On Piecewise Affine Reachability with Bellman Operators
Abstract
We study the following reachability problem for piecewise affine maps: Given two vectors s, t ∈ Qd and a piecewise affine map f Qd→ Qd, does there exist n∈ N such that fn(s) = t? In this work, we focus on this reachability problem for a subclass of piecewise affine maps -- Bellman operators arising from Markov decision processes. We prove that the reachability problem for - and -Bellman operators is decidable in any dimension under either of the following conditions: (i) the target vector t is not the fixed point of the operator f; or (ii) the initial and target vectors s and t are comparable with respect to the componentwise order. Furthermore, we show that in the two-dimensional case, the reachability problem for Bellman operators is decidable for arbitrary s, t ∈ Q2. This stands in sharp contrast to the known undecidability of reachability for general piecewise affine maps in dimension d = 2.
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