Filter-induced entailment relations in paraconsistent G\"odel logics
Abstract
We consider two expansions of G\"odel logic G with two versions of paraconsistent negation. The first one is Ginv -- the expansion of G with an involuitive negation i defined via v(iφ)=1-v(φ). The second one is G2(→,-\!<) -- an expansion with a so-called strong negation . This logic utilises two independent valuations on [0,1] -- v1 (support of truth or positive support) and v2 (support of falsity or negative support) that are connected with . Two valuations in G2(→,-\!<) can be combined into one valuation v on [0,1] -- the twisted product of [0,1] with itself -- with two components v1 and v2. The two logics are closely connected as i and allow for similar definitions of co-implication -- φ-\!<:=i(i→iφ) and φ-\!<:=(→φ) -- but do not coincide since the set of values of G2(→,-\!<) is not ordered linearly. Our main goal is to study different entailment relations in Ginv and G2(→,-\!<) that are induced by filters on [0,1] and [0,1], respectively. In particular, we determine the exact number of such relations in both cases, establish whether any of them coincide with the entailment defined via the order on [0,1] and [0,1], and obtain their hierarchy. We also construct reductions of filter-induced entailment relations to the ones defined via the order.
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