### Resumé

Originalsprog | Engelsk |
---|---|

Titel | Proceedings of the 33rd Annual ACM/IEEE Symposium on Logic in Computer Science, LICS 2018 |

Antal sider | 10 |

Forlag | Association for Computing Machinery |

Publikationsdato | 9 jul. 2018 |

Sider | 669-678 |

ISBN (Elektronisk) | 978-1-4503-5583-4 |

DOI | |

Status | Udgivet - 9 jul. 2018 |

Begivenhed | 33rd Annual ACM/IEEE Symposium on Logic in Computer Science, LICS 2018 - Oxford, Storbritannien Varighed: 9 jul. 2018 → 12 jul. 2018 |

### Konference

Konference | 33rd Annual ACM/IEEE Symposium on Logic in Computer Science, LICS 2018 |
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Land | Storbritannien |

By | Oxford |

Periode | 09/07/2018 → 12/07/2018 |

Sponsor | ACM Special Interest Group on Logic and Computation (SIGLOG), European Association for Computer Science Logic (EACSL), IEEE Computer Society (IEEE-CS\DATC) |

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### Citer dette

*Proceedings of the 33rd Annual ACM/IEEE Symposium on Logic in Computer Science, LICS 2018*(s. 669-678). Association for Computing Machinery. https://doi.org/10.1145/3209108.3209175

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*Proceedings of the 33rd Annual ACM/IEEE Symposium on Logic in Computer Science, LICS 2018.*Association for Computing Machinery, s. 669-678, 33rd Annual ACM/IEEE Symposium on Logic in Computer Science, LICS 2018, Oxford, Storbritannien, 09/07/2018. https://doi.org/10.1145/3209108.3209175

**Boolean-valued semantics for the stochastic Lambda-calculus.** / Bacci, Giorgio; Furber, Robert; Kozen, Dexter; Mardare, Radu; Panangaden, Prakash; Scott, Dana.

Publikation: Bidrag til bog/antologi/rapport/konference proceeding › Konferenceartikel i proceeding › Forskning › peer review

TY - GEN

T1 - Boolean-valued semantics for the stochastic Lambda-calculus

AU - Bacci, Giorgio

AU - Furber, Robert

AU - Kozen, Dexter

AU - Mardare, Radu

AU - Panangaden, Prakash

AU - Scott, Dana

PY - 2018/7/9

Y1 - 2018/7/9

N2 - The ordinary untyped -calculus has a -theoretic model proposed in two related forms by Scott and Plotkin in the 1970s. Recently Scott showed how to introduce probability by extending these models with random variables. However, to reason about correctness and to add further features, it is useful to reinterpret the construction in a higher-order Boolean-valued model involving a measure algebra. We develop the semantics of an extended stochastic -calculus suitable for modeling a simple higher-order probabilistic programming language. We exhibit a number of key equations satisfied by the terms of our language. The terms are interpreted using a continuation-style semantics with an additional argument, an infinite sequence of coin tosses, which serves as a source of randomness. We also introduce a fixpoint operator as a new syntactic construct, as Β-reduction turns out not to be sound for unrestricted terms. Finally, we develop a new notion of equality between terms interpreted in a measure algebra, allowing one to reason about terms that may not be equal almost everywhere. This provides a new framework and reasoning principles for probabilistic programs and their higher-order properties.

AB - The ordinary untyped -calculus has a -theoretic model proposed in two related forms by Scott and Plotkin in the 1970s. Recently Scott showed how to introduce probability by extending these models with random variables. However, to reason about correctness and to add further features, it is useful to reinterpret the construction in a higher-order Boolean-valued model involving a measure algebra. We develop the semantics of an extended stochastic -calculus suitable for modeling a simple higher-order probabilistic programming language. We exhibit a number of key equations satisfied by the terms of our language. The terms are interpreted using a continuation-style semantics with an additional argument, an infinite sequence of coin tosses, which serves as a source of randomness. We also introduce a fixpoint operator as a new syntactic construct, as Β-reduction turns out not to be sound for unrestricted terms. Finally, we develop a new notion of equality between terms interpreted in a measure algebra, allowing one to reason about terms that may not be equal almost everywhere. This provides a new framework and reasoning principles for probabilistic programs and their higher-order properties.

KW - Boolean-valued models

KW - Denotational semantics

KW - Random variables

KW - Stochastic λ-calculus

U2 - 10.1145/3209108.3209175

DO - 10.1145/3209108.3209175

M3 - Article in proceeding

AN - SCOPUS:85051105439

SP - 669

EP - 678

BT - Proceedings of the 33rd Annual ACM/IEEE Symposium on Logic in Computer Science, LICS 2018

PB - Association for Computing Machinery

ER -