IMPLICIT FUNCTION THEOREM AND ITS APPLICATIONS
https://doi.org/10.5281/zenodo.15377846
Keywords:
Implicit function theorem, partial derivatives, mathematical analysis, optimization, differential equations, JacobianAbstract
The Implicit Function Theorem is a fundamental result in mathematical analysis with far-reaching implications in differential equations, optimization, and manifold theory. This theorem provides conditions under which a relation defined by an equation can be locally expressed as a function of some variables in terms of others. In this article, we explore the theoretical foundations of the Implicit Function Theorem, its proof, and its applications in various fields, including economics, physics, and engineering. We discuss how the theorem facilitates the study of constrained optimization, implicit differentiation, and the stability of dynamical systems. Additionally, we present illustrative examples to demonstrate its practical utility in solving nonlinear equations and modeling real-world phenomena.
Downloads
References
Rudin, W. Principles of Mathematical Analysis. McGraw-Hill, 1976.
Spivak, M. Calculus. Publish or Perish, 1994.
Lang, S. Analysis I. Springer, 1983.
Apostol, T. M. Mathematical Analysis. Addison-Wesley, 1974.
Courant, R., John, F. Introduction to Calculus and Analysis. Springer, 1999.
Kolmogorov, A. N., Fomin, S. V. Introductory Real Analysis. Dover, 1975.
Taylor, J. Foundations of Analysis. American Mathematical Society, 2012.
Royden, H. L. Real Analysis. Pearson, 2010.
Marsden, J., Hoffman, M. Basic Complex Analysis. W. H. Freeman, 1999.
Royden, H. L. Real Analysis. Pearson, 2010.
Downloads
Published
Versions
- 2025-05-10 (2)
- 2025-05-10 (1)
Issue
Section
License
This work is licensed under a Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International License.
