Pages that link to "Book:I.M. Gelfand/Calculus of Variations"
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The following pages link to Book:I.M. Gelfand/Calculus of Variations:
Displayed 50 items.
- Noether's Theorem (Calculus of Variations) (← links)
- Differential of Differentiable Functional is Unique (← links)
- Differential of Differentiable Functional is Unique/Lemma (← links)
- Condition for Differentiable Functional to have Extremum (← links)
- Simplest Variational Problem (← links)
- Necessary Condition for Integral Functional to have Extremum for given function (← links)
- Necessary Condition for Integral Functional to have Extremum for given function/Lemma (← links)
- If Definite Integral of a(x)h(x) vanishes for any C^0 h(x) then C^0 a(x) vanishes (← links)
- Conditions for C^1 Smooth Solution of Euler's Equation to have Second Derivative (← links)
- If Double Integral of a(x, y)h(x, y) vanishes for any C^2 h(x, y) then C^0 a(x, y) vanishes (← links)
- Simple Variable End Point Problem (← links)
- Vanishing First Variational Derivative implies Euler's Equation for Vanishing Variation (← links)
- Euler's Equation for Vanishing Variation is Invariant under Coordinate Transformations (← links)
- Necessary Condition for Integral Functional to have Extremum for given function/Dependent on N Functions (← links)
- Necessary and Sufficient Condition for Integral Parametric Functional to be Independent of Parametric Representation (← links)
- Necessary Condition for Integral Functional to have Extremum for given Function/Dependent on Nth Derivative of Function (← links)
- Simplest Variational Problem with Subsidiary Conditions (← links)
- Simplest Variational Problem with Subsidiary Conditions for Curve on Surface (← links)
- General Variation of Integral Functional/Dependent on N Functions (← links)
- General Variation of Integral Functional/Dependent on N Functions/Canonical Variables (← links)
- Simple Variable End Point Problem/Endpoints on Curves (← links)
- Necessary Condition for Integral Functional to have Extremum for given Function/Non-differentiable at Intermediate Point (← links)
- Euler's Equation for Vanishing Variation in Canonical Variables (← links)
- Conditions for Function to be First Integral of Euler's Equations for Vanishing Variation (← links)
- Conditions for Function to be First Integral of Euler's Equations for Vanishing Variation/Corollary 1 (← links)
- Conditions for Function to be First Integral of Euler's Equations for Vanishing Variation/Corollary 2 (← links)
- Legendre Transform is Involution (← links)
- Conditions for Function to be Maximum of its Legendre Transform Two-variable Equivalent (← links)
- Conditions for Functional to be Extremum of Two-variable Functional over Canonical Variable p (← links)
- Conditions for Integral Functionals to have same Euler's Equations (← links)
- Conditions for Transformation to be Canonical (← links)
- Derivation of Hamilton-Jacobi Equation (← links)
- Partial Derivatives of Solution of Hamilton-Jacobi Equation are First Integrals of Euler's Equations (← links)
- Jacobi's Theorem (← links)
- Necessary Condition for Twice Differentiable Functional to have Minimum (← links)
- Sufficient Condition for Twice Differentiable Functional to have Minimum (← links)
- Legendre's Condition (← links)
- Legendre's Condition/Lemma 1 (← links)
- Legendre's Condition/Lemma 2 (← links)
- Necessary and Sufficient Condition for Quadratic Functional to be Positive Definite (← links)
- Necessary and Sufficient Condition for Quadratic Functional to be Positive Definite/Lemma 1 (← links)
- Necessary and Sufficient Condition for Quadratic Functional to be Positive Definite/Lemma 2 (← links)
- Jacobi's Necessary Condition (← links)
- Nonnegative Quadratic Functional implies no Interior Conjugate Points (← links)
- Jacobi's Equation is Variational Equation of Euler's Equation (← links)
- Equivalence of Definitions of Conjugate Point (← links)
- Sufficient Conditions for Weak Extremum (← links)
- Legendre's Condition/Lemma 2/Dependent on N Functions (← links)
- Legendre's Condition/Lemma 1/Dependent on N Functions (← links)
- Necessary and Sufficient Condition for Quadratic Functional to be Positive Definite/Dependent on N Functions (← links)