In the last few years, the concepts of stability and Clifford regularity have been fruitfully extended by using star operations. In this paper we deepen the study of star stable and star regular domains and relate these two classes of domains to each other
A stability theorem, based on the concept of directional matric regularity of mappings is described....
AbstractOrder stars are a powerful modern tool for the development and analysis of numerical methods...
AbstractWe present a theory of (semi)star operations for torsion-free modules. This extends the anal...
In the last few years, the concepts of stability and Clifford regularity have been fruitfully extend...
We introduce and study the notion of $\star$-stability with respect to a semistar operation $\star$ ...
AbstractWe introduce and study the notion of ⋆-stability with respect to a semistar operation ⋆ defi...
In this work in collaboration with Zurab Janelidze we give a new characterisation of star-regular ca...
We generalize the concept of localization of a star operation to flat overrings; subsequently, we in...
In this paper we study the star operations on a pullback of integral domains. In particular, we cha...
The concept of star-relation has been shown to be suitable to unify and compare many results in poin...
We study star operations on Kunz domains, a class of analytically irreducible, residually rational d...
AbstractIn the second half of a two-part study of stable domains, we explore the extent to which the...
An integral domain R is a GCD-Bezout domain if the Bezout identity holds for any nite set of nonzer...
We study the sets of semistar and star operations on a semilocal Pr\"ufer domain, with an emphasis o...
Stability is an important and fundamental property of $C^{*}$-algebras. Given a short exact sequence...
A stability theorem, based on the concept of directional matric regularity of mappings is described....
AbstractOrder stars are a powerful modern tool for the development and analysis of numerical methods...
AbstractWe present a theory of (semi)star operations for torsion-free modules. This extends the anal...
In the last few years, the concepts of stability and Clifford regularity have been fruitfully extend...
We introduce and study the notion of $\star$-stability with respect to a semistar operation $\star$ ...
AbstractWe introduce and study the notion of ⋆-stability with respect to a semistar operation ⋆ defi...
In this work in collaboration with Zurab Janelidze we give a new characterisation of star-regular ca...
We generalize the concept of localization of a star operation to flat overrings; subsequently, we in...
In this paper we study the star operations on a pullback of integral domains. In particular, we cha...
The concept of star-relation has been shown to be suitable to unify and compare many results in poin...
We study star operations on Kunz domains, a class of analytically irreducible, residually rational d...
AbstractIn the second half of a two-part study of stable domains, we explore the extent to which the...
An integral domain R is a GCD-Bezout domain if the Bezout identity holds for any nite set of nonzer...
We study the sets of semistar and star operations on a semilocal Pr\"ufer domain, with an emphasis o...
Stability is an important and fundamental property of $C^{*}$-algebras. Given a short exact sequence...
A stability theorem, based on the concept of directional matric regularity of mappings is described....
AbstractOrder stars are a powerful modern tool for the development and analysis of numerical methods...
AbstractWe present a theory of (semi)star operations for torsion-free modules. This extends the anal...
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