Add to ORKGA functional is a mapping from a set of functions to the set of real numbers. In this paper we establish a sufficient condition for a functional to have a minimum. Along the way, we will see how concepts from finite dimensional calculus such as continuity and differentiability manifest themselves in the calculus of variations. In addition several introductory sections are devoted to developing some necessary tools in analysis and differential equations
This book is intended for a first course in the calculus of variations, at the senior or beginning g...
AbstractWe prove necessary optimality conditions, in the class of continuous functions, for variatio...
A first derivative test is formulated for determining the nature of extrema of a function f(x) of n ...
Abstract: Employing the contemporary theory of functional differential equa-tions, we propose an eff...
<p>The calculus of variations is a branch of mathematical analysis that studies extrema and critical...
Methods to solve variational problems, the tasks for the study for maximum and minimum of functional...
Variational calculus studies methods for finding maximum and minimum values of functional. It has i...
Includes bibliographical references (page 53)The calculus of variations is a branch of mathematics c...
Analyzing polynomials of two variables and using Taylor series, will show the significance of the se...
Variational calculus studied methods for finding maximum and minimum values of functional. It has it...
In his paper, Ewing has established sufficient conditions for a non-regular problem in the calculus ...
Variational calculus studied methods for finding maximum and minimum values of functional. It has it...
Abstract: We give a proper fractional extension of the classical calculus of variations. Necessary o...
AbstractProblems in the Calculus of Variations can be viewed as multistage decision problems of a co...
From its origins in the minimization of integral functionals, the notion of 'variations' has evolved...
This book is intended for a first course in the calculus of variations, at the senior or beginning g...
AbstractWe prove necessary optimality conditions, in the class of continuous functions, for variatio...
A first derivative test is formulated for determining the nature of extrema of a function f(x) of n ...
Abstract: Employing the contemporary theory of functional differential equa-tions, we propose an eff...
<p>The calculus of variations is a branch of mathematical analysis that studies extrema and critical...
Methods to solve variational problems, the tasks for the study for maximum and minimum of functional...
Variational calculus studies methods for finding maximum and minimum values of functional. It has i...
Includes bibliographical references (page 53)The calculus of variations is a branch of mathematics c...
Analyzing polynomials of two variables and using Taylor series, will show the significance of the se...
Variational calculus studied methods for finding maximum and minimum values of functional. It has it...
In his paper, Ewing has established sufficient conditions for a non-regular problem in the calculus ...
Variational calculus studied methods for finding maximum and minimum values of functional. It has it...
Abstract: We give a proper fractional extension of the classical calculus of variations. Necessary o...
AbstractProblems in the Calculus of Variations can be viewed as multistage decision problems of a co...
From its origins in the minimization of integral functionals, the notion of 'variations' has evolved...
This book is intended for a first course in the calculus of variations, at the senior or beginning g...
AbstractWe prove necessary optimality conditions, in the class of continuous functions, for variatio...
A first derivative test is formulated for determining the nature of extrema of a function f(x) of n ...