Acta Mathematica Hungarica

September 1989, Volume 53, Issue 3–4, pp 253–262 | Cite as

On a class of problems on covering of a bounded set

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• S. V. Yakovlev

Article

Received: 17 December 1985

Revised: 15 January 1988

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References

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   G. Fejes Tóth, New results in the theory of packing and covering, inConvexity and its applications, Ed. s P. M. Gruber, J. M. Wills, Birkhäuser Verlag (Basel-Boston-Stuttgart, 1983).Google Scholar
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   L. Fejes Tóth,Regular figures, Pergamon Press (Oxford-London-New York-Paris, 1964).Google Scholar
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   Yu. G. Stoyan,The packing of geometrical objects, Naukova dumka (Kiev, 1975) (in Russian).Google Scholar
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   Yu, G. Stoyan, Mathematical methods for geometric design, inAdvances in CAD/CAM: Proc. PROLAMAT 82 (Amsterdam-New York-Oxford, 1983), pp. 67–86.Google Scholar
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   Yu. G. Stoyan and S. V. Yakovlev,Mathematical models and optimization methods for geometrical design, Naukova dumka (Kiev, 1986) (in Russian).Google Scholar

Copyright information

© Akadémia Kiadó 1989

Authors and Affiliations

• S. V. Yakovlev
  • 1

1. 1.Т. харьковCCCP