Solvability of Matrix-Exponential Equations

2016 31st Annual ACM/IEEE Symposium on Logic in Computer Science (LICS) Pub Date : 2016-01-19 DOI:10.1145/2933575.2934538

J. Ouaknine, Amaury Pouly, João Sousa Pinto, J. Worrell

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引用次数: 4

Abstract

We consider a continuous analogue of (Babai et al. 1996)’s and (Cai et al. 2000)’s problem of solving multiplicative matrix equations. Given k + 1 square matrices A1,…, Ak, C, all of the same dimension, whose entries are real algebraic, we examine the problem of deciding whether there exist non-negative reals t1, …, tk such that\begin{equation*} \prod\limits_{i = 1}^k {\exp ({A_i}{t_i})} = C. \end{equation*}We show that this problem is undecidable in general, but decidable under the assumption that the matrices A1, …, Ak commute. Our results have applications to reachability problems for linear hybrid automata.Our decidability proof relies on a number of theorems from algebraic and transcendental number theory, most notably those of Baker, Kronecker, Lindemann, and Masser, as well as some useful geometric and linear-algebraic results, including the Minkowski-Weyl theorem and a new (to the best of our knowledge) result about the uniqueness of strictly upper triangular matrix logarithms of upper unitriangular matrices. On the other hand, our undecidability result is shown by reduction from Hilbert’s Tenth Problem.

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矩阵-指数方程的可解性

我们考虑(Babai et al. 1996)和(Cai et al. 2000)求解乘法矩阵方程问题的连续模拟。给定k + 1个相同维数的方阵A1，…，Ak, C，它们的元素都是实数代数，我们研究了判定是否存在非负实数t1，…，tk使得\begin{equation*} \prod\limits_{i = 1}^k {\exp ({A_i}{t_i})} = C. \end{equation*}的问题。我们证明了这个问题一般是不可判定的，但是在矩阵A1，…，Ak交换的假设下是可判定的。本文的研究结果对线性混合自动机的可达性问题具有一定的应用价值。我们的可决性证明依赖于代数和超越数论中的一些定理，最著名的是Baker, Kronecker, Lindemann和Masser的定理，以及一些有用的几何和线性代数结果，包括Minkowski-Weyl定理和一个关于上单角矩阵的严格上三角矩阵对数的唯一性的新结果(据我们所知)。另一方面，我们的不可判定结果由希尔伯特第十问题的约简得到。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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2016 31st Annual ACM/IEEE Symposium on Logic in Computer Science (LICS)

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