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Line 4: ==Avoiding paradoxes== The strict ~~conditional~~conditionals ~~avoids~~may ~~the~~avoid [[paradoxes of material implication]]. The following statement, for example, is not correctly formalized by material implication: : If Bill Gates had graduated in Medicine, then Elvis never died. Line 19: ==Problems== Although the strict conditional is much closer to being able to express natural language conditionals than the material conditional, it has its own problems ~~with antecedents that are necessarily true or false~~.<ref>Roy A. Sorensen, ''A Brief History of the Paradox: Philosophy and the labyrinths of the mind'', Oxford University Press, 2003, ISBN 0195159039, [http://books.google.com/books?id=PB8I0kHeKy4C&pg=PA105 p. 105.]</ref> The following sentence, for example, is not correctly formalized by a strict conditional: : If Bill Gates graduated in Medicine, then 2 + 2 = 4. Line 27: : <math>\Box</math> (Bill Gates graduated in Medicine <math>\rightarrow</math> 2 + 2 = 4) In modal logic, this formula means that, in every possible world where Bill Gates graduated in medicine, it holds that 2 + 2 = 4. Since 2 + 2 is equal to 4 in all possible worlds, this formula is true, although it does not seem that the original sentence should be. Similarly, problems can arise with antecedents that are necessarily true or false.<ref>Roy A. Sorensen, ''A Brief History of the Paradox: Philosophy and the labyrinths of the mind'', Oxford University Press, 2003, ISBN 0195159039, [http://books.google.com/books?id=PB8I0kHeKy4C&pg=PA105 p. 105.]</ref> A similar situation arises with: : If 2 + 2 = 5, then Bill Gates graduated in Medicine. Line 35: Some logicians, such as [[Paul Grice]], have used [[conversational implicature]] to argue that, despite apparent difficulties, the material conditional is just fine as a translation for the natural language 'if...then...'. Others still have turned to [[relevance logic]] to supply a connection between the antecedent and consequent of provable conditionals. ~~The rule of~~ [[Modal logic#Axiomatic systems\|~~necessitation~~Axiomatic systems]] in modal logic allows us to infer the necessity of any theorem which has been proved without requiring hypotheses, i.e. from <math>\vdash A</math>, infer <math>\vdash \Box A</math>.<ref>James W. Garson, ''Modal Logic for Philosophers'', Cambridge University Press, 2006, ISBN 0521682290, [http://books.google.com/books?id=xFNbDZPZERcC&pg=PA30 p. 30.]</ref> If the theorem has the form of a conditional, i.e. <math>\vdash P \rightarrow Q</math>, it follows that <math>\vdash \Box (P \rightarrow Q)</math>. Thus theorems having the form of a conditional are also strict conditionals.▼ ~~==In mathematics==~~ ▲The rule of [[Modal logic#Axiomatic systems\|necessitation]] in modal logic allows us to infer the necessity of any theorem which has been proved without requiring hypotheses, i.e. from <math>\vdash A</math>, infer <math>\vdash \Box A</math>.<ref>James W. Garson, ''Modal Logic for Philosophers'', Cambridge University Press, 2006, ISBN 0521682290, [http://books.google.com/books?id=xFNbDZPZERcC&pg=PA30 p. 30.]</ref> If the theorem has the form of a conditional, i.e. <math>\vdash P \rightarrow Q</math>, it follows that <math>\vdash \Box (P \rightarrow Q)</math>. Thus theorems having the form of a conditional are also strict conditionals. ==See also==

Strict conditional: Difference between revisions