Nominal Matching Logic

Autor: Cheney, James, Fernández, Maribel
Jazyk: angličtina
Rok vydání: 2022
Předmět:
Zdroj: Cheney, J & Fernández, M 2022, Nominal Matching Logic . in Proceedings of the 24th International Symposium on Principles and Practice of Declarative Programming (PPDP 2022) ., 5, 24th International Symposium on Principles and Practice of Declarative Programming, Tbilisi, Georgia, 20/09/22 . https://doi.org/10.1145/3551357.3551375
DOI: 10.1145/3551357.3551375
Popis: We introduce Nominal Matching Logic (NML) as an extension of Matching Logic with names and binding following the Gabbay-Pitts nominal approach. Matching logic is the foundation of the $\mathbb{K}$ framework, used to specify programming languages and automatically derive associated tools (compilers, debuggers, model checkers, program verifiers). Matching logic does not include a primitive notion of name binding, though binding operators can be represented via an encoding that internalises the graph of a function from bound names to expressions containing bound names. This approach is sufficient to represent computations involving binding operators, but has not been reconciled with support for inductive reasoning over syntax with binding (e.g., reasoning over $\lambda$-terms). Nominal logic is a formal system for reasoning about names and binding, which provides well-behaved and powerful principles for inductive reasoning over syntax with binding, and NML inherits these principles. We discuss design alternatives for the syntax and the semantics of NML, prove meta-theoretical properties and give examples to illustrate its expressive power. In particular, we show how induction principles for $\lambda$-terms ($\alpha$-structural induction) can be defined and used to prove standard properties of the $\lambda$-calculus.
Comment: To appear, PPDP 2022
Databáze: OpenAIRE