We prove the correctness of a formalised realisability interpretation of extensions of first-order theories by inductive and coinductive definitions in an untyped $\lambda$-calculus with fixed-points. We illustrate the use of this interpretation for program extraction by some simple examples in the area of exact real number computation and hint at further non-trivial applications in computable analysis
The paper proves soundness of an optimized realizability interpretationfor a logic supporting strict...
We prove that the three extensions of first-order logic by means of positive inductions, monotone in...
It is well-known that extensional lambda calculus is equivalent to extensional combinatory logic. In...
We prove the correctness of a formalised realisability interpretation of extensions of first-order t...
We prove the correctness of a formalised realisability interpretation of extensions of first-order t...
We study a realisability interpretation for inductive and coinductive definitions and discuss its ap...
We present a realizability interpretation of an intuitionistic version of Church's Simple Theory of ...
Approximation theory is a fixpoint theory of general (monotone and non-monotone) operators which gen...
Abstract. Approximation theory is a fixpoint theory of general (monotone and non-monotone) operators...
The goal of this thesis is to develop a logical system in which formal proofs of mathematical statem...
AbstractWe develop an extension of second order logic (AF2) with monotone, and not only positive, (c...
In this paper we will discuss various aspects of computable/constructive analysis, namely semantics,...
The issue of whether embedding algebraic theories in higher-order theories such as the simply typed ...
An extension of the simply-typed lambda calculus is presented which contains both wellstructured ind...
In the early 80's, there was a number of papers on what should be called proofs by consistency...
The paper proves soundness of an optimized realizability interpretationfor a logic supporting strict...
We prove that the three extensions of first-order logic by means of positive inductions, monotone in...
It is well-known that extensional lambda calculus is equivalent to extensional combinatory logic. In...
We prove the correctness of a formalised realisability interpretation of extensions of first-order t...
We prove the correctness of a formalised realisability interpretation of extensions of first-order t...
We study a realisability interpretation for inductive and coinductive definitions and discuss its ap...
We present a realizability interpretation of an intuitionistic version of Church's Simple Theory of ...
Approximation theory is a fixpoint theory of general (monotone and non-monotone) operators which gen...
Abstract. Approximation theory is a fixpoint theory of general (monotone and non-monotone) operators...
The goal of this thesis is to develop a logical system in which formal proofs of mathematical statem...
AbstractWe develop an extension of second order logic (AF2) with monotone, and not only positive, (c...
In this paper we will discuss various aspects of computable/constructive analysis, namely semantics,...
The issue of whether embedding algebraic theories in higher-order theories such as the simply typed ...
An extension of the simply-typed lambda calculus is presented which contains both wellstructured ind...
In the early 80's, there was a number of papers on what should be called proofs by consistency...
The paper proves soundness of an optimized realizability interpretationfor a logic supporting strict...
We prove that the three extensions of first-order logic by means of positive inductions, monotone in...
It is well-known that extensional lambda calculus is equivalent to extensional combinatory logic. In...