The Phi-dimension: A new homological measure

Abstract

K. Igusa and G. Todorov introduced two functions φ and , 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 understand better the finitistic dimension conjecture. In this paper, for an artin R-algebra A and the Igusa-Todorov function φ, we characterise the φ-dimension of A in terms either of the bi-functors ExtiA(-, -) or Tor's bi-functors TorAi(-,-). Furthermore, by using the first characterisation of the φ-dimension, we show that the finiteness of the φ-dimension of an artin algebra is invariant under derived equivalences. As an application of this result, we generalise the classical Bongartz's result as follows: For an artin algebra A, a tilting A-module T and the endomorphism algebra B=EndA(T)op, we have that Fidim\,(A)-pd\,T≤ Fidim\,(B)≤ Fidim\,(A)+pd\,T.