Transreal Newtonian physics operates at singularities

Synesis 7 (2):57-81 (2015)
  Copy   BIBTEX

Abstract

Sir Isaac Newton, writing in Latin, defined his celebrated laws of motion verbally. When the laws of motion are read as relating to his arithmetic and his calculus, division by zero is undefined so his physics fails at mathematical singularities. The situation is unchanged in modern real arithmetic and real calculus: division by zero is undefined so both Newtonian Physics and its modern developments fail at mathematical singularities. However, when Newton’s text is read as relating to transreal arithmetic and transreal calculus, division by zero is defined and we show that the resulting Transreal Newtonian Physics does operate at mathematical singularities. We hold out the hope that the whole of modern physics may be similarly extended. We use the new physics to predict a convection current at the singularity in a black hole and suggest experiments in astronomy and high energy physics that might confirm or rebut our predictions. Thus our exegesis of Newton’s text extends mathematical physics and may, in future, extend experimental physics.

Other Versions

No versions found

Links

PhilArchive



    Upload a copy of this work     Papers currently archived: 99,245

External links

Setup an account with your affiliations in order to access resources via your University's proxy server

Through your library

Similar books and articles

The Motion of a Body in Newtonian Theories.James Owen Weatherall - 2011 - Journal of Mathematical Physics 52 (3):032502.
Science and hypothesis: the complete text.Henri Poincaré - 2018 - London, UK: Bloomsbury Academic, an imprint of Bloomsbury Publsihing Plc. Edited by Mélanie Frappier, Andrea Smith & David J. Stump.
Why the Book of Nature is Written in the Language of Mathematics.Dustin Lazarovici - 2024 - In Angelo Bassi, Sheldon Goldstein, Roderich Tumulka & Nino Zanghi (eds.), Physics and the Nature of Reality: Essays in Memory of Detlef Dürr. Springer. pp. 369-381.
The New Science: Kepler, Galileo, Mersenne.Brian Baigrie - 2002 - In Steven M. Nadler (ed.), A Companion to Early Modern Philosophy. Malden, Mass.: Wiley-Blackwell. pp. 45–59.

Analytics

Added to PP
2016-02-22

Downloads
19 (#957,614)

6 months
2 (#1,705,961)

Historical graph of downloads
How can I increase my downloads?

Author's Profile

Tiago Reis
Universidade Nova de Lisboa

Citations of this work

No citations found.

Add more citations

References found in this work

No references found.

Add more references