Inconsistent Mathematics

Inconsistent Mathematics - Stanford Encyclopedia of Philosophy

Inconsistent Mathematics ... Inconsistent mathematics is the study of the mathematical theories that result when classical mathematical axioms are ...

Inconsistent Mathematics | Internet Encyclopedia of Philosophy

Inconsistent mathematics is the study of commonplace mathematical objects, like sets, numbers, and functions, where some contradictions are allowed.

Paraconsistent mathematics - Wikipedia

Paraconsistent mathematics, sometimes called inconsistent mathematics, represents an attempt to develop the classical infrastructure of mathematics (e.g. ...

RETHINKING INCONSISTENT MATHEMATICS - PhilArchive

inconsistent mathematics, and by inconsistent mathematicians I mean mathematicians engaged in inconsistent practices. More precise definitions will be given ...

Inconsistent Mathematics | SpringerLink

It is further argued that mathematics has a certain primacy over logic, in that paraconsistent or relevant logics have to be based on inconsistent mathematics.

Representing the World with Inconsistent Mathematics

In this paper, I argue that standard accounts fare poorly in explaining applications of inconsistent mathematical theories, and I propose an alternative ...

Paradoxes and Inconsistent Mathematics | Reviews

Zach Weber's Paradoxes and Inconsistent Mathematics is easily one of the most important books in inconsistent mathematics—and contradiction- ...

Inconsistent Mathematics, Hardcover by Mortensen, Chris, Brand ...

The theory of inconsistency has been growing steadily over the last two decades. One focus has been philosophical issues arising from the paradoxes of set ...

What are the philosophical implications of using inconsistent ...

... mathematical gain of inconsistent mathematics. I can re-read it of ... inconsistent mathematics means embracing "mathematics without foundations?

What if Current Foundations of Mathematics are Inconsistent? [closed]

1) the proof that PA is consistent exists, and is finitist. 2) People who disagree are ultrafinitists 3) all mathematical paradoxes so far were discovered ...

Applying Inconsistent Mathematics - Mark Colyvan

At various times, mathematicians have been forced to work with inconsistent mathematical theories. Sometimes the inconsistency of the theory in question was ...

What are the known inconsistencies in mathematics and ... - Quora

There are no known inconsistencies in mathematics (unless you mean inconsistencies in the way that notation gets used, which does happen—but ...

Inconsistent Mathematics - The Philosophy Forum

It is proposed as a way of getting around Russel's Paradox. Hence it might allow mathematics to be deduced from mere logic.

Applying Inconsistent Mathematics - SpringerLink

Inconsistent mathematics has a special place in the history of philosophy. The realisation, at the end of the nineteenth century, that a mathematical ...

The Liberation Argument for Inconsistent Mathematics

I propose a new conception of inconsistent mathematics - queer incomaths - as a liberatory activity meant to undermine said naturalization.

Paradoxes and Inconsistent Mathematics

Cambridge Core - Logic, Categories and Sets - Paradoxes and Inconsistent Mathematics.

Inconsistent Mathematics (Mathematics and Its Applications #312 ...

Inconsistent Mathematics (Mathematics and Its Applications #312) (Hardcover). By C. E. Mortensen. $65.99. At Distributor - We Can Usually Get It in 3-8 Days ...

"A Smack of Irrelevance" in Inconsistent Mathematics?

Abstract. Recently, some proponents and practitioners of inconsistent mathe- matics have argued that the subject requires a conditional with ir- ...

Franci Mangraviti, Rethinking inconsistent mathematics - PhilArchive

This dissertation has two main goals. The first is to provide a practice-based analysis of the field of inconsistent mathematics: what motivates it? what ...

Zach Weber, Paradoxes and Inconsistent Mathematics - PhilPapers

In this book, Zach Weber uses “dialetheic paraconsistency” – a formal framework where some contradictions can be true without absurdity – as the basis for ...