Add to ORKGIn 1961, Erdős asked whether or not there exist words of arbitrary length over a fixed finite alphabet that avoid patterns of the form XX' where X' is a permutation of X (called abelian squares). This problem has since been solved in the affirmative in a series of papers from 1968 to 1992. Much less is known in the case of abelian k-th powers, i.e., words of the form X1X2⋯Xk where Xi is a permutation of X1 for 2 ≤i ≤k. In this paper, we consider crucial words for abelian k-th powers, i.e., finite words that avoid abelian k-th powers, but which cannot be extended to the right by any letter of their own alphabets without creating an abelian k-th power. More specifically, we consider the problem of determining the minimal length of a crucial w...
In this document, we study the avoidability of different kind of repetitions in words. We firstshow ...
In this document, we study the avoidability of different kind of repetitions in words. We firstshow ...
In this document, we study the avoidability of different kind of repetitions in words. We firstshow ...
In 1961, Erdős asked whether or not there exist words of arbitrary length over a fixed finite alphab...
Let k ≥ 2 be an integer. An abelian k -th power is a word of the form X 1 X 2 ⋯ X k where X i is a p...
Let k ≥ 2 be an integer. An abeliank th power is a word of the form X1 X2 ⋯ Xk where Xi is a permuta...
CombinatoricsIn 1961, Erdos asked whether or not there exist words of arbitrary length over a fixed ...
AbstractLet k≥2 be an integer. An abelian kth power is a word of the form X1X2⋯Xk where Xi is a perm...
AbstractWe consider a recently defined notion of k-abelian equivalence of words in connection with a...
Let k≥2k≥2 be an integer. An abelian kkth power is a word of the form X1X2⋯XkX1X2⋯Xk where XiXi is a...
We study a new notion of cyclic avoidance of abelian powers. A finite word $w$ avoids abelian $N$-po...
AbstractA word is called abelian square-free if it contains no two adjacent subwords which are permu...
A k-abelian cube is a word uvw, where the factors u, v, and w are either pairwise equal, or have ...
AbstractIn 1961, Paul Erdös posed the question whether abelian squares can be avoided in arbitrarily...
A word is abelian square-free if it does not contain two adjacent subwords which are permutations o...
In this document, we study the avoidability of different kind of repetitions in words. We firstshow ...
In this document, we study the avoidability of different kind of repetitions in words. We firstshow ...
In this document, we study the avoidability of different kind of repetitions in words. We firstshow ...
In 1961, Erdős asked whether or not there exist words of arbitrary length over a fixed finite alphab...
Let k ≥ 2 be an integer. An abelian k -th power is a word of the form X 1 X 2 ⋯ X k where X i is a p...
Let k ≥ 2 be an integer. An abeliank th power is a word of the form X1 X2 ⋯ Xk where Xi is a permuta...
CombinatoricsIn 1961, Erdos asked whether or not there exist words of arbitrary length over a fixed ...
AbstractLet k≥2 be an integer. An abelian kth power is a word of the form X1X2⋯Xk where Xi is a perm...
AbstractWe consider a recently defined notion of k-abelian equivalence of words in connection with a...
Let k≥2k≥2 be an integer. An abelian kkth power is a word of the form X1X2⋯XkX1X2⋯Xk where XiXi is a...
We study a new notion of cyclic avoidance of abelian powers. A finite word $w$ avoids abelian $N$-po...
AbstractA word is called abelian square-free if it contains no two adjacent subwords which are permu...
A k-abelian cube is a word uvw, where the factors u, v, and w are either pairwise equal, or have ...
AbstractIn 1961, Paul Erdös posed the question whether abelian squares can be avoided in arbitrarily...
A word is abelian square-free if it does not contain two adjacent subwords which are permutations o...
In this document, we study the avoidability of different kind of repetitions in words. We firstshow ...
In this document, we study the avoidability of different kind of repetitions in words. We firstshow ...
In this document, we study the avoidability of different kind of repetitions in words. We firstshow ...