THE FORMULATION OF THE CAUCHY PROBLEM FOR FIRST-ORDER DIFFERENTIAL EQUATIONS AND ITS THEORETICAL FOUNDATIONS

Authors

  • Jurayev Shaxzod Shuxratjonvich Asia International University

DOI:

https://doi.org/10.55640/

Keywords:

First-order differential equations; Cauchy problem; initial value problem; existence and uniqueness theorem; Lipschitz condition; Picard–Lindelöf theorem; well-posed problem; integral curves; direction field; mathematical analysis.

Abstract

This article examines the formulation and theoretical foundations of the Cauchy problem for first-order differential equations, which occupies a central role in mathematical analysis and its applications. The study begins with a rigorous definition of first-order differential equations and the corresponding initial value problem, emphasizing the conditions under which a unique solution exists. Particular attention is devoted to the fundamental existence and uniqueness theorems, including the classical results associated with Lipschitz continuity and continuity conditions. The paper further explores the geometric interpretation of solutions, highlighting the relationship between integral curves and direction fields. In addition, the analytical framework underlying the Picard–Lindelöf theorem is discussed in detail, providing insight into iterative methods for constructing solutions. The role of continuity, boundedness, and differentiability in ensuring well-posedness is also critically analyzed. Through a systematic exposition of these theoretical principles, the article establishes a coherent understanding of the Cauchy problem, demonstrating its significance in both theoretical investigations and practical problem-solving across various fields of science and engineering.

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References

1.Буваев Қ. Т., Жўраев Ш. Ш. Уч каррали Фурье қаторининг октаэдрли қисмий йиғиндилар кетма-кетлиги учун Лебег ўзгармасини асимптотик ҳолати ҳақида INNOVATION IN THE MODERN EDUCATION SYSTEM jurn.2023,171-172-betlar.

2.Буваев Қ. Т., Жўраев Ш. Ш. “Уч каррали Фурье қаторининг октаэдрли қисмий йиғиндилар кетма-кетлигини текис яқинлашиши” ZAMONAVIY MATEMATIKANING DOLZARB MUAMMOLARI VA TATBIQLARI yosh olimlarning ilmiy konferensiyasi tezislari to‘plami.14-15 Mart 2024Toshkent54-56 betlar

3.Jo‘rayev S. S. (2026). ELLIPTIK DIFFERENSIAL OPERATORLAR CHIZIQLI SPEKTRAL YOYILMALARINING RAQAMLI IQTISODIYOTDA TUTGAN O‘RNI. Development Of Science, 1(1), pp. 229-236. .

4.Jo‘rayev S. S. (2025). MATEMATIKA FANINING RIVOJLANISHI ORQALI INSONLARNING KOINOT HAQIDAGI QARASHLARI. Development Of Science, 12(8), pp. 210-219.

5.Jurayev Shaxzod Shuxratjonvich, ENHANCING THE EFFECTIVENESS OF TEACHING METHODOLOGY FOR ELLIPTIC DIFFERENTIAL EQUATION SOLUTIONS BASED ON ARTIFICIAL INTELLIGENCE. (2025). Journal of Multidisciplinary Sciences and Innovations, 4(11), 1764-1768.

6.Jurayev Shaxzod Shuxratjonvich, THE ROLE OF THE LAPLACE OPERATOR IN ARTIFICIAL INTELLIGENCE , Journal of Multidisciplinary Sciences and Innovations: Vol. 4 No. 10 (2025): Journal of Multidisciplinary Sciences and Innovations.408-411

7.Jurayev Shaxzod Shuxratjonvich ,THE SIGNIFICANCE OF ELLIPTIC DIFFERENTIAL OPERATORS IN ARTIFICIAL INTELLIGENCE SYSTEMS,Journal of Applied SCIENCE AND SOCIAL SCIENCE.650-654

8.Behrndt, J., Grubb, G., Langer, M., Lotoreichik, V. (2015). Spectral asymptotics for resolvent differences of elliptic operators with δ and δ′interactions on hypersurfaces. Journal of Spectral Theory..

9.Behrndt, J., & Rohleder, J. (2015). Spectral analysis of selfadjoint elliptic differential operators via Dirichlet-to-Neumann maps and abstract Weyl functions. Advances in Mathematics, 274, 242283.

10.Shubin, M. A. (1992). Spectral theory of elliptic operators on noncompact manifolds. Astérisque, 207, 35108.

11.Алимов Ш. А. Равномерная сходимость и суммируемость спектральных разложений функций из //Дифференц. уравнения.— 1973.— 9, № 4.— С. 669—681.

12.Jurayev Shaxzod Shuxratjonvich , SPECTRAL EXPANSIONS FOR SECOND-ORDER ELLIPTIC DIFFERENTIAL OPERATORS. (2026). Journal of Multidisciplinary Sciences and Innovations, 5(02), 1815-1818. https://doi.org/10.55640/

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Published

2026-03-22

Issue

Vol. 5 No. 03 (2026): Journal of Multidisciplinary Sciences and Innovations

Section

Articles

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Authors retain the copyright of their manuscripts, and all Open Access articles are disseminated under the terms of the Creative Commons Attribution License 4.0 (CC-BY), which licenses unrestricted use, distribution, and reproduction in any medium, provided that the original work is appropriately cited. The use of general descriptive names, trade names, trademarks, and so forth in this publication, even if not specifically identified, does not imply that these names are not protected by the relevant laws and regulations.

How to Cite

THE FORMULATION OF THE CAUCHY PROBLEM FOR FIRST-ORDER DIFFERENTIAL EQUATIONS AND ITS THEORETICAL FOUNDATIONS. (2026). Journal of Multidisciplinary Sciences and Innovations, 5(03), 1694-1701. https://doi.org/10.55640/

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