We investigate Cohen factorizations of local ring homomorphisms from three perspectives. First, we prove a “weak functoriality” result for Cohen factorizations: certain morphisms of local ring homomorphisms induce morphisms of Cohen factorizations. Second, we use Cohen factorizations to study the properties of local ring homomorphisms (Gorenstein, Cohen–Macaulay, etc.) in certain commutative diagrams. Third, we use Cohen factorizations to investigate the structure of quasi-deformations of local rings, with an eye on the question of the behavior of CI-dimension in short exact sequences
International audienceWe prove the weak functoriality of (big) Cohen-Macaulay algebras, which contro...
Let $\mathfrak{g}$ be a simple Lie algebra over $\mathbb{C}$. The KZ connection is a connection on t...
AbstractWe investigate properties of certain invariants of Noetherian local rings, including their b...
AbstractNumerical invariants which measure the Cohen–Macaulay character of homomorphismsϕ:R→Sof noet...
International audienceWe prove the weak functoriality of (big) Cohen-Macaulay algebras, which contro...
[EN] The Cohen structure theorem describes the structure of complete Noetherian local rings. The goa...
AbstractFor a large class of local homomorphisms ϕ: R→S, including those of finite G-dimension studi...
. Numerical invariants which measure the Cohen--Macaulay character of homomorphisms ' : R ! S ...
AbstractA new homological dimension, called GCM-dimension, will be defined for any finitely generate...
AbstractLet (R,m) be a Noetherian local ring which is a homomorphic image of a local Gorenstein ring...
This dissertation contains three aspects of my research that are listed as three joint papers with m...
AbstractWe construct examples of non-Cohen–Macaulay unique factorization domains in small dimension....
summary:We study the G-dimension over local ring homomorphisms with respect to a semi-dualizing comp...
summary:We study the G-dimension over local ring homomorphisms with respect to a semi-dualizing comp...
International audienceWe prove the weak functoriality of (big) Cohen-Macaulay algebras, which contro...
International audienceWe prove the weak functoriality of (big) Cohen-Macaulay algebras, which contro...
Let $\mathfrak{g}$ be a simple Lie algebra over $\mathbb{C}$. The KZ connection is a connection on t...
AbstractWe investigate properties of certain invariants of Noetherian local rings, including their b...
AbstractNumerical invariants which measure the Cohen–Macaulay character of homomorphismsϕ:R→Sof noet...
International audienceWe prove the weak functoriality of (big) Cohen-Macaulay algebras, which contro...
[EN] The Cohen structure theorem describes the structure of complete Noetherian local rings. The goa...
AbstractFor a large class of local homomorphisms ϕ: R→S, including those of finite G-dimension studi...
. Numerical invariants which measure the Cohen--Macaulay character of homomorphisms ' : R ! S ...
AbstractA new homological dimension, called GCM-dimension, will be defined for any finitely generate...
AbstractLet (R,m) be a Noetherian local ring which is a homomorphic image of a local Gorenstein ring...
This dissertation contains three aspects of my research that are listed as three joint papers with m...
AbstractWe construct examples of non-Cohen–Macaulay unique factorization domains in small dimension....
summary:We study the G-dimension over local ring homomorphisms with respect to a semi-dualizing comp...
summary:We study the G-dimension over local ring homomorphisms with respect to a semi-dualizing comp...
International audienceWe prove the weak functoriality of (big) Cohen-Macaulay algebras, which contro...
International audienceWe prove the weak functoriality of (big) Cohen-Macaulay algebras, which contro...
Let $\mathfrak{g}$ be a simple Lie algebra over $\mathbb{C}$. The KZ connection is a connection on t...
AbstractWe investigate properties of certain invariants of Noetherian local rings, including their b...
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