Nominal Algebraic-Coalgebraic Data Types, with Applications to Infinitary Lambda-Calculi
Abstract
Ten years ago, it was shown that nominal techniques can be used to design coalgebraic data types with variable binding, so that alpha-equivalence classes of infinitary terms are directly endowed with a corecursion principle. We introduce "mixed" binding signatures, as well as the corresponding type of mixed inductive-coinductive terms. We extend the aforementioned work to this setting. In particular, this allows for a nominal description of the sets Lambdaabc of abc-infinitary lambda-terms (for a, b, c in 0,1) and of capture-avoiding substitution on alpha-equivalence classes of such terms.
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