The philosophy of mathematics has long been concerned with deter-mining the means that are appropriate for justifying claims of mathematical knowledge, and the metaphysical considerations that render them so. But, as of late, many philosophers have called attention to the fact that a much broader range of normative judgments arise in ordinary mathematical practice; for example, questions can be interesting, theorems important, proofs explanatory, concepts powerful, and so on. The associated values are often loosely classified as aspects of “mathematical understanding.” Meanwhile, in a branch of computer science known as “formal verification,” the practice of interactive theorem proving has given rise to software tools and systems designed t...
One common understanding of formalism in the philosophy of mathematics takes it as holding that math...
There is overwhelming evidence that students face serious challenges in learning mathematical proof....
The philosophy of mathematics considers what is behind the math that we do. What is mathematics? Is ...
A proof is a successful demonstration that a conclusion necessarily follows by logical reasoning fro...
When mathematicians discuss proofs, they rarely have a particular formal system in mind. Indeed, the...
Formal verification involves the use of logical and computational methods to establish claims that a...
Abstract. In this paper, I assume, perhaps controversially, that translation into a language of form...
Contemporary philosophy of mathematics offers us an embarrassment of riches. Among the major areas o...
Mathematical logic is a branch of mathematics that takes axiom systems and mathematical proofs as it...
Without having a clear definition of what proof is, mathematicians distinguish proofs from other typ...
A good proof is a proof that makes us wiser. Manin [41, p. 209]. Abstract. Hilbert’s concept of form...
Of all the demands that mathematics imposes on its practitioners, one of the most fundamental is tha...
This essay considers the special character of mathematical reasoning, and draws on observations from...
The guiding idea behind formalism is that mathematics is not a body of propositions representing an ...
As computers become a more prevalent commodity in mathematical research and mathematical proof, the ...
One common understanding of formalism in the philosophy of mathematics takes it as holding that math...
There is overwhelming evidence that students face serious challenges in learning mathematical proof....
The philosophy of mathematics considers what is behind the math that we do. What is mathematics? Is ...
A proof is a successful demonstration that a conclusion necessarily follows by logical reasoning fro...
When mathematicians discuss proofs, they rarely have a particular formal system in mind. Indeed, the...
Formal verification involves the use of logical and computational methods to establish claims that a...
Abstract. In this paper, I assume, perhaps controversially, that translation into a language of form...
Contemporary philosophy of mathematics offers us an embarrassment of riches. Among the major areas o...
Mathematical logic is a branch of mathematics that takes axiom systems and mathematical proofs as it...
Without having a clear definition of what proof is, mathematicians distinguish proofs from other typ...
A good proof is a proof that makes us wiser. Manin [41, p. 209]. Abstract. Hilbert’s concept of form...
Of all the demands that mathematics imposes on its practitioners, one of the most fundamental is tha...
This essay considers the special character of mathematical reasoning, and draws on observations from...
The guiding idea behind formalism is that mathematics is not a body of propositions representing an ...
As computers become a more prevalent commodity in mathematical research and mathematical proof, the ...
One common understanding of formalism in the philosophy of mathematics takes it as holding that math...
There is overwhelming evidence that students face serious challenges in learning mathematical proof....
The philosophy of mathematics considers what is behind the math that we do. What is mathematics? Is ...