Faster Exponential Algorithm for Permutation Pattern Matching
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The Permutation Pattern Matching problem asks, given two permutations σ on n elements and π, whether σ admits a subsequence with the same relative order as π (or, in the counting version, how many such subsequences are there). This natural problem was shown by Bose, Buss and Lubiw [IPL 1998] to be NP-complete, and hence we should seek exact exponential time solutions. The asymptotically fastest such solution up to date, by Berendsohn, Kozma and Marx [IPEC 2019], works in 𝒪(1.6181^n) time. We design a simple and faster 𝒪(1.415^n) time algorithm for both the detection and the counting version. We also prove that this is optimal among a certain natural class of algorithms.
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