Immune Logics ain't that Immune
DOI:
https://doi.org/10.12775/LLP.2022.029Słowa kluczowe
defining logical operations, immune logics, infectious logics, material conditionalsAbstrakt
Da Ré and Szmuc argue that while there is a symmetry between ‘infectious’ and ‘immune’ logics, this symmetry fails w.r.t. extending an algebra with an immune or an infectious element. In this paper, I show that the symmetry also fails w.r.t. defining a new logical operation from a given set of primitive (Boolean) operations. I use the case of the material conditional to illustrate this point.
Bibliografia
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Da Ré, B., and D. Szmuc, 2021, “Immune logics”, The Australasian Journal of Logic, 18 (1): 29–52. DOI: http://dx.doi.org/10.26686/ajl.v18i1.6582
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Prawa autorskie (c) 2022 Jeremiah Joven Joaquin
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