AbstractAn inferential semantics for full Higher Order Logic (HOL) is proposed. The paper presents a constructive notion of model, that being able to capture relevant computational aspects is particularly suited for the applications of HOL to computer science. The inferential semantics is based on the introduction of new abstract deduction structures (ADS) that express the action of the Comprehension Axiom in a Higher Order Logic proof. The ADS’s allow to define an inferential algebra of higher order potential proof-trees, endowed with two binary operations, the abstraction and the contraction, each consisting of constructive reductions between potential proofs. Typed formulas are interpreted by sequent trees, and the operations between tre...
We give a first-order presentation of higher-order logic based on explicit substitutions. This prese...
Combining Higher Order Abstract Syntax (HOAS) and (co)induction is well known to be problematic. In ...
The Calculus of Constructions (CC) ([Coquand 1985]) is a typed lambda calculus for higher order intu...
An inferential semantics for full Higher Order Logic (HOL) is proposed. The paper presents a constru...
This paper contains a systematic study of the foundations of knowledge representation, computation, ...
The focus of this lecture series will be HOL, Church's higher-order logic, which is the core of...
This paper presents a case for the use of higher-order logic as a foundation for computational logic...
We present a logic for the specification and analysis of deductive systems. This logic is an extensi...
The objective of this thesis is to provide a formal basis for higher-order features in the paradigm ...
We present a mechanised semantics for higher-order logic (HOL), and a proof of soundness for the inf...
We present a series of improvements to the Hybrid system, a formal theory implemented in Isabelle/HO...
howe@scs.carleton.ca Higher-Order Abstract Syntax, or HOAS, is a technique for using a higher-order ...
We develop an extensional semantics for higher-order logic programs withnegation, generalizing the t...
At present this document is a (small) mess pot of explorations of how one might go about presentatio...
We introduce a new formalization of Higher-Order-Logic (abbreviated Hol), which we baptized Formath,...
We give a first-order presentation of higher-order logic based on explicit substitutions. This prese...
Combining Higher Order Abstract Syntax (HOAS) and (co)induction is well known to be problematic. In ...
The Calculus of Constructions (CC) ([Coquand 1985]) is a typed lambda calculus for higher order intu...
An inferential semantics for full Higher Order Logic (HOL) is proposed. The paper presents a constru...
This paper contains a systematic study of the foundations of knowledge representation, computation, ...
The focus of this lecture series will be HOL, Church's higher-order logic, which is the core of...
This paper presents a case for the use of higher-order logic as a foundation for computational logic...
We present a logic for the specification and analysis of deductive systems. This logic is an extensi...
The objective of this thesis is to provide a formal basis for higher-order features in the paradigm ...
We present a mechanised semantics for higher-order logic (HOL), and a proof of soundness for the inf...
We present a series of improvements to the Hybrid system, a formal theory implemented in Isabelle/HO...
howe@scs.carleton.ca Higher-Order Abstract Syntax, or HOAS, is a technique for using a higher-order ...
We develop an extensional semantics for higher-order logic programs withnegation, generalizing the t...
At present this document is a (small) mess pot of explorations of how one might go about presentatio...
We introduce a new formalization of Higher-Order-Logic (abbreviated Hol), which we baptized Formath,...
We give a first-order presentation of higher-order logic based on explicit substitutions. This prese...
Combining Higher Order Abstract Syntax (HOAS) and (co)induction is well known to be problematic. In ...
The Calculus of Constructions (CC) ([Coquand 1985]) is a typed lambda calculus for higher order intu...