Add to ORKGWe associate to every proof structure in multiplicative linear logic an ideal which represents the logical content of the proof as polynomial equations. We show how cut-elimination in multiplicative proof nets corresponds to instances of the Buchberger algorithm for computing Gr\"obner bases in elimination theory
AbstractThis paper presents a system of interaction nets, a graphical paradigm of computation based ...
We present a simple cut-elimination procedure for MALL proof nets with monomial weights (a la Girard...
AbstractGirard's Geometry of Interaction (GoI) develops a mathematical framework for modelling the d...
We examine some combinatorial properties of parallel cut elimination in multiplicative linear logic ...
We describe in full detail a solution to the problem of proving the cut elimination theorem for FILL...
We examine some combinatorial properties of parallel cut elimination inmultiplicative linear logic (...
International audienceWe examine some combinatorial properties of parallel cut elimination in multip...
International audienceWe examine some combinatorial properties of parallel cut elimination in multip...
International audienceWe examine some combinatorial properties of parallel cut elimination in multip...
International audienceWe examine some combinatorial properties of parallel cut elimination in multip...
We describe in full detail a solution to the problem of proving the cut elimination theorem for FILL...
The purpose of this paper is to demonstrate how Lafont’s interaction combinators, a system of three ...
We present a simple cut-elimination procedure for MALL proof nets with monomial weights (à la Girard...
We present a simple cut-elimination procedure for MALL proof nets with monomial weights (` a la Gira...
We present a simple cut-elimination procedure for MALL proof nets with monomial weights (à la Girard...
AbstractThis paper presents a system of interaction nets, a graphical paradigm of computation based ...
We present a simple cut-elimination procedure for MALL proof nets with monomial weights (a la Girard...
AbstractGirard's Geometry of Interaction (GoI) develops a mathematical framework for modelling the d...
We examine some combinatorial properties of parallel cut elimination in multiplicative linear logic ...
We describe in full detail a solution to the problem of proving the cut elimination theorem for FILL...
We examine some combinatorial properties of parallel cut elimination inmultiplicative linear logic (...
International audienceWe examine some combinatorial properties of parallel cut elimination in multip...
International audienceWe examine some combinatorial properties of parallel cut elimination in multip...
International audienceWe examine some combinatorial properties of parallel cut elimination in multip...
International audienceWe examine some combinatorial properties of parallel cut elimination in multip...
We describe in full detail a solution to the problem of proving the cut elimination theorem for FILL...
The purpose of this paper is to demonstrate how Lafont’s interaction combinators, a system of three ...
We present a simple cut-elimination procedure for MALL proof nets with monomial weights (à la Girard...
We present a simple cut-elimination procedure for MALL proof nets with monomial weights (` a la Gira...
We present a simple cut-elimination procedure for MALL proof nets with monomial weights (à la Girard...
AbstractThis paper presents a system of interaction nets, a graphical paradigm of computation based ...
We present a simple cut-elimination procedure for MALL proof nets with monomial weights (a la Girard...
AbstractGirard's Geometry of Interaction (GoI) develops a mathematical framework for modelling the d...