Path: utzoo!utgpu!watmath!maytag!water!wlrush From: wlrush@water.waterloo.edu (Wenchantress Wench Wendall) Newsgroups: ont.events,uw.talks,uw.cs.grad Subject: THEORY SEMINAR Keywords: Dr. Robert Cori, University of Bordeaux, will speak on "Partially abelian square free words." Message-ID: <2329@water.waterloo.edu> Date: 19 May 89 13:59:38 GMT Distribution: ont Organization: U of Waterloo, Ontario Lines: 43 DEPARTMENT OF COMPUTER SCIENCE UNIVERSITY OF WATERLOO SEMINAR ACTIVITIES THEORY SEMINAR -May 26, 1989 Dr. Robert Cori, University of Bordeaux, will speak on "Partially abelian square free words." TIME: 11:30 a.m. ROOM: DC 1304 ABSTRACT The notions of square-freeness and abelian square-freeness of words are well known examples of avoidable properties of words on sufficiently large alphabets. It is known since the beginning of the century that square-free words exist on alphabets of cardinality greater than 3, and answering to a question of Erdos, Pleasants has shown in 1968 the existence of abelian square free words of arbitrary length in a five letter alphabet. The existence of such words on a 4 letter alphabet is still an open question. The recent interest of theoretical computer scientists for partially commutative free monoids suggests the introduction of the notion of partially abelian squares which generalizes these two notions. One of the main results obtained concerns the existence concerns the existence of arbitrary long partially abelian square free words on a 4 letter alphabet, when 4 among the 6 possible commutations hold. Other results, mainly on enumeration, are given in a three letter alphabet. In such an alphabet the number of square free words of length n is known to be greater than an exponential of n , it turns out that the number of partially abelian square free words (when only one commutation holds) is bounded by a polynomia in n of degree 2.