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Inspired by a recent article by Anthony Zaleski and Doron Zeilberger, we investigate the question of determining the largest k for which there exists boolean formulas in disjunctive normal form (DNF) with n variables, none of whose conjunctions are `parallel', and such that all of them have at least k literals. Using a SAT solver, we answer some of the questions they left open. We also determine the corresponding numbers for DNFs obeying certain symmetries.
[1] Jingchao Chen,et al. A New SAT Encoding of the At-Most-One Constraint , 2010 .
[2] Alan M. Frisch,et al. SAT Encodings of the At-Most-k Constraint Some Old , Some New , Some Fast , Some Slow , 2010 .
[3] Karem A. Sakallah,et al. Symmetry and Satisfiability , 2021, Handbook of Satisfiability.
[4] ON INTEGERS OF THE FORM 2 k + p AND SOME RELATED PROBLEMS , 2022 .