Abstract. Paul Cohen's method of forcing, together with Saul Kripke's related semantics for modal and intuitionistic logic, has had profound effects on a number of branches of mathematical logic, from set theory and model theory to constructive and categorical logic. Here, I argue that forcing also has a place in traditional Hilbert-style proof theory, where the goal is to formalize portions of ordinary mathematics in restricted axiomatic theories, and study those theories in constructive or syntactic terms. I will discuss the aspects of forcing that are useful in this respect, and some sample applications. The latter include ways of obtaining conservation results for classical and intuitionistic theories, interpreting classical t...
Abstract. The formal axiomatic method popularized by Hilbert and recently defended by Hintikka is no...
We consider two systems of intuitionistic modal logic which are computationally motivated: first, th...
Since the method of forcing appeared in the early 60's, a vast array of relative consistency results...
Abstract. Paul Cohen's method of forcing, together with Saul Kripke's related semantics fo...
We survey some classical and some recent results in the theory of forcing axioms, aiming to present ...
This book continues from where the authors' previous book, Structural Proof Theory, ended. It presen...
International audienceThis paper is a study of the forcing translation through the proofs as program...
This text deals with three basic techniques for constructing models of Zermelo-Fraenkel set theory: ...
This book, now in a thoroughly revised second edition, provides a comprehensive and accessible intro...
Set theory has made tremendous progress in the last 75 years, but much of it has been outside the bo...
Abstract. A number of classical theories are interpreted in analogous theories that are based on int...
Exponsition of forcing and the independence of the continuum hypothesisThe independence of the conti...
International audienceDefining a theory, such as arithmetic, geometry, or set theory, in predicate l...
AbstractIn this paper we introduce effectiveness into model theory of intuitionistic logic. The main...
Every definable forcing class Γ gives rise to a corresponding forcing modality □Γ where □Γφ means th...
Abstract. The formal axiomatic method popularized by Hilbert and recently defended by Hintikka is no...
We consider two systems of intuitionistic modal logic which are computationally motivated: first, th...
Since the method of forcing appeared in the early 60's, a vast array of relative consistency results...
Abstract. Paul Cohen's method of forcing, together with Saul Kripke's related semantics fo...
We survey some classical and some recent results in the theory of forcing axioms, aiming to present ...
This book continues from where the authors' previous book, Structural Proof Theory, ended. It presen...
International audienceThis paper is a study of the forcing translation through the proofs as program...
This text deals with three basic techniques for constructing models of Zermelo-Fraenkel set theory: ...
This book, now in a thoroughly revised second edition, provides a comprehensive and accessible intro...
Set theory has made tremendous progress in the last 75 years, but much of it has been outside the bo...
Abstract. A number of classical theories are interpreted in analogous theories that are based on int...
Exponsition of forcing and the independence of the continuum hypothesisThe independence of the conti...
International audienceDefining a theory, such as arithmetic, geometry, or set theory, in predicate l...
AbstractIn this paper we introduce effectiveness into model theory of intuitionistic logic. The main...
Every definable forcing class Γ gives rise to a corresponding forcing modality □Γ where □Γφ means th...
Abstract. The formal axiomatic method popularized by Hilbert and recently defended by Hintikka is no...
We consider two systems of intuitionistic modal logic which are computationally motivated: first, th...
Since the method of forcing appeared in the early 60's, a vast array of relative consistency results...