Constructing Higher Inductive Types as Groupoid Quotients

Veltri, Niccolò; Weide, Niels van der

doi:10.23638/lmcs-17(2:8)2021

Cited by 2 publications

(1 citation statement)

References 54 publications

(40 reference statements)

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“…Another type-theoretic proof of this statement was earlier given in [LF14], using higher inductive types (groupoid quotients [VW21]). We may now offer a more structural proof, using delooping by the type of torsors:…”

Section: Type Theorymentioning

confidence: 95%

Topological Quantum Gates in Homotopy Type Theory

Myers¹,

Sati²,

Schreiber³

2023

Preprint

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Despite the evident necessity of topological protection for realizing scalable quantum computers, the conceptual underpinnings of topological quantum logic gates had arguably remained shaky, both regarding their physical realization as well as their information-theoretic nature.Building on recent results on defect branes in string/M-theory [SS22-Def] and on their holographically dual anyonic defects in condensed matter theory [SS22-Ord], here we explain (as announced in [SS22-TQC]) how the specification of realistic topological quantum gates, operating by anyon defect braiding in topologically ordered quantum materials, has a surprisingly slick formulation in parameterized point-set topology, which is so fundamental that it lends itself to certification in modern homotopically typed programming languages, such as cubical Agda.We propose that this remarkable confluence of concepts may jointly kickstart the development of topological quantum programming proper as well as of real-world application of homotopy type theory, both of which have arguably been falling behind their high expectations; in any case, it provides a powerful paradigm for simulating and verifying topological quantum computing architectures with high-level certification languages aware of the actual physical principles of realistic topological quantum hardware.In a companion article [QP] (announced in [Sc22b]), we explain how further passage to "dependent linear" homotopy data types naturally extends this scheme to a full-blown quantum programming/certification language in which our topological quantum gates may be compiled to verified quantum circuits, complete with quantum measurement gates and classical control.In Memoriam of Yuri Manin who introduced quantum computation as well as Gauss-Manin connections unknowing of their close relationship.

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Section: Type Theorymentioning

confidence: 95%