Novel approaches to existence and uniquenessin nonlinear higherorder differential equations| International Journal of Innovative Science and Research Technology

Novel Approaches to Existence and Uniquenessin Nonlinear Higher-Order Differential Equations

Authors : Venkatachalapathi Uday; Dr. Gautam Kumar Rajput

Volume/Issue : Volume 9 - 2024, Issue 10 - October

Google Scholar : https://tinyurl.com/bdhnw7vh

Scribd : https://tinyurl.com/ye2x9bj4

DOI : https://doi.org/10.38124/ijisrt/IJISRT24OCT1628

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Abstract : The study of nonlinear higher-order differential equations presents significant challenges in terms of existence and uniqueness of solutions. This paper explores novel approaches to addressing these challenges, focusing on recent advancements and methodologies that offer new perspectives on these classical problems. We investigate advanced techniques including topological methods, functional analysis, and computational approaches to enhance our understanding of existence and uniqueness in nonlinear higher-order differential equations. By reviewing the latest literature and integrating new findings, this paper aims to provide a comprehensive overview of current research trends and future directions in this area.

Keywords : Nonlinear Differential Equations, Higher-Order Differential Equations, Existence Theorems, Uniqueness of Solutions, Topological Methods.

References :

Bertram, W. (1999). Nonlinear Differential Equations and Their Applications. Springer.
Gilbarg, D., & Trudinger, N. S. (2001). Elliptic Partial Differential Equations of Second Order. Springer.
Krasnosel'skii, M. A., & Rutickii, J. S. (1964). Convex Functions and Orlicz Spaces. P. Noordhoff Ltd.
Zeidler, E. (1985). Nonlinear Functional Analysis and Its Applications. Springer.
Coddington, E. A., & Levinson, N. (1955). Theory of Ordinary Differential Equations. McGraw- Hill.
Amann, H. (1993). Nonlinear Differential Equations: Theory, Methods and Applications. Wiley.
Gelfand, I. M., & Fomin, S. V. (1963). Calculus of Variations. Prentice-Hall.
Lions, J.-L., & Magenes, E. (1972). Non-Homogeneous Boundary Value Problems and Applications. Springer.
Hale, J. K., & Kocan, M. (2003). Dynamics and Bifurcations of Nonlinear Differential Equations. Springer.
Schaefer, H. H. (1974). Topological Vector Spaces. Springer.

The study of nonlinear higher-order differential equations presents significant challenges in terms of existence and uniqueness of solutions. This paper explores novel approaches to addressing these challenges, focusing on recent advancements and methodologies that offer new perspectives on these classical problems. We investigate advanced techniques including topological methods, functional analysis, and computational approaches to enhance our understanding of existence and uniqueness in nonlinear higher-order differential equations. By reviewing the latest literature and integrating new findings, this paper aims to provide a comprehensive overview of current research trends and future directions in this area.

Keywords : Nonlinear Differential Equations, Higher-Order Differential Equations, Existence Theorems, Uniqueness of Solutions, Topological Methods.

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