Difference between revisions of "Lagrange principle"

principle of stationary action

A variational integral principle in the dynamics of holonomic systems restricted by ideal stationary constraints and occurring under the action of potential forces that do not explicitly depend on time.

According to Lagrange's principle, in a real motion of a holonomic system for which the energy integral $ T + V = h $ exists, between a certain initial position $ A _ {0} $ and a final position $ A _ {1} $, the Lagrange action

$$ \int\limits _ {t _ {0} } ^ { t } 2 T dt = \int\limits _ {A _ {0} } ^ { {A } _ {1} } \sum _ \nu m _ \nu v _ \nu \cdot d r _ \nu $$

has a stationary value in comparison with the kinematically possible motions between these positions with the same energy $ h $ as in the real motion. Here $ T $ and $ V $ are the kinetic and the potential energy of the system, $ m _ \nu v _ \nu $ is the amount of motion (momentum) of the $ \nu $- th point of the system and $ t _ {0} $ and $ t $ are the instants when the system passes through the positions $ A _ {0} $ and $ A _ {1} $.

If the initial and final positions of the system are sufficiently close to one another, then the Lagrange action has a minimum for a real motion; in this connection the Lagrange principle is also called the principle of least action in Lagrange's form.

The Lagrange principle reduces the problem of determining a real motion of the system to the variational Lagrange problem; it expresses a condition that is necessary and sufficient for a real motion [4].

The Lagrange principle in implicit form was first stated by P.L.M. Maupertuis [1]; L. Euler [2] gave a proof of it for the case of the motion of one material point in a central field. J.L. Lagrange [3] extended this principle to more general problems.

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