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This article is cited in 17 scientific papers (total in 17 papers)
Scattering in billiards and problems of Newtonian aerodynamics
A. Yu. Plakhovab a University of Aveiro
b Aberystwyth University
Abstract:
This paper contains results relating to billiards and their applications to various resistance optimization problems generalizing Newton's aerodynamic problem. The results can be divided into three groups. First, minimum resistance problems for bodies moving translationally in a highly rarefied medium are considered. It is shown that generically the infimum of the resistance is zero, that is, there are almost ‘perfectly streamlined’ bodies. Second, a rough body is defined and results on characterization of billiard scattering on non-convex and rough bodies are presented. Third, these results are used to reduce some problems on minimum and maximum resistance of moving and slowly rotating bodies to special problems on optimal mass transfer, which are then explicitly solved. In particular, the resistance of a 3-dimensional convex body can be at most doubled or at most reduced by 3.05% by grooving its surface.
Bibliography: 27 titles.
Keywords:
billiards, scattering, Newton's aerodynamic problem, optimal mass transfer, free molecular flow, rough body.
Received: 07.06.2009
Citation:
A. Yu. Plakhov, “Scattering in billiards and problems of Newtonian aerodynamics”, Russian Math. Surveys, 64:5 (2009), 873–938
Linking options:
https://www.mathnet.ru/eng/rm9308https://doi.org/10.1070/RM2009v064n05ABEH004642 https://www.mathnet.ru/eng/rm/v64/i5/p97
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