A simple formal procedure makes the main properties of the ordinary lagrangian operator extendable to some higher order di erential operators de ned for functions depending on the lagrangian coordinates q and on their derivatives of any order with respect to time. The higher order calculated expressions can provide the lagrangian components, in the classical sense of the Newton's law, for a quite general class of forces. At the same time, the generalized equations of motions recover some of the classical alternative formulations of the Lagrangian equations.
Lagrangian Operators with Higher Derivatives / Talamucci, F.. - In: JOURNAL OF ADVANCES IN MATHEMATICS AND COMPUTER SCIENCE. - ISSN 2456-9968. - ELETTRONICO. - 29:(2018), pp. 1-12. [10.9734/JAMCS/2018/44539]
Lagrangian Operators with Higher Derivatives
Talamucci, F.
2018
Abstract
A simple formal procedure makes the main properties of the ordinary lagrangian operator extendable to some higher order di erential operators de ned for functions depending on the lagrangian coordinates q and on their derivatives of any order with respect to time. The higher order calculated expressions can provide the lagrangian components, in the classical sense of the Newton's law, for a quite general class of forces. At the same time, the generalized equations of motions recover some of the classical alternative formulations of the Lagrangian equations.
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