 Calculus of Variations and the Geodesic EquationIgor Kriz and
Aleš Pultr
Chapter 14 in Introduction to Mathematical Analysis, 2013, pp 349-366 from Springer Abstract: Abstract The aim of this chapter is to give a glimpse of the main principle of the calculus of variations which, in its most basic problem, concerns minimizing certain types of linear functions on the space of continuously differentiable curves in $${\mathbb{R}}^{n}$$ with fixed beginning point and end point. For further study in this subject, we recommend [7]. We derive the Euler-Lagrange equation which can be used to axiomatize a large part of classical mechanics. We then consider in more detail the possibly most fundamental example of the calculus of variations, namely the problem of finding the shortest curve connecting two points in an open set in $${\mathbb{R}}^{n}$$ with an arbitrary given (smoothly varying) inner product on its tangent space. The Euler-Lagrange equation in this case is known as the geodesic equation. The smoothly varying inner product captures the idea of curved space. Thus, solving the geodesic equation here goes a long way toward motivating the basic techniques of Riemannian geometry, which we will develop in the next chapter. Keywords: Critical Function; Geodesic Equation; Open Neighborhood Versus; Lagrangian Mechanic; Conceptual Proof (search for similar items in EconPapers) There are no downloads for this item, see the EconPapers FAQ for hints about obtaining it. Related works: Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text Persistent link: https://EconPapers.repec.org/RePEc:spr:sprchp:978-3-0348-0636-7_14 Ordering information: This item can be ordered from DOI: 10.1007/978-3-0348-0636-7_14 Access Statistics for this chapter More chapters in Springer Books from Springer |
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