This essay describes an approach to constructive mathematics based on abstract i.e. axiomatic mathematics. Rather than insisting on structures to be explicitly constructed, constructivity is dened by the sole requirement that proofs have computational content. It is shown that this approach is compatible with restricted forms of classical logic and choice principles
We report on our efforts to explore geometry using constructive mathematics and intuitionistic logic...
A constructive conception of logic is nowadays essentially a theory of the meaning of the logical co...
Abstract This paper briefly reviews some epistemological perspectives on the foundation of mathemati...
The traditional method of doing mathematics is primarily based on classical logic. By doing mathemat...
The thesis examines two dimensions of constructivity that manifest themselves within foundational s...
International audienceRecent work in constructive mathematics show that Hilbert's program works for ...
This paper briefly reviews some epistemological perspectives on the foundation of mathematical conce...
The point of using constructive methods in mathematics is to explicitly exhibit any object or algor...
Mathematicians have long recognized the distinction between an argument showing that an interesting ...
The first part of the paper introduces the varieties of modern constructive mathematics, concentrati...
AbstractThis paper introduces Bishop's constructive mathematics, which can be regarded as the constr...
Constructive mathematics is mathematics without the use of the principle of the excluded middle. The...
. The goal of foundational thinking in computer science is to understand the methods and practices o...
The overall topic of the volume, Mathematics for Computation (M4C), is mathematics taking crucially ...
Abstract. The formal axiomatic method stemming from Hilbert and recently defended by Hintikka is not...
We report on our efforts to explore geometry using constructive mathematics and intuitionistic logic...
A constructive conception of logic is nowadays essentially a theory of the meaning of the logical co...
Abstract This paper briefly reviews some epistemological perspectives on the foundation of mathemati...
The traditional method of doing mathematics is primarily based on classical logic. By doing mathemat...
The thesis examines two dimensions of constructivity that manifest themselves within foundational s...
International audienceRecent work in constructive mathematics show that Hilbert's program works for ...
This paper briefly reviews some epistemological perspectives on the foundation of mathematical conce...
The point of using constructive methods in mathematics is to explicitly exhibit any object or algor...
Mathematicians have long recognized the distinction between an argument showing that an interesting ...
The first part of the paper introduces the varieties of modern constructive mathematics, concentrati...
AbstractThis paper introduces Bishop's constructive mathematics, which can be regarded as the constr...
Constructive mathematics is mathematics without the use of the principle of the excluded middle. The...
. The goal of foundational thinking in computer science is to understand the methods and practices o...
The overall topic of the volume, Mathematics for Computation (M4C), is mathematics taking crucially ...
Abstract. The formal axiomatic method stemming from Hilbert and recently defended by Hintikka is not...
We report on our efforts to explore geometry using constructive mathematics and intuitionistic logic...
A constructive conception of logic is nowadays essentially a theory of the meaning of the logical co...
Abstract This paper briefly reviews some epistemological perspectives on the foundation of mathemati...