Add to ORKGWe describe a new way to construct large subdirectly irreducibles within an equational class of algebras. We use this construction to show that there are forbidden geometries of multitraces for finite algebras in residually small equational classes. The construction is first applied to show that minimal equational classes generated by simple algebras of types 2, 3 or 4 are residually small if and only if they are congruence modular. As a second application of the construction we characterize residually small locally finite abelian equational classes.
AbstractSome general results are obtained for any equational class K whose members satisfy the condi...
AbstractA review of the known facts about division algebras of small dimensions over finite fields i...
Some of the so called smallness conditions in algebra as well as in category theory, are important a...
AbstractWe describe a new way to construct large subdirectly irreducibles within an equational class...
AbstractWe describe a new way to construct large subdirectly irreducibles within an equational class...
Abstract. We develop a method of creating skew congruences on subpowers of finite algebras using gro...
AbstractThis paper contains a characterization of finite algebras which generate a variety having a ...
Abstract. We show that a finite algebra must be inherently non-dualisable if the variety that it gen...
Abstract. We prove that if A is a nonabelian strictly simple term minimal al-gebra, then the variety...
AbstractThis paper contains a characterization of finite algebras which generate a variety having a ...
AbstractWe show that a finite algebra must be inherently non-dualisable if the variety that it gener...
AbstractIn this paper we show that, if V is a residually small variety generated by an algebra with ...
Abstract. In these lectures we return to the RS Problem discussed in E. Kiss’s article (this volume)...
In this note we settle a question posed by Hobby and McKenzie in [2] on the nature of locally finite...
In this paper we show that, if V is a residually small variety generated by an algebra with n <! ...
AbstractSome general results are obtained for any equational class K whose members satisfy the condi...
AbstractA review of the known facts about division algebras of small dimensions over finite fields i...
Some of the so called smallness conditions in algebra as well as in category theory, are important a...
AbstractWe describe a new way to construct large subdirectly irreducibles within an equational class...
AbstractWe describe a new way to construct large subdirectly irreducibles within an equational class...
Abstract. We develop a method of creating skew congruences on subpowers of finite algebras using gro...
AbstractThis paper contains a characterization of finite algebras which generate a variety having a ...
Abstract. We show that a finite algebra must be inherently non-dualisable if the variety that it gen...
Abstract. We prove that if A is a nonabelian strictly simple term minimal al-gebra, then the variety...
AbstractThis paper contains a characterization of finite algebras which generate a variety having a ...
AbstractWe show that a finite algebra must be inherently non-dualisable if the variety that it gener...
AbstractIn this paper we show that, if V is a residually small variety generated by an algebra with ...
Abstract. In these lectures we return to the RS Problem discussed in E. Kiss’s article (this volume)...
In this note we settle a question posed by Hobby and McKenzie in [2] on the nature of locally finite...
In this paper we show that, if V is a residually small variety generated by an algebra with n <! ...
AbstractSome general results are obtained for any equational class K whose members satisfy the condi...
AbstractA review of the known facts about division algebras of small dimensions over finite fields i...
Some of the so called smallness conditions in algebra as well as in category theory, are important a...