iii) of the double morphism category, admit a periodic infinite ladder of recollements. These results…

Representation Theory · Mathematics 2016-06-24 Nan Gao , Chrysostomos Psaroudakis

We construct a finite-dimensional algebra derived equivalent to the example of Kershaw--Rickard. For the Kershaw--Rickard example the delooping level and the sub-derived delooping level are both infinite, while for our algebra both…

Representation Theory · Mathematics 2026-03-16 Liang Chen
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