In 2006, the New Periodicity Lemma (NPL) was published, showing that the occurrence of two squares starting at a position ii in a string necessarily precludes the occurrence of other squares of specified period in a specified neighbourhood of ii. The proof of this lemma was complex, breaking down into 14 subcases, and requiring that the shorter of the two squares be regular. In this paper we significantly relax the conditions required by the NPL and removing the need for regularity altogether, and we establish a more precise result using a simpler proof based on lemmas that expose new combinatorial structures in a string, in particular a canonical factorization for any two squares that start at the same position
We contribute to combinatorics and algorithmics of words by introducing new types of periodicities i...
AbstractThe study of the combinatorial properties of strings of symbols from a finite alphabet, also...
AbstractThe concept of periodicity has played over the years a central role in the development of co...
AbstractA recent paper Fan et al. (2006) [10] showed that the occurrence of two squares at the same ...
Given a string x = x[1..n], a repetition of period p in x is a substring u r = x[i..i + rp − 1], p ...
Periodicity is a fundamental combinatorial property of strings. We say that p is a period of a strin...
Given a string $\s{x}=\s{x}[1..n]$, a repetition of period p in {\mbox{\boldmath x}} is a substring ...
AbstractWe first give an elementary proof of the periodicity lemma for strings containing one hole (...
One of the most beautiful and useful notions in the Mathematical Theory of Strings is that of a Peri...
AbstractOne of the most beautiful and useful notions in the Mathematical Theory of Strings is that o...
AbstractThree recent papers (Fan et al., 2006; Simpson, 2007; Kopylova and Smyth, 2012) [5,11,8] hav...
Given a string x = x[1..n], a repetition of period p in x is a substring ur = x[i..i+rp−1], p = |u|,...
International audienceThe article is an overview of basic issues related to repetitions in strings, ...
AbstractPartial words, or sequences over a finite alphabet that may have do-not-know symbols or hole...
AbstractThe article is an overview of basic issues related to repetitions in strings, concentrating ...
We contribute to combinatorics and algorithmics of words by introducing new types of periodicities i...
AbstractThe study of the combinatorial properties of strings of symbols from a finite alphabet, also...
AbstractThe concept of periodicity has played over the years a central role in the development of co...
AbstractA recent paper Fan et al. (2006) [10] showed that the occurrence of two squares at the same ...
Given a string x = x[1..n], a repetition of period p in x is a substring u r = x[i..i + rp − 1], p ...
Periodicity is a fundamental combinatorial property of strings. We say that p is a period of a strin...
Given a string $\s{x}=\s{x}[1..n]$, a repetition of period p in {\mbox{\boldmath x}} is a substring ...
AbstractWe first give an elementary proof of the periodicity lemma for strings containing one hole (...
One of the most beautiful and useful notions in the Mathematical Theory of Strings is that of a Peri...
AbstractOne of the most beautiful and useful notions in the Mathematical Theory of Strings is that o...
AbstractThree recent papers (Fan et al., 2006; Simpson, 2007; Kopylova and Smyth, 2012) [5,11,8] hav...
Given a string x = x[1..n], a repetition of period p in x is a substring ur = x[i..i+rp−1], p = |u|,...
International audienceThe article is an overview of basic issues related to repetitions in strings, ...
AbstractPartial words, or sequences over a finite alphabet that may have do-not-know symbols or hole...
AbstractThe article is an overview of basic issues related to repetitions in strings, concentrating ...
We contribute to combinatorics and algorithmics of words by introducing new types of periodicities i...
AbstractThe study of the combinatorial properties of strings of symbols from a finite alphabet, also...
AbstractThe concept of periodicity has played over the years a central role in the development of co...