An Algebra for Scientific Equations with Applications in Computational Problems

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Jesudason Christopher G

Abstract

An algebra for scientific equations is developed which couples a number to a "physical dimension". The physical dimension is viewed as a vector space with some novel properties. In the past, such equations were intuitively used without the development of a formal mathematical theory. Here, the formal theory correlates physical "dimensions" with known mathematical structures unambiguously; all intuitive presuppositions are axiomatically stated. The theory is applied to problems in scientific computing and some novel deductions are made concerning the temperature and the Boltzmann factor.

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How to Cite
Christopher G, J. (2005). An Algebra for Scientific Equations with Applications in Computational Problems. Malaysian Journal of Science, 24(2), 79–85. Retrieved from https://mjlis.um.edu.my/index.php/MJS/article/view/8336
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Original Articles