Add to ORKGWe associate to each variety of algebras of finite signature a function on the positive integers called the equational complexity of the variety. This function is a measure of how much of the equational theory of a variety must be tested to determine whether a finite algebra belongs to the variety. We provide general methods for giving upper and lower bounds on the growth of equational complexity functions and provide examples using algebras created from graphs and from finite automata. We also show that finite algebras which are inherently nonfinitely based via the shift automorphism method cannot be used to settle an old problem of Eilenberg and Schützenberger
We investigate the complexity of the equation solvability problem over a finite ring when the input ...
AbstractDoes every finite algebraic system A with finitely many operations possess a finite list of ...
At its core, much of Computational Complexity is concerned with combinatorial objects and structures...
We associate to each variety of algebras of finite signature a function on the positive integers cal...
An algebra $\cal A$ is finitely presented if there is a finite set G of generator symbols, a finite...
We study the algorithmic complexity of determining whether a system of polynomial equations over a f...
An algebra is a set of elements equipped with some finitary operations represented by a selected set...
. We study algebras whose elements are relations, and the operations are natural "manipulations...
In this paper we consider the complexity of several problems involving finite algebraic structures. ...
This paper extends prior work on the connections between logics from finite model theory and proposi...
At its core, much of Computational Complexity is concerned with combinatorial objects and structures...
This paper shows that the collection of identities which hold in the algebra N of the natural number...
In the thesis we investigate the connections between arbitrary functions and their realizing polynom...
AbstractWe study algebras whose elements are relations, and the operations are natural “manipulation...
We study the problem of learning an unknown function represented as an expression or a program over ...
We investigate the complexity of the equation solvability problem over a finite ring when the input ...
AbstractDoes every finite algebraic system A with finitely many operations possess a finite list of ...
At its core, much of Computational Complexity is concerned with combinatorial objects and structures...
We associate to each variety of algebras of finite signature a function on the positive integers cal...
An algebra $\cal A$ is finitely presented if there is a finite set G of generator symbols, a finite...
We study the algorithmic complexity of determining whether a system of polynomial equations over a f...
An algebra is a set of elements equipped with some finitary operations represented by a selected set...
. We study algebras whose elements are relations, and the operations are natural "manipulations...
In this paper we consider the complexity of several problems involving finite algebraic structures. ...
This paper extends prior work on the connections between logics from finite model theory and proposi...
At its core, much of Computational Complexity is concerned with combinatorial objects and structures...
This paper shows that the collection of identities which hold in the algebra N of the natural number...
In the thesis we investigate the connections between arbitrary functions and their realizing polynom...
AbstractWe study algebras whose elements are relations, and the operations are natural “manipulation...
We study the problem of learning an unknown function represented as an expression or a program over ...
We investigate the complexity of the equation solvability problem over a finite ring when the input ...
AbstractDoes every finite algebraic system A with finitely many operations possess a finite list of ...
At its core, much of Computational Complexity is concerned with combinatorial objects and structures...