A proof is a successful demonstration that a conclusion necessarily follows by logical reasoning from axioms which are considered evident for the given context and agreed upon by the community. It is this concept that sets mathematics apart from other disciplines and distinguishes it as the prototype of a deductive science. Proofs thus are utterly relevant for research, teaching and communication in mathematics and of particular interest for the philosophy of mathematics. In computer science, moreover, proofs have proved to be a rich source for already certified algorithms. This book provides the reader with a collection of articles covering relevant current research topics circled around the concept 'proof'. It tries to give due consider...
When mathematicians discuss proofs, they rarely have a particular formal system in mind. Indeed, the...
Proof theory: the general study of deductive systems Structural proof theory:...with respect to stru...
Workshop located in a cross-disciplinary field bringing together mathematics, logic, natural science...
A proof is a successful demonstration that a conclusion necessarily follows by logical reasoning fro...
The concept of proof is briefly illuminated from mathematical, philosophical and historical perspect...
Without having a clear definition of what proof is, mathematicians distinguish proofs from other typ...
The aim of the paper is to study the role and features of proofs in mathematics. Formal and informal...
Some knowledge of what it means to construct a proof is an extremely important part of mathematics. ...
Proof theory began in the 1920’s as a part of Hilbert’s program. That program aimed to secure the fo...
The philosophy of mathematics has long been concerned with deter-mining the means that are appropria...
What is a proof for? What is the characteristic use of a proof as a computation, as opposed to its u...
Abstract. For more than 2000 years, from Pythagoras and Euclid to Hilbert and Bourbaki, mathematical...
The notion of proof has long played a key role in the study of mathematics. It is in my opinion the ...
Mathematical proof lies at the foundations of mathematics, but there are several notions of what mat...
Two crucial concepts of the methodology and philosophy of mathematics are considered: proof and trut...
When mathematicians discuss proofs, they rarely have a particular formal system in mind. Indeed, the...
Proof theory: the general study of deductive systems Structural proof theory:...with respect to stru...
Workshop located in a cross-disciplinary field bringing together mathematics, logic, natural science...
A proof is a successful demonstration that a conclusion necessarily follows by logical reasoning fro...
The concept of proof is briefly illuminated from mathematical, philosophical and historical perspect...
Without having a clear definition of what proof is, mathematicians distinguish proofs from other typ...
The aim of the paper is to study the role and features of proofs in mathematics. Formal and informal...
Some knowledge of what it means to construct a proof is an extremely important part of mathematics. ...
Proof theory began in the 1920’s as a part of Hilbert’s program. That program aimed to secure the fo...
The philosophy of mathematics has long been concerned with deter-mining the means that are appropria...
What is a proof for? What is the characteristic use of a proof as a computation, as opposed to its u...
Abstract. For more than 2000 years, from Pythagoras and Euclid to Hilbert and Bourbaki, mathematical...
The notion of proof has long played a key role in the study of mathematics. It is in my opinion the ...
Mathematical proof lies at the foundations of mathematics, but there are several notions of what mat...
Two crucial concepts of the methodology and philosophy of mathematics are considered: proof and trut...
When mathematicians discuss proofs, they rarely have a particular formal system in mind. Indeed, the...
Proof theory: the general study of deductive systems Structural proof theory:...with respect to stru...
Workshop located in a cross-disciplinary field bringing together mathematics, logic, natural science...