Some remarks on categories of modules modulo morphisms with essential kernel or superfluous image
A Alahmadi, A Facchini - Journal of the Korean Mathematical …, 2013 - koreascience.kr
For an ideal $\mathcal {I} $ of a preadditive category $\mathcal {A} $, we study when the
canonical functor $\mathcal {C}:\mathcal {A}{\rightarrow}\mathcal {A}/\mathcal {I} $ is local …
canonical functor $\mathcal {C}:\mathcal {A}{\rightarrow}\mathcal {A}/\mathcal {I} $ is local …
[引用][C] Some remarks on categories of modules modulo morphisms with essential kernel or superfluous image
A Alahmadi, A Facchini - JOURNAL OF THE KOREAN …, 2013 - research.unipd.it
Some remarks on categories of modules modulo morphisms with essential kernel or superfluous
image IRIS IRIS Home Sfoglia Macrotipologie & tipologie Autore Titolo Riviste Serie IT Italiano …
image IRIS IRIS Home Sfoglia Macrotipologie & tipologie Autore Titolo Riviste Serie IT Italiano …
Some remarks on categories of modules modulo morphisms with essential kernel or superfluous image
A Alahmadi, A Facchini - 대한수학회지, 2013 - kiss.kstudy.com
For an ideal L of a preadditive category A, we study whenthe canonical functor C: A→ A/L is
local. We prove that there existsa largest full subcategory C of A for which the canonical …
local. We prove that there existsa largest full subcategory C of A for which the canonical …
[PDF][PDF] SOME REMARKS ON CATEGORIES OF MODULES MODULO MORPHISMS WITH ESSENTIAL KERNEL OR SUPERFLUOUS IMAGE
A Alahmadi, A Facchini - J. Korean Math. Soc, 2013 - academia.edu
For an ideal I of a preadditive category A, we study when the canonical functor C: A→ A/I is
local. We prove that there exists a largest full subcategory C of A for which the canonical …
local. We prove that there exists a largest full subcategory C of A for which the canonical …
[PDF][PDF] SOME REMARKS ON CATEGORIES OF MODULES MODULO MORPHISMS WITH ESSENTIAL KERNEL OR SUPERFLUOUS IMAGE
A Alahmadi, A Facchini - J. Korean Math. Soc, 2013 - Citeseer
For an ideal I of a preadditive category A, we study when the canonical functor C: A→ A/I is
local. We prove that there exists a largest full subcategory C of A for which the canonical …
local. We prove that there exists a largest full subcategory C of A for which the canonical …
Some remarks on categories of modules modulo morphisms with essential kernel or superfluous image
A Alahmadi, A Facchini - Journal of the Korean Mathematical Society, 2013 - jkms.kms.or.kr
For an ideal $\Cal I $ of a preadditive category $\Cal A $, we study when the canonical
functor $ C\colon\Cal A\to\Cal A/\Cal I $ is local. We prove that there exists a largest full …
functor $ C\colon\Cal A\to\Cal A/\Cal I $ is local. We prove that there exists a largest full …
[PDF][PDF] SOME REMARKS ON CATEGORIES OF MODULES MODULO MORPHISMS WITH ESSENTIAL KERNEL OR SUPERFLUOUS IMAGE
A Alahmadi, A Facchini - J. Korean Math. Soc, 2013 - researchgate.net
For an ideal I of a preadditive category A, we study when the canonical functor C: A→ A/I is
local. We prove that there exists a largest full subcategory C of A for which the canonical …
local. We prove that there exists a largest full subcategory C of A for which the canonical …
Some remarks on categories of modules modulo morphisms with essential kernel or superfluous image
A Alahmadi, A Facchini - Bulletin of the Korean Mathematical …, 2013 - ksascholar.dri.sa
For an ideal I of a preadditive category A, we study when the canonical functor C: A→ A/I is
local. We prove that there exists a largest full subcategory C of A for which the canonical …
local. We prove that there exists a largest full subcategory C of A for which the canonical …
Some remarks on categories of modules modulo morphisms with essential kernel or superfluous image
A Alahmadi, A Facchini - 대한수학회지, 2013 - dbpia.co.kr
For an ideal L of a preadditive category A, we study whenthe canonical functor C: A→ A/L is
local. We prove that there existsa largest full subcategory C of A for which the canonical …
local. We prove that there existsa largest full subcategory C of A for which the canonical …
Some remarks on categories of modules modulo morphisms with essential kernel or superfluous image
A Alahmadi, A Facchini - Journal of the Korean Mathematical Society, 2013 - jkms.kms.or.kr
For an ideal $\Cal I $ of a preadditive category $\Cal A $, we study when the canonical
functor $ C\colon\Cal A\to\Cal A/\Cal I $ is local. We prove that there exists a largest full …
functor $ C\colon\Cal A\to\Cal A/\Cal I $ is local. We prove that there exists a largest full …