Mod/Resc Parsimony Inference: Theory and application

Abstract : We address in this paper a new computational biology problem that aims at understanding a mechanism that could potentially be used to genetically manipulate natural insect populations infected by inherited, intra-cellular parasitic bacteria. In this problem, that we denote by Mod/Resc Parsimony Inference, we are given a boolean matrix and the goal is to find two other boolean matrices with a minimum number of columns such that an appropriately defined operation on these matrices gives back the input. We show that this is formally equivalent to the Biclique Edge Cover for Bipartite Graphs problem and derive some complexity results for our problem using this equivalence. We provide a new, fixedparameter tractability approach for solving both problems that slightly improves upon a previously published algorithm for the Biclique Edge Cover for Bipartite Graphs. Finally, we present experimental results applying some of our techniques to a real-life dataset.
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https://hal.inria.fr/hal-00763405
Contributor : Marie-France Sagot <>
Submitted on : Monday, December 10, 2012 - 5:00:38 PM
Last modification on : Friday, November 22, 2019 - 12:18:08 PM

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Igor Nor, Danny Hermelin, Sylvain Charlat, Jan Engelstadter, Max Reuter, et al.. Mod/Resc Parsimony Inference: Theory and application. Information and Computation, Elsevier, 2012, 213, pp.23-32. ⟨10.1016/j.ic.2011.03.008⟩. ⟨hal-00763405⟩

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