calculus of variations

calculus of variations
the branch of mathematics that deals with the problem of finding a curve or surface that maximizes or minimizes a given expression, usually with several restrictions placed on the desired curve.
[1830-40]

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      branch of mathematics concerned with the problem of finding a function for which the value of a certain integral is either the largest or the smallest possible. Many problems of this kind are easy to state, but their solutions commonly involve difficult procedures of the differential calculus and differential equations (differential equation).

      The isoperimetric problem—that of finding, among all plane figures of a given perimeter, the one enclosing the greatest area—was known to Greek mathematicians of the 2nd century BC. The term isoperimetric problem has been extended in the modern era to mean any problem in the calculus of variations in which a function is to be made a maximum or a minimum, subject to an auxiliary condition called the isoperimetric condition, although it may have nothing to do with perimeters. For example, the problem of finding a solid of given volume that has the least surface area is an isoperimetric problem, the given volume being the auxiliary, or isoperimetric, condition. An example of an isoperimetric problem from the field of aerodynamics is that of finding the shape of a solid having a given volume that will encounter minimum resistance as it travels through the atmosphere at a constant velocity.

      Modern interest in the calculus of variations began in 1696 when Johann Bernoulli (Bernoulli, Johann) of Switzerland proposed a brachistochrone (“least-time”) problem as a challenge to his peers. Suppose that a thin wire in the shape of a curve joins two points at different elevations. Further suppose that a bead is placed on the wire at the higher point and allowed to slide under gravity, starting from rest and assuming no friction. The question is: What should be the shape of the curve so that the bead will reach the lower point in the least time?

      The problem was solved independently in 1696 by Johann Bernoulli, his brother Jakob Bernoulli (Bernoulli, Jakob), the German Gottfried Wilhelm Leibniz (Leibniz, Gottfried Wilhelm), the Frenchman Guillaume-François-Antoine, marquis de L'Hôpital, and the Englishman Isaac Newton (Newton, Sir Isaac). Their basic idea was to set up an integral for the total time of fall in terms of the unknown curve and then vary the curve so that a minimum time is obtained. This technique, typical of the calculus of variations, led to a differential equation whose solution is a curve called the cycloid.

      It is possible to formulate various scientific laws in terms of general principles involving the calculus of variations. These are called variational principles and are usually expressed by stating that some given integral is a maximum or a minimum. One example is the French mathematician Pierre-Louis Moreau de Maupertuis (Maupertuis, Pierre-Louis Moreau de)'s principle of least action (c. 1744), which sought to explain all processes as driven by a demand that some property be economized or minimized. In particular, minimizing an integral, called an action integral, led several mathematicians (most notably the Italian-French Joseph-Louis Lagrange (Lagrange, Joseph-Louis, comte de l'Empire) in the 18th century and the Irish William Rowan Hamilton (Hamilton, Sir William Rowan) in the 19th century) to a teleological (teleology) explanation of Newton's laws of motion. Nevertheless, a general appreciation of the principle of least resistance came only with its use in the 1940s as a foundation for quantum electrodynamics.

      Applications of variational principles also occur in elasticity, electromagnetic theory (electromagnetism), aerodynamics, the theory of vibrations (vibration), and other areas in engineering and science.

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Universalium. 2010.

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