We investigate lower bounds on the size of clusters (sets of starting positions of occurrences) of common prefixes shared by repetition roots. Such lower bounds in terms of the constituent roots in the sets provide upper bounds on the number of distinct repetitions. In the case of distinct square roots which are totally ordered by the prefix relation it has been shown that there must be more occurrences of the common prefix than the number of roots. Here we develop the theory further by presenting the tools to extend the bounds to exponents higher than 2 and we show that they are optimal in the sense that any sequence of cluster sizes satisfying the lower bounds can be realized. We also take the next step towards the bounds on arbitrary (on...
This work takes another look at the number of runs that a string may contain and provides an alterna...
Let an (r,s)-formation be a concatenation of s permutations of r distinct letters, and let a block o...
AbstractClustering problems with relational constraints in which the underlying graph is a tree aris...
This work proposes a new approach towards solving an over 20 years old conjecture regarding the maxi...
Six kinds of both of primitivity and periodicity of words, introduced by Ito and Lischke [...
The repetition threshold introduced by Dejean and Brandenburg is the smallest real number α such tha...
We present some asymptotic properties on the average number of prefixes in trace languages. Such lan...
International audienceThe repetition threshold is the smallest real number $\alpha$ such that there ...
We prove a generalization of the author's work to show that any subset of the primes which is 'well ...
AbstractWe consider the problem of chaining seeds in ordered trees. Seeds are mappings between two t...
Abstract. For a given word w, all the square-free words that can be reached by suc-cessive applicati...
In this paper we study the problem of finding maximally sized subsets of binary strings (codes) of ...
We shall present a new lower bound for the number of roots of maps between graphs in any given homot...
The repetition threshold introduced by Dejean and Brandenburg is the smallest real number α such tha...
International audienceČerný’s conjecture asserts the existence of a synchronizing word of length at ...
This work takes another look at the number of runs that a string may contain and provides an alterna...
Let an (r,s)-formation be a concatenation of s permutations of r distinct letters, and let a block o...
AbstractClustering problems with relational constraints in which the underlying graph is a tree aris...
This work proposes a new approach towards solving an over 20 years old conjecture regarding the maxi...
Six kinds of both of primitivity and periodicity of words, introduced by Ito and Lischke [...
The repetition threshold introduced by Dejean and Brandenburg is the smallest real number α such tha...
We present some asymptotic properties on the average number of prefixes in trace languages. Such lan...
International audienceThe repetition threshold is the smallest real number $\alpha$ such that there ...
We prove a generalization of the author's work to show that any subset of the primes which is 'well ...
AbstractWe consider the problem of chaining seeds in ordered trees. Seeds are mappings between two t...
Abstract. For a given word w, all the square-free words that can be reached by suc-cessive applicati...
In this paper we study the problem of finding maximally sized subsets of binary strings (codes) of ...
We shall present a new lower bound for the number of roots of maps between graphs in any given homot...
The repetition threshold introduced by Dejean and Brandenburg is the smallest real number α such tha...
International audienceČerný’s conjecture asserts the existence of a synchronizing word of length at ...
This work takes another look at the number of runs that a string may contain and provides an alterna...
Let an (r,s)-formation be a concatenation of s permutations of r distinct letters, and let a block o...
AbstractClustering problems with relational constraints in which the underlying graph is a tree aris...