Adaptive Multi-Head Finite-State Gamblers

Abstract

Multi-head finite-state dimensions and predimensions quantify the predictability of a sequence by a gambler with trailing heads acting as "probes to the past." These additional heads allow the gambler to exploit patterns that are simple but non-local, such as in a sequence S with S[n]=S[2n] for all n. In the original definitions of Huang, Li, Lutz, and Lutz (2025), the head movements were required to be oblivious (i.e., data-independent). Here, we introduce a model in which head movements are adaptive (i.e., data-dependent) and compare it to the oblivious model. We establish that for each h≥ 2, adaptivity enhances the predictive power of h-head finite-state gamblers, in the sense that there are sequences whose oblivious h-head finite-state predimensions strictly exceed their adaptive h-head finite-state predimensions. We further prove that adaptive finite-state predimensions admit a strict hierarchy as the number of heads increases, and in fact that for all h≥ 1 there is a sequence whose adaptive (h+1)-head finite-state predimension is strictly less than its adaptive h-head predimension.