Mathematical apriorists usually defend their view by contending that axioms are knowable a priori, and that the rules of inference in mathematics preserve this apriority for derived statements—so that by following the proof of a statement, we can trace the apriority being inherited. The empiricist Philip Kitcher attacked this claim by arguing there is no satisfactory theory that explains how mathematical axioms could be known a priori. I propose that in analyzing Ernest Sosa’s model of intuition as an intellectual virtue, we can construct an “intuition–virtue” that could supply the missing explanation for the apriority of axioms. I first argue that this intuition–virtue qualifies as an a priori warrant according to Kitcher’s account, and th...
peer reviewedBernard Bolzano notoriously rejected Immanuel Kant’s claim that arithmetic and geometry...
Mathematics is one of the most interesting and challeng-ing subjects known to mankind. This is due p...
In a famous intervention at the Second International Congress of Mathematicians (Paris, 1900), Poinc...
When mathematicians discuss proofs, they rarely have a particular formal system in mind. Indeed, the...
The motivating question of this paper is: ‘How are our beliefs in the theorems of mathematics justif...
The motivating question of this paper is: ‘How are our beliefs in the theorems of mathematics justif...
To build a supplementary theory from which we can derive a practical way of fostering inquiring mind...
Until recently, discussion of virtues in the philosophy of mathematics has been fleeting and fragmen...
This paper puts forward and defends an account of mathematical truth, and in particular an account o...
My research concerns the search for and justification of new axioms in math-ematics. The need for ne...
170 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1988.In The Nature of Mathematical...
What sorts of epistemic virtues are required for effective mathematical practice? Should these be vi...
This article is mainly a critique of Philip Kitcher's book, The Nature of Mathematical Knowledge. Fo...
Since Plato, Aristotle and Euclid the axiomatic method was considered as the best method to justify ...
The philosophy of mathematics has long been concerned with deter-mining the means that are appropria...
peer reviewedBernard Bolzano notoriously rejected Immanuel Kant’s claim that arithmetic and geometry...
Mathematics is one of the most interesting and challeng-ing subjects known to mankind. This is due p...
In a famous intervention at the Second International Congress of Mathematicians (Paris, 1900), Poinc...
When mathematicians discuss proofs, they rarely have a particular formal system in mind. Indeed, the...
The motivating question of this paper is: ‘How are our beliefs in the theorems of mathematics justif...
The motivating question of this paper is: ‘How are our beliefs in the theorems of mathematics justif...
To build a supplementary theory from which we can derive a practical way of fostering inquiring mind...
Until recently, discussion of virtues in the philosophy of mathematics has been fleeting and fragmen...
This paper puts forward and defends an account of mathematical truth, and in particular an account o...
My research concerns the search for and justification of new axioms in math-ematics. The need for ne...
170 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1988.In The Nature of Mathematical...
What sorts of epistemic virtues are required for effective mathematical practice? Should these be vi...
This article is mainly a critique of Philip Kitcher's book, The Nature of Mathematical Knowledge. Fo...
Since Plato, Aristotle and Euclid the axiomatic method was considered as the best method to justify ...
The philosophy of mathematics has long been concerned with deter-mining the means that are appropria...
peer reviewedBernard Bolzano notoriously rejected Immanuel Kant’s claim that arithmetic and geometry...
Mathematics is one of the most interesting and challeng-ing subjects known to mankind. This is due p...
In a famous intervention at the Second International Congress of Mathematicians (Paris, 1900), Poinc...