Courcelle's Theorem Without Logic
Abstract
Courcelle's Theorem states that on graphs G of tree-width at most k with a given tree-decomposition of size t(G), graph properties P definable in Monadic Second Order Logic can be checked in linear time in the size of t(G). Inspired by L. Lov\'asz' work using connection matrices instead of logic, we give a generalized version of Courcelle's theorem which replaces the definability hypothesis by a purely combinatorial hypothesis using a generalization of connection matrices.
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