FLOC 2018: FEDERATED LOGIC CONFERENCE 2018
On the Taylor expansion of λ-terms and the groupoid structure of their rigid approximants

Authors: Lionel Vaux Auclair and Federico Olimpieri

Paper Information

Title:On the Taylor expansion of λ-terms and the groupoid structure of their rigid approximants
Authors:Lionel Vaux Auclair and Federico Olimpieri
Proceedings:Linearity/TLLA Pre-proceedings
Editors: Maribel Fernandez, Valeria de Paiva, Thomas Ehrhard and Lorenzo Tortora De Falco
Keywords:lambda-calculus, linear logic, Taylor expansion
Abstract:

ABSTRACT. We show that the normal form of the Taylor expansion of a λ-term is isomorphic to its Böhm tree, improving Ehrhard and Regnier’s original proof along three independent directions.

First, we simplify the final step of the proof by following the left reduction strategy directly in the resource calculus, avoiding to introduce an abstract machine ad-hoc.

We also introduce a groupoid of permutations of copies of arguments in a rigid variant of the resource calculus, and relate the coefficients of Taylor expansion with this structure, while Ehrhard and Regnier worked with groups of permutations of occurrences of variables.

Finally, we extend all the results to a non-deterministic setting: by contrast with previous attempts, we show that the uniformity property that was crucial in Ehrhard and Regnier’s approach can be preserved in this setting.

Pages:8
Talk:Jul 07 14:20 (Session 28H)
Paper: