Transreal calculus

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dos Reis, T. S. and Anderson, J. (2015) Transreal calculus. IAENG International Journal of Applied Mathematics, 45 (1). pp. 51-63. ISSN 1992-9986

Abstract/Summary

Transreal arithmetic totalises real arithmetic by defining division by zero in terms of three definite, non-finite numbers: positive infinity, negative infinity and nullity. We describe the transreal tangent function and extend continuity and limits from the real domain to the transreal domain. With this preparation, we extend the real derivative to the transreal derivative and extend proper integration from the real domain to the transreal domain. Further, we extend improper integration of absolutely convergent functions from the real domain to the transreal domain. This demonstrates that transreal calculus contains real calculus and operates at singularities where real calculus fails.

Item Type	Article
URI	https://reading-clone.eprints-hosting.org/id/eprint/39280
Item Type	Article
Refereed	Yes
Divisions	Science > School of Mathematical, Physical and Computational Sciences > Department of Computer Science
Uncontrolled Keywords	transreal arithmetic, transreal tangent, transreal continuity, transreal limit, transreal derivative, transreal integral, transreal calculus.
Publisher	International Association of Engineers
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Deposit Details

Date Deposited:	19 Feb 2015 15:20	Date item deposited into CentAUR
Last Modified:	09 Jun 2024 05:13	Date item last modified

References

[1] J. A. D. W. Anderson. Perspex machine ix: Transreal analysis. In Longin Jan Lateki, David M. Mount, and Angela Y. Wu, editors, Vision Ge- ometry XV, volume 6499 of Proceedings of SPIE, pages J1{J12, 2007. [2] J. A. D. W. Anderson. Perspex machine xi: Topology of the transreal numbers. In S.I. Ao, Oscar Castillo, Craig Douglas, David Dagan Feng, and Jeong-A Lee, editors, IMECS 2008, pages 330{33, March 2008. [3] J. A. D. W. Anderson. Evolutionary and revolutionary e�ects of transcomputation. In 2nd IMA Conference on Mathematics in Defence. Institute of Mathematics and its Applications, Oct. 2011. [4] J. A. D. W. Anderson. Trans- oating-point arithmetic removes nine quadrillion redundancies from 64-bit ieee 754 oating-point arithmetic. In Lecture Notes in Engineering and Computer Science: Proceedings of The World Congress on Engineering and Computer Science 2014, WCECS 2014, 22-24 October, 2014, San Francisco, USA., volume 1, pages 80{85, 2014. [5] J. A. D. W. Anderson and T. S. dos Reis. Transreal limits expose category errors in ieee 754 oating-point arithmetic and in mathematics. In Lecture Notes in Engineering and Computer Science: Proceedings of The World Congress on Engineering and Computer Science 2014, WCECS 2014, 22- 24 October, 2014, San Francisco, USA., volume 1, pages 86{91, 2014. [6] J. A. D. W. Anderson, N. V�olker, and A. A. Adams. Perspex machine viii: Axioms of transreal arithmetic. In Longin Jan Lateki, David M. Mount, and Angela Y. Wu, editors, Vision Geometry XV, volume 6499 of Proceedings of SPIE, pages 2.1{2.12, 2007. [7] T. S. dos Reis and J. A. D. W. Anderson. Construction of the transcomplex numbers from the complex numbers. In Lecture Notes in Engineering and Computer Science: Proceedings of The World Congress on Engineer- ing and Computer Science 2014, WCECS 2014, 22-24 October, 2014, San Francisco, USA., volume 1, pages 97{102, 2014. [8] T. S. dos Reis and J. A. D. W. Anderson. Transdi�erential and transintegral calculus. In Lecture Notes in Engineering and Computer Science: Proceedings of The World Congress on Engineering and Computer Science 2014, WCECS 2014, 22-24 October, 2014, San Francisco, USA., volume 1, pages 92{96, 2014. [9] W. Gomide and T. S. dos Reis. N�umeros transreais: Sobre a no�c~ao de dist^ancia. Synesis - Universidade Cat�olica de Petr�opolis, 5(2):153{166, 2013. [10] J. R. Munkres. Topology. Prentice Hall, 2000. [11] T. B. Ng. Mathematical analysis - an introduction. Url http://tinyurl.com/prunxnc, National University of Singapore, Department of Mathematics, Block S17, 10 Lower Kent Ridge Road, Singapore 119076, July 2012. [12] E. M. Stein and R. Shakarchi. Real Analysis. Princeton University Press, 2005. [13] P. Urysohn. Zum metrisationsproblem. Mathematische Annalen, 94:309{ 315, 1925.

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