We present efficient computational solutions to the problems of checking equality, performing multiplication, and computing minimal representatives of elements of free bands. A band is any semigroup satisfying the identity $x ^ 2 \approx x$ and the free band $\operatorname{FB}(k)$ is the free object in the variety of $k$-generated bands. Radoszewski and Rytter developed a linear time algorithm for checking whether two words represent the same element of a free band. In this paper we describe an alternate linear time algorithm for checking the same problem. The algorithm we present utilises a representation of words as synchronous deterministic transducers that lend themselves to efficient (quadratic in the size of the alphabet) multiplicati...
Funding: UK Engineering and Physical Sciences Research Council award EP/K033956/1Memoryless computat...
AbstractIt is shown that a “natural” reduction of words leads to canonical forms representing elemen...
Let pk,N be the number of primitive words of length N in the free group Fk, k ≥ 3. We show that the ...
We present efficient computational solutions to the problems of checking equality, performing multip...
We give a simple algorithm to solve the subgroup membership problem for virtually free groups. For a...
AbstractA linear-time algorithm is given for the word problem for free partially commutative groups....
AbstractA free semigroup with involution (FSI) is essentially the set of words over a given alphabet...
We find a lower bound to the size of finite groups detecting a given word in the free group, more pr...
AbstractA semigroup S is called a regular band if the laws xx = x and xyxzx = xyzx hold in S. For al...
AbstractThe following problem looking as a high-school exercise hides an unexpected difficulty. Do t...
The implicit operation # is the unary operation which sends each element of a finite semigroup to t...
AbstractWe study the relation between time complexity and derivation work for the word problem of in...
AbstractThe complexity of some classical algorithmic problems in free groups is studied. Problems li...
Abstract. We examine the relationship between the complexity of the word problem for a presentation ...
summary:We present an algorithm for constructing the free algebra over a given finite partial algebr...
Funding: UK Engineering and Physical Sciences Research Council award EP/K033956/1Memoryless computat...
AbstractIt is shown that a “natural” reduction of words leads to canonical forms representing elemen...
Let pk,N be the number of primitive words of length N in the free group Fk, k ≥ 3. We show that the ...
We present efficient computational solutions to the problems of checking equality, performing multip...
We give a simple algorithm to solve the subgroup membership problem for virtually free groups. For a...
AbstractA linear-time algorithm is given for the word problem for free partially commutative groups....
AbstractA free semigroup with involution (FSI) is essentially the set of words over a given alphabet...
We find a lower bound to the size of finite groups detecting a given word in the free group, more pr...
AbstractA semigroup S is called a regular band if the laws xx = x and xyxzx = xyzx hold in S. For al...
AbstractThe following problem looking as a high-school exercise hides an unexpected difficulty. Do t...
The implicit operation # is the unary operation which sends each element of a finite semigroup to t...
AbstractWe study the relation between time complexity and derivation work for the word problem of in...
AbstractThe complexity of some classical algorithmic problems in free groups is studied. Problems li...
Abstract. We examine the relationship between the complexity of the word problem for a presentation ...
summary:We present an algorithm for constructing the free algebra over a given finite partial algebr...
Funding: UK Engineering and Physical Sciences Research Council award EP/K033956/1Memoryless computat...
AbstractIt is shown that a “natural” reduction of words leads to canonical forms representing elemen...
Let pk,N be the number of primitive words of length N in the free group Fk, k ≥ 3. We show that the ...