03515nam 22006612 450 991045759270332120151005020622.01-107-14381-01-280-54104-097866105410410-511-21509-60-511-21688-20-511-21151-10-511-31556-20-511-54658-00-511-21328-X(CKB)1000000000353923(EBL)266523(OCoLC)171139070(SSID)ssj0000155287(PQKBManifestationID)11147251(PQKBTitleCode)TC0000155287(PQKBWorkID)10112902(PQKB)11600325(UkCbUP)CR9780511546587(MiAaPQ)EBC266523(Au-PeEL)EBL266523(CaPaEBR)ebr10131733(CaONFJC)MIL54104(OCoLC)173610096(EXLCZ)99100000000035392320090508d2004|||| uy| 0engur|||||||||||txtrdacontentcrdamediacrrdacarrierFinite packing and covering /Károly Böröczky, Jr[electronic resource]Cambridge :Cambridge University Press,2004.1 online resource (xvii, 380 pages) digital, PDF file(s)Cambridge tracts in mathematics ;154Title from publisher's bibliographic system (viewed on 05 Oct 2015).0-521-80157-5 Includes bibliographical references (p. 357-377) and index.. Background --Part I.Arrangements in Two Dimensions: --gCongruent domains in the Euclidean plane --2.Translative arrangements --3.Parametric density --4.Packings of circular discs --5.Coverings by circular discs --Part II.Arrangements in Higher Dimensions --6.Packings and coverings by spherical balls --7.Congruent convex bodies --8.Packings and coverings by unit balls --9.Translative arrangements --10.Parametric density.Finite arrangements of convex bodies were intensively investigated in the second half of the 20th century. Connections to many other subjects were made, including crystallography, the local theory of Banach spaces, and combinatorial optimisation. This book, the first one dedicated solely to the subject, provides an in-depth state-of-the-art discussion of the theory of finite packings and coverings by convex bodies. It contains various new results and arguments, besides collecting those scattered around in the literature, and provides a comprehensive treatment of problems whose interplay was not clearly understood before. In order to make the material more accessible, each chapter is essentially independent, and two-dimensional and higher-dimensional arrangements are discussed separately. Arrangements of congruent convex bodies in Euclidean space are discussed, and the density of finite packing and covering by balls in Euclidean, spherical and hyperbolic spaces is considered.Cambridge tracts in mathematics ;154.Finite Packing & CoveringCombinatorial packing and coveringCombinatorial packing and covering.511/.6Böröczky K.1048981UkCbUPUkCbUPBOOK9910457592703321Finite packing and covering2477648UNINA