Open AccessFinding the best function: a way to explain calculus of variations to engineering and science students
Author(s) -
Olga Kosheleva,
Владик Крейнович
Publication year - 2013
Publication title -
applied mathematical sciences
Language(s) - English
Resource type - Journals
eISSN - 1314-7552
pISSN - 1312-885X
DOI - 10.12988/ams.2013.311653
Subject(s) - function (biology) , euler equations , energy (signal processing) , science and engineering , calculus of variations , mathematics , computer science , calculus (dental) , mathematical optimization , mathematical analysis , engineering , medicine , dentistry , evolutionary biology , engineering ethics , biology , statistics
In many practical problems, we need to find the most appropriate function: e.g., we need to find a control strategy u(t) that leads to the best performance of a system, we need to find the shape of the car which leads to the smallest energy losses, etc. Optimization over an unknown function can be described by the known Euler-Lagrange equations. The traditional way of deriving Euler-Lagrange equations when explaining them to the engineering and science students is, however, somewhat over-complicated. We provide a new, simpler way to deriving these equations, a way in which we directly use the fact that when the optimum is attained, all partial derivatives are equal to 0.
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