Talk:Lagrange multiplier

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Hi,

I just changed looking for an extremum of g to looking for an extremum of h although I'm not absolutely sure. But I think it is the right term.

Thanks for catching that; that occurrence of g seems to have been missed when the notation was changed in December.--Steuard 20:51, Jan 28, 2005 (UTC)

Strictly looking for an extremum of ${\displaystyle h(\overrightarrow{x},\overrightarrow{\lambda })}$ also implies the original ${\displaystyle \overrightarrow{g}(\overrightarrow{x})=\overrightarrow{0}}$ via ${\displaystyle \frac{\partial \overrightarrow{h}}{\partial \overrightarrow{\lambda }}=\overrightarrow{0}}$. 84.160.236.56 19:29, 6 Feb 2005 (UTC)

Citation from the article: "One may reformulate the Lagrangian as a Hamiltonian, in which case the solutions are local minima for the Hamiltonian. This is done in optimal control theory, in the form of Pontryagin's minimum principle." This seems a very important statement, and the article should include detailed explanations and an example of such transform "Lagrangian to Hamiltonian". Links here redirect to general theory of Hamiltonian dynamics and do not explain how this reformulation can be done

The section Modern formulation via differentiable manifolds contains the following sentence:

"In what follows, it is not necessary that ${\displaystyle M}$ be a Euclidean space, or even a Riemannian manifold."

But it is not stated what is necessary for ${\displaystyle M}$ to be.

I hope someone knowledgeable about this matter can fix this, by stating some reasonable condition(s) that ${\displaystyle M}$ must satisfy.

Surely it must satisfy *some* condition(s) for these operations to make sense.

Hello,

I was wondering why there is no section about the history of the Lagrange multiplier. I think at the very least we can add a section referencing the Mécanique analytique. DonavenGarrison (talk) 00:34, 27 October 2024 (UTC)Reply

The section about "Modern formulation via differentiable manifolds" uses ${\displaystyle \mathrm{\Lambda }}$. but the link in that section for Exterior Algebra uses ${\displaystyle \bigwedge }$. Not a mathematician so figured I'd write about it and get a second opinion. Thanks for working on it