Sequence saturation

Abstract

In this paper, we introduce saturation and semisaturation functions of sequences, and we prove a number of fundamental results about these functions. Given a forbidden sequence u with r distinct letters, we say that a sequence s on a given alphabet is u-saturated if s is r-sparse, u-free, and adding any letter from the alphabet to an arbitrary position in s violates r-sparsity or induces a copy of u. We say that s is u-semisaturated if s is r-sparse and adding any letter from the alphabet to s violates r-sparsity or induces a new copy of u. Let the saturation function Sat(u, n) denote the minimum possible length of a u-saturated sequence on an alphabet of size n, and let the semisaturation function Ssat(u, n) denote the minimum possible length of a u-semisaturated sequence on an alphabet of size n. For alternating sequences, we determine both the saturation function and the semisaturation function up to a constant multiplicative factor. We show for every sequence that the semisaturation function is always either O(1) or (n). For the saturation function, we show that every sequence u has either Sat(u, n) n or Sat(u, n) = O(1). For every sequence with 2 distinct letters, we show that the saturation function is always either O(1) or (n).

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