Identyfikatory
Warianty tytułu
Konferencja
Junior European Meeting on Control and Optimization (2005 ; Białystok)
Języki publikacji
Abstrakty
Newton's problem of minimal resistance is one of the first problems of optimal control: it was proposed, and its solution given, by Isaac Newton in his masterful Principia Mathematica, in 1686. The problem consists of determining, in dimension three, the shape of an axis-symmetric body, with assigned radius and height, which offers minimum resistance when it is moving in a resistant medium. The problem has a very rich history and is well documented in the literature. Of course, at a first glance, one suspects that the two dimensional case should be well known. Nevertheless, we have looked into numerous references and asked at least as many experts on the problem, and we have not been able to identify a single source. Solution was always plausible to everyone who thought about the problem, and writing it down was always thought not to be worthwhile. Here we show that this is not the case: the two-dimensional problem is richer than the classical one, being, in some sense, more interesting. Novelties include: (i) while in the classical three-dimensional problem only the restricted case makes sense (without restriction on the monotonicity of admissible functions the problem does not admit a local minimum), we prove that in dimension two the unrestricted problem is also well-posed when the ratio of height versus radius of base is greater than a given quantity; (ii) while in three dimensions the (restricted) problem has a unique solution, we show that in the restricted two-dimensional problem the minimizer is not always unique - when the height of the body is less or equal than its base radius, there exists infinitely many minimizing functions.
Czasopismo
Rocznik
Tom
Strony
965--975
Opis fizyczny
Bibliogr. 18 poz.
Twórcy
autor
autor
- Department of Mathematics, University of Aveiro 3810-193 Aveiro, Portugal, cjoaosilva@mat.ua.pt
Bibliografia
- AZEVEDO DO AMARAL, I.M. (1913) Note sur la solution finie d’un problémc de Newton. Ann. Ac. Pol. Porto 8, 207-209.
- BELLONI, M. and KAWOHL, B. (1997) A paper of Legendre revisited. Forum Mathematicum 9, 655-668.
- BRYSON, A.E. and HO, YU CHI (1975) Applied Optimal Control. Hemisphere Publishing Corp. Washington, D.C.
- BUTTAZZO, G. and KAWOHL, B. (1993) On Newton's problem of minimal resistance. The Mathematical Intelligencer 15 (4), 7-12.
- COMTE, M. and LACHAND-ROBERT. T. (2001) Newton's problem of the body of minimal resistance under a single-impact assumption. Calc. Var. Partial Differential Equations 12 (2), 173-211.
- FENSKE, C.C. (2003) Extrema in case of several variables. The Mathematical Intelligencer 25 (1), 49-51.
- FRAEIJS DE VEUBEKE, B. (1966) Le probleme de Newton du solide de révolution présentant une trainée minimum. Acad. Roy. Belg. Bull. Cl. Sci. 52 (5), 171-182.
- HORSTMANN, D., KAWOHL, B. and VILLAGGIO, P. (2002) Newton’s aerodynamic problem in the presence of friction. NoDEA Nonlinear Differential Equations Appl. 9 (3), 295-307.
- KNESER, A., ZERMELO, E., HAHN, H. and LECAT, M. (1913) Probleme de Newton et questions analogues - Surfaces propulsives. Encyclopedic des sciences mathematiques pures et appliquees, Edition Franaise, Tome II, 6 (1), Calcul des variations, Paris: Gauthier Villars, Leipzig: B. G. Teubner, 243-250.
- PLAKHOV, A.YU. (2003) Newton's problem of the body of minimal aerodynamic resistance. Doklady of the Russian Academy of Sciences 390 (3), 1-4.
- PLAKHOV, A.YU. and TORRES, D.F.M. (2004) Two-dimensional problems of minimal resistance in a medium of positive temperature. Proceedings of the 6th Portuguese Conference on Automatic Control - Controlo, 488-493.
- PLAKHOV, A.YU. and TORRES, D.F.M. (2005) Newton's aerodynamic problem in media of chaotically moving particles. Sbornik: Mathematics 196 (6), 885-933.
- PONTRYAGIN, L.S., BOLTYANSKII, V.G., GAMKRELIDZE, R.V. and MISHCHENKO, E.F. (1962) The Mathematical Theory of Optimal Processes. Interscience Publishers John Wiley & Sons, Inc. New York-London.
- SILVA, C.J. (2005) Abordagens do Cálculo das Variações e Controlo Óptimo ao Problema de Newton de Resistência Mínima, M.Sc. thesis (supervisor: Delfim F. M. Torres), Univ. of Aveiro, Portugal.
- TIKHOMIROV, V.M. (1990) Stories about maxima and minima. American Mathematical Society, Providence, HI.
- TIKHOMIROV, V.M. (2002) Extremal problems - past and present. In: The Teaching of Mathematics 2, 59-69.
- TORRES, D.F.M. and PLAKHOV, A.Yu. (2006) Optimal control of Newton-type problems of minimal resistance. Rend. Semin. Mat. Univ. Politec. Torino 64 (1), 79-95.
- YOUNG, L.C. (1969) Lectures on the Calculus of Variations and Optimal Control Theory. W.B. Saunders Co., Philadelphia.
Typ dokumentu
Bibliografia
Identyfikator YADDA
bwmeta1.element.baztech-article-BAT5-0014-0032