Connexive logics and connexive semi-Heyting algebras
Abstract
In this paper, we define and investigate a connexive logic, called 'Connexive semi-Heyting logic' (CSH for short) and a new subvariety CSH of the variety SH of semi-Heyting algebras. It is shown that the logic CSH is implicative in the sense of Rasiowa, and is algebraizable with CSH as an equivalent algebraic semantics (in the sense of Blok and Pigozzi). We also introduce the logics ATi and BTi, i = 1, 2, along with the subvarieties ATi and BTi, i = 1, 2, of SH. It is then shown that AT1 = AT2 and CSH = BT1 ⊂ BT2 ⊂ AT1. A 3-valued connexive semi-Heyting logic CSH3 and its equivalent algebraic semantics CSH3 are introduced and axiomatized; and it is then shown that CSH3 is deductively equivalent to the 3-valued intuitionistic logic. New characterizations of anti-Boolean semi-Heyting algebras are given. We show that BT2 SHc = V(2), and SHc ⊂ AT1, where SHc is defined by x y = y x. It is proved that the identity (AT1) is equivalent to the identity x* y* = y* x* (* being the pseudocomplement) in StSH and also is equivalent to 0 1 = 0 in SH. We show that AT1 EX ⊂ BT1, where EX is defined by x (y z) = y (x z). The paper concludes with some further remarks, mentions some open problems for future research and proposes two new principles to be considered as Connexive Theses.
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