The Number of Distinct Subpalindromes in Random Words

Abstract

We prove that a random word of length n over a k-ary fixed alphabet contains, on expectation, (n) distinct palindromic factors. We study this number of factors, E(n,k), in detail, showing that the limit n∞E(n,k)/n does not exist for any k2, n∞E(n,k)/n=(1), and n∞E(n,k)/n=(k). Such a complicated behaviour stems from the asymmetry between the palindromes of even and odd length. We show that a similar, but much simpler, result on the expected number of squares in random words holds. We also provide some experimental data on the number of palindromic factors in random words.