Some remarks on two-periodic modules over local rings
Article Type
Research Article
Publication Title
Journal of Algebra and Its Applications
Abstract
In this paper, some properties of finitely generated two-periodic modules over commutative Noetherian local rings have been studied. We show that under certain assumptions on a pair of modules (M,N) with M being two-periodic, the natural map M ⊗ RN →HomR(M, ∗N) is an isomorphism. As a consequence, we prove that Auslander's depth formula holds for such a Tor-independent pair. Tor-independence plays a crucial role for the depth formula to hold. Under certain assumptions on the modules, we show that a pair of modules, over a one-dimensional local ring, is Tor-independent if and only if their tensor product is torsion-free. Celikbas et al. recently showed the Huneke-Wiegand conjecture holds for two-periodic modules over one-dimensional domains. We generalize their result to the case of two-periodic modules with rank over one-dimensional local rings.
DOI
10.1142/S0219498825503633
Publication Date
1-1-2024
Recommended Citation
Das, Nilkantha and Dey, Sutapa, "Some remarks on two-periodic modules over local rings" (2024). Journal Articles. 5093.
https://digitalcommons.isical.ac.in/journal-articles/5093
Comments
Open Access; Green Open Access