Clustering, order conditions, and languages of interval exchanges

Abstract

We investigate various connections between the clustering for the Burrows-Wheeler transform, a lossless algorithm used in data compression, and languages of interval exchange transformations. We show that a primitive word u clusters for a pair of orders (<D,<A) if and only if u is a return word in the natural coding of a generalised interval exchange transformation with departure and arrival orders (<D,<A). This answers a question of M. Lapointe on the perfect clustering of return words for a symmetric standard interval exchange transformation. We show that if T is symmetric, then all natural codings are palindromically rich languages, and the orders of the induced transformation on a cylinder [w] equal the original departure/arrival orders (<D,<A) if and only if the shortest bispecial word containing w is a palindrome. We also investigate language related features distinguishing between standard and generalised interval exchange transformations.