On the Complexity of Modal Team Logic and Two-Variable Team Logic
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We study modal team logic MTL and the dependence-free fragment FO^2[ ] of two-variable team logic, which extend modal logic ML and two-variable logic FO^2 with team semantics by a Boolean negation . We settle the open question of the complexity of their respective satisfiability problems, and prove that both are complete for a non-elementary complexity class. We also prove that the model checking problem is PSPACE-complete for several fragments of MTL and FO[ ]. Based on the well-known standard translation from ML to FO^2, we propose an team-semantical translation from MTL into FO^2[ ].
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