Kernelization lower bound for Permutation Pattern Matching
Abstract
A permutation π contains a permutation σ as a pattern if it contains a subsequence of length |σ| whose elements are in the same relative order as in the permutation σ. This notion plays a major role in enumerative combinatorics. We prove that the problem does not have a polynomial kernel (under the widely believed complexity assumption NP ⊂eq co-NP/poly) by introducing a new polynomial reduction from the clique problem to permutation pattern matching.
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