Integration in finite terms: the Liouville principle and the Ostrowski method

Authors

DOI:

https://doi.org/10.35819/remat2024v10i1id6556

Keywords:

elementary integration, integration in finite terms, Liouville principle, Liouville theorem, Ostrowski theorem

Abstract

Since the beginnings of Differential and Integral Calculus, many mathematicians have dedicated years of their lives to the development of this subject. They improved several techniques for computing the integrals of various classes of functions, but there were some of them that they could not calculate in terms of elementary functions (functions expressed by a finite number of polynomials, radicals, exponentials, logarithms, and trigonometric functions, using a finite amount of algebraic operations and function compositions). A question then arose about whether such integrals were in fact elementary. This led to the French mathematician Joseph Liouville developing a theory of integration in finite terms. In this paper, we presenting Liouville's brilliant reasoning and a generalization proposed by Ukrainian mathematician Alexander Ostrowski. Besides that, we will also be displaying possible applications of their results in the calculation of some integrals.

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References

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Published

2024-03-14

Issue

Section

Mathematics

How to Cite

SILVA, Allan Kenedy Santos. Integration in finite terms: the Liouville principle and the Ostrowski method. REMAT: Revista Eletrônica da Matemática, Bento Gonçalves, RS, Brasil, v. 10, n. 1, p. e3004, 2024. DOI: 10.35819/remat2024v10i1id6556. Disponível em: https://periodicos.ifrs.edu.br/index.php/REMAT/article/view/6556.. Acesso em: 23 nov. 2024.

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