LEADER 00000cam a22006017i 4500 
001    ocn859756012 
003    OCoLC 
005    20180214124536.0 
008    131231m20139999enka     b    001 0 eng d 
010      2013444137 
015    GBB363663|2bnb 
016 7  016456838|2Uk 
019    858090975|a869900261 
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020    0521869919|q(v. 1 ;|qhardback) 
020    9780521869928|q(v. 2 ;|qhardback) 
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035    (OCoLC)859756012|z(OCoLC)858090975|z(OCoLC)869900261 
040    StDuBDS|beng|erda|cDLC|dCUD|dUKMGB|dRID|dCUI|dOIP|dHLS
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042    lccopycat 
049    RIDM 
050 00 QA640.72|b.B33 2013 
082 04 548.7|223 
090    QA640.72 .B33 2013 
100 1  Baake, Michael,|0https://id.loc.gov/authorities/names/
       n95079567|eauthor. 
245 10 Aperiodic order /|cMichael Baake, Universität Bielefeld, 
       Germany, Uwe Grimm, the Open University, Milton Keynes. 
264  1 Cambridge ;|aNew York :|bCambridge University Press,|c2013
       - 
300    volumes :|billustrations (some colour) ;|c24 cm. 
336    text|btxt|2rdacontent 
337    unmediated|bn|2rdamedia 
338    volume|bnc|2rdacarrier 
490 1  Encyclopedia of mathematics and its applications ;|v149- 
504    Includes bibliographical references (pages 489-516) and 
       index. 
505 00 |gVolume 1.|tA mathematical invitation --|gVolume 2.
       |tCrystallography and almost periodicity. 
520    "Quasicrystals are non-periodic solids that were 
       discovered in 1982 by Dan Shechtman, Nobel Prize Laureate 
       in Chemistry 2011. The underlying mathematics, known as 
       the theory of aperiodic order, is the subject of this 
       comprehensive multi-volume series. This first volume 
       provides a graduate-level introduction to the many facets 
       of this relatively new area of mathematics. Special 
       attention is given to methods from algebra, discrete 
       geometry and harmonic analysis, while the main focus is on
       topics motivated by physics and crystallography. In 
       particular, the authors provide a systematic exposition of
       the mathematical theory of kinematic diffraction. Numerous
       illustrations and worked-out examples help the reader to 
       bridge the gap between theory and application. The authors
       also point to more advanced topics to show how the theory 
       interacts with other areas of pure and applied 
       mathematics"--Publisher description. 
650  0 Aperiodic tilings.|0https://id.loc.gov/authorities/
       subjects/sh2002004448 
650  0 Quasicrystals|0https://id.loc.gov/authorities/subjects/
       sh90003929|xMathematics.|0https://id.loc.gov/authorities/
       subjects/sh2002007922 
650  7 Aperiodic tilings.|2fast|0https://id.worldcat.org/fast/
       811242 
650  7 Quasicrystals.|2fast|0https://id.worldcat.org/fast/1085482
650  7 Mathematics.|2fast|0https://id.worldcat.org/fast/1012163 
700 1  Grimm, Uwe,|0https://id.loc.gov/authorities/names/
       no95035019|eauthor. 
830  0 Encyclopedia of mathematics and its applications ;|0https:
       //id.loc.gov/authorities/names/n42010632|vv. 149. 
830  0 Encyclopedia of mathematics and its applications ;|0https:
       //id.loc.gov/authorities/names/n42010632|vv. 166. 
901    MARCIVE 20231220 
935    590044 
948    |d20180926|clti|tlti-aex 
948    |d20180214|cMH|tconsult add vol|lridm 
948    |d20131107|cMH|tconsult 520 enrich mfhd|lridm|v1 
994    C0|bRID