Two crucial concepts of the methodology and philosophy of mathematics are considered: proof and truth. We distinguish between informal proofs constructed by mathematicians in their research practice and formal proofs as defined in the foundations of mathematics (in metamathematics). Their role, features and interconnections are discussed. They are confronted with the concept of truth in mathematics. Relations between proofs and truth are analysed
The concept of proof is briefly illuminated from mathematical, philosophical and historical perspect...
The overall aim of this paper is to serve as an introduction to the work currently being done on the...
Whenever a subject is organized systematically for expository or foundational purposes (or both), on...
Abstract: In connection with different points of views on the nature of mathematics I cons...
Without having a clear definition of what proof is, mathematicians distinguish proofs from other typ...
This chapter discusses four questions concerning the nature and role of the concept of truth in math...
International audienceIn mathematics education, it is often said that mathematical statements are ne...
The author shows in his article how the awareness of the difference between truth and provability in...
A proof is a successful demonstration that a conclusion necessarily follows by logical reasoning fro...
The aim of the paper is to study the role and features of proofs in mathematics. Formal and informal...
One can distinguish, roughly speaking, two different approaches to the philosophy of mathematics. On...
Mathematical proof lies at the foundations of mathematics, but there are several notions of what mat...
Most philosophers still tend to believe that mathematics is basically about producing formal proofs....
The notion of proof is central to mathematics yet it is one of the most difficult aspects of the sub...
Abstract For a long time, mathematical proof has been at the core of an active debate in the commun...
The concept of proof is briefly illuminated from mathematical, philosophical and historical perspect...
The overall aim of this paper is to serve as an introduction to the work currently being done on the...
Whenever a subject is organized systematically for expository or foundational purposes (or both), on...
Abstract: In connection with different points of views on the nature of mathematics I cons...
Without having a clear definition of what proof is, mathematicians distinguish proofs from other typ...
This chapter discusses four questions concerning the nature and role of the concept of truth in math...
International audienceIn mathematics education, it is often said that mathematical statements are ne...
The author shows in his article how the awareness of the difference between truth and provability in...
A proof is a successful demonstration that a conclusion necessarily follows by logical reasoning fro...
The aim of the paper is to study the role and features of proofs in mathematics. Formal and informal...
One can distinguish, roughly speaking, two different approaches to the philosophy of mathematics. On...
Mathematical proof lies at the foundations of mathematics, but there are several notions of what mat...
Most philosophers still tend to believe that mathematics is basically about producing formal proofs....
The notion of proof is central to mathematics yet it is one of the most difficult aspects of the sub...
Abstract For a long time, mathematical proof has been at the core of an active debate in the commun...
The concept of proof is briefly illuminated from mathematical, philosophical and historical perspect...
The overall aim of this paper is to serve as an introduction to the work currently being done on the...
Whenever a subject is organized systematically for expository or foundational purposes (or both), on...