Mathematics of aperiodic order [Documento eletrónico] / edited by Johannes Kellendonk, Daniel Lenz, Jean Savinien.
- Basel : Springer Basel , 2015 .
- XII, 428 p. : il..
- (Progress in Mathematics)
. 309
What is order that is not based on simple repetition, that is, periodicity? How must atoms be arranged in a material so that it diffracts like a quasicrystal? How can we describe aperiodically ordered systems mathematically? Originally triggered by the – later Nobel prize-winning – discovery of quasicrystals, the investigation of aperiodic order has since become a well-established and rapidly evolving field of mathematical research with close ties to a surprising variety of branches of mathematics and physics. This book offers an overview of the state of the art in the field of aperiodic order, presented in carefully selected authoritative surveys. It is intended for non-experts with a general background in mathematics, theoretical physics or computer science, and offers a highly accessible source of first-hand information for all those interested in this rich and exciting field. Topics covered include the mathematical theory of diffraction, the dynamical systems of tilings or Delone sets, their cohomology and non-commutative geometry, the Pisot substitution conjecture, aperiodic Schrödinger operators, and connections to arithmetic number theory.
Clicar aqui para aceder a um recurso externo
ISBN 978-3-0348-0903-0
Grupos discretos
Sistemas dinâmicos diferenciais
Teoria dos operadores
Teoria dos números
Análise global (Matemática)
LCC QA639.5QA640.7
Clicar aqui para aceder a um recurso externo
ISBN 978-3-0348-0903-0
Grupos discretos
Sistemas dinâmicos diferenciais
Teoria dos operadores
Teoria dos números
Análise global (Matemática)
LCC QA639.5QA640.7
