On the almost-palindromic width of free groups
Abstract
We answer a question of Bardakov (Kourovka Notebook, Problem 19.8) which asks for the existence of a pair of natural numbers (c, m) with the property that every element in the free group on the two-element set \a, b\ can be represented as a concatenation of c, or fewer, m-almost-palindromes in letters a 1, b 1. Here, an m-almost-palindrome is a word which can be obtained from a palindrome by changing at most m letters. We show that no such pair (c, m) exists. In fact, we show that the analogous result holds for all non-abelian free groups.
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