To those brought up in a logic-based tradition there seems to be a simple and clear definition of proof. But this is largely a twentieth century invention; many earlier proofs had a different nature. We will look particularly at the faulty proof of Euler's Theorem and Lakatos' rational reconstruction of the history of this proof. We will ask: how is it possible for the errors in a faulty proof to remain undetected for several years—even when counter-examples to it are known? How is it possible to have a proof about concepts that are only partially defined? And can we give a logic-based account of such phenomena? We introduce the concept of schematic proofs and argue that they offer a possible cognitive model for the human construction of pr...
When mathematicians discuss proofs, they rarely have a particular formal system in mind. Indeed, the...
Abstract: Proof and deductive method in mathematics have their origin in the classic model of exposi...
Today highly nontrivial mathematics is routinely being encoded in the computer, ensuring a reliabil-...
To those brought up in a logic-based tradition there seems to be a simple and clear definition of pr...
Following Hilbert, there seems to be a simple and clear definition of mathematical proof: it is a se...
Without having a clear definition of what proof is, mathematicians distinguish proofs from other typ...
Some knowledge of what it means to construct a proof is an extremely important part of mathematics. ...
A proof is one of the most important concepts of mathematics. However, there is a striking differenc...
Abstract. Schematic proofs are functions which can produce a proof of a proposition for each value o...
A proof is a successful demonstration that a conclusion necessarily follows by logical reasoning fro...
A good proof is a proof that makes us wiser. Manin [41, p. 209]. Abstract. Hilbert’s concept of form...
Mathematical proof lies at the foundations of mathematics, but there are several notions of what mat...
The notion of proof has long played a key role in the study of mathematics. It is in my opinion the ...
For close to a century, despite the eorts of ne minds that include Hilbert and Ackermann, Lukasiewic...
The aim of the paper is to study the role and features of proofs in mathematics. Formal and informal...
When mathematicians discuss proofs, they rarely have a particular formal system in mind. Indeed, the...
Abstract: Proof and deductive method in mathematics have their origin in the classic model of exposi...
Today highly nontrivial mathematics is routinely being encoded in the computer, ensuring a reliabil-...
To those brought up in a logic-based tradition there seems to be a simple and clear definition of pr...
Following Hilbert, there seems to be a simple and clear definition of mathematical proof: it is a se...
Without having a clear definition of what proof is, mathematicians distinguish proofs from other typ...
Some knowledge of what it means to construct a proof is an extremely important part of mathematics. ...
A proof is one of the most important concepts of mathematics. However, there is a striking differenc...
Abstract. Schematic proofs are functions which can produce a proof of a proposition for each value o...
A proof is a successful demonstration that a conclusion necessarily follows by logical reasoning fro...
A good proof is a proof that makes us wiser. Manin [41, p. 209]. Abstract. Hilbert’s concept of form...
Mathematical proof lies at the foundations of mathematics, but there are several notions of what mat...
The notion of proof has long played a key role in the study of mathematics. It is in my opinion the ...
For close to a century, despite the eorts of ne minds that include Hilbert and Ackermann, Lukasiewic...
The aim of the paper is to study the role and features of proofs in mathematics. Formal and informal...
When mathematicians discuss proofs, they rarely have a particular formal system in mind. Indeed, the...
Abstract: Proof and deductive method in mathematics have their origin in the classic model of exposi...
Today highly nontrivial mathematics is routinely being encoded in the computer, ensuring a reliabil-...