Examples of 'calculus of variations' in a sentence
Meaning of "calculus of variations"
Calculus of variations is a branch of mathematics that deals with finding optimal solutions for mathematical problems, usually involving functions. It involves determining the function that minimizes or maximizes a certain mathematical expression, subject to specific conditions or constraints
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- The form of calculus that deals with the maxima and minima of definite integrals of functions of many variables.
How to use "calculus of variations" in a sentence
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calculus of variations
It relies on the fundamental lemma of calculus of variations.
Calculus of variations and its applications.
The problem is considered part of the calculus of variations.
Calculus of variations and optimal control.
Lagrange is one of the founders of the calculus of variations.
He works primarily on calculus of variations and partial differential equations.
He was one of the founding fathers of the calculus of variations.
He is a specialist of the calculus of variations and of partial differential equations.
Optimal control theory is a generalization of the calculus of variations.
Calculus of variations and probability.
Fundamental lemma of the calculus of variations.
Calculus of variations.
Lagrange contributed to the calculus of variations.
The calculus of variations then shows that to the first order,.
This work is concerned with the calculus of variations.
See also
Marston Morse applied calculus of variations in what is now called Morse theory.
Newton worked on an early example in the calculus of variations.
Lectures on the Calculus of Variations on the topic.
Newton also worked on an example in the calculus of variations.
Functional analysis, calculus of variations and optimal control.
Malliavin calculus is also called the stochastic calculus of variations.
He also invented the calculus of variations including its best-known result, the Euler-Lagrange equation.
It involves the use of calculus of variations.
Calculus of variations = = = Weierstrass also made significant advancements in the field of calculus of variations.
Lectures on the calculus of variations.
Weierstrass also made significant advancements in the field of calculus of variations.
Derivation from calculus of variations.
He is known for his basic work on topological methods in the calculus of variations.
The fundamental lemma of the calculus of variations is named after him.
The mountain pass theorem is an existence theorem from the calculus of variations.
His main fields of research are the calculus of variations and geometric measure theory.
Douglas also made significant contributions to the inverse problem of the calculus of variations.
Euler invented the calculus of variations including its most well-known result, the Euler - Lagrange equation.
Fundamental lemma in calculus of variations.
Existence of solutions for nonlinear parabolic problems via direct methods in the calculus of variations.
They have found application in the calculus of variations and other areas.
Mathematically they are described using partial differential equations from the calculus of variations.
Are the solutions of regular problems in the calculus of variations always necessarily analytic?
Other articles in this volume are on recurring series, probabilities, and the calculus of variations.
His doctoral dissertation was on the calculus of variations in 1910, at the University of Vienna.
He works on partial differential equations and the calculus of variations.
For this, we will use calculus of variations.
He also provided foundations for Elliptic functions, Differential geometry and the calculus of variations.
An introduction to the calculus of variations.
The dynamic programming of Richard Bellman is an alternative to the calculus of variations.
On inverse problem of calculus of variations.
V0130 Variational objective analysis A sophisticated initializatrion scheme based on the calculus of variations.
Regularity and convergence results in the calculus of variations on metric spaces.
The Method of Lagrangian Multipliers uses the theoretical basis of the calculus of variations.
Control, optimisation and calculus of variations.
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Examples of using Variations
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Variations concerning different products are discussed below
Infinite forms of variations with each generation
Variations in country and regional group proposals
Examples of using Calculus
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Differential calculus is the mathematics of using derivatives
I am very good at integral and differential calculus
So calculus has traditionally been taught very late
