Lagrangian equations of motion
Lagrangian equations of motion
[lə′grän·jē·ən i¦kwā·zhənz əv ′mō·shən] McGraw-Hill Dictionary of Scientific & Technical Terms, 6E, Copyright © 2003 by The McGraw-Hill Companies, Inc.
References in periodicals archive
(1) and (2),
Lagrangian equations of motion [9] allows us to predict the behavior of the particle trajectory.
A common argument for it is that set out by Tolman,(7) using the standard
Lagrangian equations of motion,
My argument in that earlier study fell into two distinct parts: a positive part, where classical mechanical systems displaying unequivocal temporal asymmetry were cited - dissipative systems, typical of engineering physics and chaos theory; and a negative part, where a standard argument in favour of the alleged symmetry (that which pretends to deduce a universal reversibility of motion from the invariance of some
Lagrangian equations of motions) was criticized.
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