INTRODUCTION
Variational methods have proved to be very important in the study of optimal shape, time, velocity, volume or energy. Laws existing in mechanics, physics, astronomy, economics and other fields of natural sciences and engineering obey variational principles. The main objective of variational method is to obtain the solutions governed by these principles. Fermat postulated that light follows a part of least possible time, this is a subject in finding minimizers of a given functional. It is important to note that we are in this work concerned about solution of some Boudary Value Problem of some Partial Differential Equations.
Dennis, E (2021). Sobolev Spaces And Variational Method Applied To Elliptic Partial Differential Equations. Afribary. Retrieved from https://tracking.afribary.com/works/sobolev-spaces-and-variational-method-applied-to-elliptic-partial-differential-equations
Dennis, Enyi "Sobolev Spaces And Variational Method Applied To Elliptic Partial Differential Equations" Afribary. Afribary, 15 Apr. 2021, https://tracking.afribary.com/works/sobolev-spaces-and-variational-method-applied-to-elliptic-partial-differential-equations. Accessed 30 Nov. 2024.
Dennis, Enyi . "Sobolev Spaces And Variational Method Applied To Elliptic Partial Differential Equations". Afribary, Afribary, 15 Apr. 2021. Web. 30 Nov. 2024. < https://tracking.afribary.com/works/sobolev-spaces-and-variational-method-applied-to-elliptic-partial-differential-equations >.
Dennis, Enyi . "Sobolev Spaces And Variational Method Applied To Elliptic Partial Differential Equations" Afribary (2021). Accessed November 30, 2024. https://tracking.afribary.com/works/sobolev-spaces-and-variational-method-applied-to-elliptic-partial-differential-equations