The Polytope-Collision Problem

TL;DR

This paper investigates the polytope-collision problem, determining whether a linear transformation of an initial polytope intersects a target polytope, and proves decidability in PSPACE for three-dimensional cases using real algebraic geometry and transcendental number theory.

Contribution

It introduces a new formulation of the polytope-collision problem as a satisfiability problem in the theory of real-closed fields and proves its decidability in PSPACE for dimension three.

Findings

Decidability of the problem in PSPACE for dimension at most three.

Formulation of the problem as satisfiability of exponential sum positivity.

Application of transcendental number theory techniques to solve instances.

Abstract

The Orbit Problem consists of determining, given a matrix $A\in \mathbb{R}^{d\times d}$ and vectors $x,y\in \mathbb{R}^d$, whether there exists $n\in \mathbb{N}$ such that $A^n=y$. This problem was shown to be decidable in a seminal work of Kannan and Lipton in the 1980s. Subsequently, Kannan and Lipton noted that the Orbit Problem becomes considerably harder when the target $y$ is replaced with a subspace of $\mathbb{R}^d$. Recently, it was shown that the problem is decidable for vector-space targets of dimension at most three, followed by another development showing that the problem is in PSPACE for polytope targets of dimension at most three. In this work, we take a dual look at the problem, and consider the case where the initial vector $x$ is replaced with a polytope $P_1$, and the target is a polytope $P_2$. Then, the question is whether there exists $n\in \mathbb{N}$ such that $A^n P_1\cap P_2\neq \emptyset$. We show that the problem can be decided in PSPACE for dimension at most three. As in previous works, decidability in the case of higher dimensions is left open, as the problem is known to be hard for long-standing number-theoretic open problems. Our proof begins by formulating the problem as the satisfiability of a parametrized family of sentences in the existential first-order theory of real-closed fields. Then, after removing quantifiers, we are left with instances of simultaneous positivity of sums of exponentials. Using techniques from transcendental number theory, and separation bounds on algebraic numbers, we are able to solve such instances in PSPACE.