International audienceThe two-level logic approach (2LL) to reasoning about computational specifications, as implemented by the Abella theorem prover, represents derivations of a specification language as an inductive definition in a reasoning logic. This approach has traditionally been formulated with the specification and reasoning logics having the same type system, and only the formulas being translated. However, requiring identical type systems limits the approach in two important ways: (1) every change in the specification language's type system requires a corresponding change in that of the reasoning logic, and (2) the same reasoning logic cannot be used with two specification languages at once if they have incompatible type systems....
This paper is concerned with the type analysis of logic programs where, by type, we mean a property ...
International audienceThe logic of hereditary Harrop formulas (HH) has proven useful for specifying ...
AbstractWe study proof systems for reasoning about logical consequences and refinement of structured...
The two-level logic approach (2LL) to reasoning about computational specifications, as implemented b...
International audienceThe two-level logic approach (2LL) to reasoning about computational specificat...
International audienceWe describe an approach to using one logic to reason about specifications writ...
International audienceRelational descriptions have been used in formalizing diverse computational no...
This thesis concerns the development of a framework that facilitates the design and analysis of form...
Meseguer and Rosu proposed rewriting logic semantics (RLS) as a programming language definitional fr...
The Abella interactive theorem prover is based on an intuitionistic logic that allows for inductive ...
The Abella interactive theorem prover is based on an intuitionistic logic that allows for inductive ...
Language Various forms of typed λ-calculi have been proposed as specification languages for represen...
International audienceWe present a tutorial on the Abella theorem prover that is designed to reason ...
In this chapter, we propose a framework for logic programming with different type systems. In this f...
Modern functional programming languages, such as Haskell or OCaml, use sophisticated forms of type i...
This paper is concerned with the type analysis of logic programs where, by type, we mean a property ...
International audienceThe logic of hereditary Harrop formulas (HH) has proven useful for specifying ...
AbstractWe study proof systems for reasoning about logical consequences and refinement of structured...
The two-level logic approach (2LL) to reasoning about computational specifications, as implemented b...
International audienceThe two-level logic approach (2LL) to reasoning about computational specificat...
International audienceWe describe an approach to using one logic to reason about specifications writ...
International audienceRelational descriptions have been used in formalizing diverse computational no...
This thesis concerns the development of a framework that facilitates the design and analysis of form...
Meseguer and Rosu proposed rewriting logic semantics (RLS) as a programming language definitional fr...
The Abella interactive theorem prover is based on an intuitionistic logic that allows for inductive ...
The Abella interactive theorem prover is based on an intuitionistic logic that allows for inductive ...
Language Various forms of typed λ-calculi have been proposed as specification languages for represen...
International audienceWe present a tutorial on the Abella theorem prover that is designed to reason ...
In this chapter, we propose a framework for logic programming with different type systems. In this f...
Modern functional programming languages, such as Haskell or OCaml, use sophisticated forms of type i...
This paper is concerned with the type analysis of logic programs where, by type, we mean a property ...
International audienceThe logic of hereditary Harrop formulas (HH) has proven useful for specifying ...
AbstractWe study proof systems for reasoning about logical consequences and refinement of structured...