Permissive-Nominal Logic (PNL) is an extension of first-order predicate logic in which term-formers can bind names in their arguments. This allows for direct axiomatisations with binders, such as of the λ-binder of the lambda-calculus or the ∀-binder of first-order logic. It also allows us to finitely axiomatise arithmetic, and similarly to axiomatise ‘nominal’ datatypes-with-binding. Just like first- and higher-order logic, equality reasoning is not necessary to α-rename. This gives PNL much of the expressive power of higher-order logic, but models and derivations of PNL are first-order in character, and the logic seems to strike a good balance between expressivity and simplicity
We introduce term-generic logic (TGL), a first-order logic parameterized with terms defined axiomati...
In informal mathematical discourse (such as the text of a paper on theoretical computer science), we...
Term-generic first-order logic, or simply generic first-order logic (GFOL), is presented as a first-...
AbstractPermissive-Nominal Logic (PNL) extends first-order predicate logic with term-formers that ca...
Nominal logic is a variant of first-order logic in which abstract syntax with names and binding is ...
We introduce permissive nominal terms, and their unification. Nominal terms are one way to extend fi...
Nominal logic is an extension of first-order logic which provides a simple foundation for formalizin...
ABSTRACT: Nominal techniques concern the study of names using mathematical semantics. Whereas in muc...
AbstractNominal logic is an extension of first-order logic with features useful for reasoning about ...
Nominal logic is a variant of first-order logic equipped with a "freshname quantifier" N ...
AbstractThis paper formalises within first-order logic some common practices in computer science to ...
The lambda calculus is fundamental in computer science. It resists an algebraic treatment because of...
Nominal logic is an extension of first-order logic with equality, name-binding, renaming via name-sw...
Abstract. We introduce permissive nominal terms. Nominal terms ex-tend first-order terms with bindin...
AbstractMany formal systems, particularly in computer science, may be expressed through equations mo...
We introduce term-generic logic (TGL), a first-order logic parameterized with terms defined axiomati...
In informal mathematical discourse (such as the text of a paper on theoretical computer science), we...
Term-generic first-order logic, or simply generic first-order logic (GFOL), is presented as a first-...
AbstractPermissive-Nominal Logic (PNL) extends first-order predicate logic with term-formers that ca...
Nominal logic is a variant of first-order logic in which abstract syntax with names and binding is ...
We introduce permissive nominal terms, and their unification. Nominal terms are one way to extend fi...
Nominal logic is an extension of first-order logic which provides a simple foundation for formalizin...
ABSTRACT: Nominal techniques concern the study of names using mathematical semantics. Whereas in muc...
AbstractNominal logic is an extension of first-order logic with features useful for reasoning about ...
Nominal logic is a variant of first-order logic equipped with a "freshname quantifier" N ...
AbstractThis paper formalises within first-order logic some common practices in computer science to ...
The lambda calculus is fundamental in computer science. It resists an algebraic treatment because of...
Nominal logic is an extension of first-order logic with equality, name-binding, renaming via name-sw...
Abstract. We introduce permissive nominal terms. Nominal terms ex-tend first-order terms with bindin...
AbstractMany formal systems, particularly in computer science, may be expressed through equations mo...
We introduce term-generic logic (TGL), a first-order logic parameterized with terms defined axiomati...
In informal mathematical discourse (such as the text of a paper on theoretical computer science), we...
Term-generic first-order logic, or simply generic first-order logic (GFOL), is presented as a first-...