Improved Algorithms for Solving Polynomial Systems over GF(2) by Multiple Parity-Counting
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We consider the problem of finding a solution to a multivariate polynomial equation system of degree d in n variables over 𝔽_2. For d=2, the best-known algorithm for the problem is by Bardet et al. [J. Complexity, 2013] and was shown to run in time O(2^0.792n) under assumptions that were experimentally found to hold for random equation systems. The best-known worst-case algorithm for the problem is due to Björklund et al. [ICALP'19]. It runs in time O(2^0.804n) for d = 2 and O(2^(1 - 1/(2.7d))n) for d > 2. In this paper, we devise a worst-case algorithm that improves the one by Björklund et al. It runs in time O(2^0.6943n) for d = 2 and O(2^(1 - 1/(2d))n) for d > 2. Our algorithm thus outperforms all known worst-case algorithms, as well as ones analyzed for random equation systems. We also devise a second algorithm that outputs all solutions to a polynomial system and has similar complexity to the first (provided that the number of solutions is not too large). A central idea in the work of Björklund et al. was to reduce the problem of finding a solution to a polynomial system over 𝔽_2 to the problem of counting the parity of all solutions. A parity-counting instance was then reduced to many smaller parity-counting instances. Our main observation is that these smaller instances are related and can be solved more efficiently by a new algorithm to a problem which we call multiple parity-counting.
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