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by burakemir
338 days ago
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The paper "Linearity and Uniqueness: an entente cordiale" by Marshall,Vollmer,Orchard offers a good discussion and explanation of the "opposite convention" you describe. There is a dual nature of linearity and uniqueness, and it only arises when there are expressions that are not linear/not unique. At the same time, they have a lot in common, so we do not have a situation that warrants separate names. It is even possible to combine both in the same type system, as the authors demonstrate. Taken from the paper: "Linearity and uniqueness behave dually with respect to composition,
but identically with respect to structural rules, i.e., their internal plumbing." |
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