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Aperiodic order. edited by ...
Quasicrystals are non-periodic solids that were discovered in 1982 by Dan Shechtman, Nobel Prize Laureate in Chemistry 2011. The mathematics that underlies this discovery or that proceeded from it, known as the theory of Aperiodic Order, is the subject of this comprehensive multi-volume series. This second volume begins to develop the theory in more depth. A collection of leading experts, among them Robert V. Moody, cover various aspects of crystallography, generalising appropriately from the classical case to the setting of aperiodically ordered structures. A strong focus is placed upon almost periodicity, a central concept of crystallography that captures the coherent repetition of local motifs or patterns, and its close links to Fourier analysis. The book opens with a foreword by Jeffrey C. Lagarias on the wider mathematical perspective and closes with an epilogue on the emergence of quasicrystals, written by Peter Kramer, one of the founders of the field
Monografía
monografia Rebiun32129850 https://catalogo.rebiun.org/rebiun/record/Rebiun32129850 m o d cr |n||||||||| 171201s2017 enka o 000 0 eng d 1011515223 1019969731 1037746181 1127281873 1108514499 electronic bk.) 9781108514491 electronic bk.) 0521869927 1139033867 9781139033862 9780521869928 hardback) AU@ 000062882320 1051907 MIL IDEBK eng pn IDEBK YDX N$T COO CNO OCLCQ OCLCO OCLCF NETUE U3W OTZ OCLCQ OCLCO SCI 016000 bisacsh Aperiodic order. Volume 2 Crystallography and almost periodicity edited by Michael Baake, Uwe Grimm Crystallography and almost periodicity Cambridge Cambridge University Press 2017 Cambridge Cambridge Cambridge University Press 1 online resource illustrations 1 online resource Text txt rdacontent computer c rdamedia online resource cr rdacarrier Encyclopedia of mathematics and its applications 166 Quasicrystals are non-periodic solids that were discovered in 1982 by Dan Shechtman, Nobel Prize Laureate in Chemistry 2011. The mathematics that underlies this discovery or that proceeded from it, known as the theory of Aperiodic Order, is the subject of this comprehensive multi-volume series. This second volume begins to develop the theory in more depth. A collection of leading experts, among them Robert V. Moody, cover various aspects of crystallography, generalising appropriately from the classical case to the setting of aperiodically ordered structures. A strong focus is placed upon almost periodicity, a central concept of crystallography that captures the coherent repetition of local motifs or patterns, and its close links to Fourier analysis. The book opens with a foreword by Jeffrey C. Lagarias on the wider mathematical perspective and closes with an epilogue on the emergence of quasicrystals, written by Peter Kramer, one of the founders of the field Aperiodic tilings Quasicrystals- Mathematics Crystallography Cycles Pavages apériodiques Quasicristaux- Mathématiques Cristallographie Cycles SCIENCE- Physics- Crystallography Aperiodic tilings Crystallography Cycles Electronic books Baake, Michael Grimm, Uwe Print version 9780521869928 Encyclopedia of mathematics and its applications 166