Patterns in Fourier Space

Jürgen Scheurle

doi:10.1007/978-3-319-64173-7_2

Patterns in Fourier Space

Jürgen Scheurle

Department of Mathematics

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › peer-review

Abstract

In this article we study how symmetries (invariance properties with respect to appropriate group actions) of periodic and quasiperiodic functions on Rⁿ(n∈ N) manifest themselves as patterns in Fourier space, i.e. as specific relations between certain Fourier coefficients of such a function. This is motivated by the experimental method of X-ray diffraction in crystallography, by which the atomic structure within a crystal can be determined. Mathematically, this tool heavily relies on Fourier analysis. In fact, it (approximately) produces the Fourier expansion of the corresponding electron density distribution function. Our results confirm that especially certain symmetries of this function are detected in that way. The case of quasiperiodic functions is related to quasicrystals.

Original language	English
Title of host publication	Patterns of Dynamics - In Honour of Bernold Fiedler’s 60th Birthday
Editors	Pavel Gurevich, Juliette Hell, Arnd Scheel, Bjorn Sandstede
Publisher	Springer New York LLC
Pages	16-27
Number of pages	12
ISBN (Print)	9783319641720
DOIs	https://doi.org/10.1007/978-3-319-64173-7_2
State	Published - 2017
Event	Conference on Patterns of Dynamics held in honor of Bernold Fiedler’s 60th Birthday, 2016 - Berlin, Germany Duration: 25 Jul 2016 → 29 Jul 2016

Publication series

Name	Springer Proceedings in Mathematics and Statistics
Volume	205
ISSN (Print)	2194-1009
ISSN (Electronic)	2194-1017

Conference

Conference	Conference on Patterns of Dynamics held in honor of Bernold Fiedler’s 60th Birthday, 2016
Country/Territory	Germany
City	Berlin
Period	25/07/16 → 29/07/16

Keywords

Application of group representations in physics
Crystalline structure
Fourier coefficients and fourier series
Invariance and symmetry properties
Pattern recognition
Trigonometric series

Access to Document

10.1007/978-3-319-64173-7_2

Cite this

@inproceedings{afd169e61a2742b3bbc4ef4e78eb9d03,

title = "Patterns in Fourier Space",

abstract = "In this article we study how symmetries (invariance properties with respect to appropriate group actions) of periodic and quasiperiodic functions on Rn(n∈ N) manifest themselves as patterns in Fourier space, i.e. as specific relations between certain Fourier coefficients of such a function. This is motivated by the experimental method of X-ray diffraction in crystallography, by which the atomic structure within a crystal can be determined. Mathematically, this tool heavily relies on Fourier analysis. In fact, it (approximately) produces the Fourier expansion of the corresponding electron density distribution function. Our results confirm that especially certain symmetries of this function are detected in that way. The case of quasiperiodic functions is related to quasicrystals.",

keywords = "Application of group representations in physics, Crystalline structure, Fourier coefficients and fourier series, Invariance and symmetry properties, Pattern recognition, Trigonometric series",

author = "J{\"u}rgen Scheurle",

note = "Publisher Copyright: {\textcopyright} Springer International Publishing AG 2017.; Conference on Patterns of Dynamics held in honor of Bernold Fiedler{\textquoteright}s 60th Birthday, 2016 ; Conference date: 25-07-2016 Through 29-07-2016",

year = "2017",

doi = "10.1007/978-3-319-64173-7_2",

language = "English",

isbn = "9783319641720",

series = "Springer Proceedings in Mathematics and Statistics",

publisher = "Springer New York LLC",

pages = "16--27",

editor = "Pavel Gurevich and Juliette Hell and Arnd Scheel and Bjorn Sandstede",

booktitle = "Patterns of Dynamics - In Honour of Bernold Fiedler{\textquoteright}s 60th Birthday",

}

Scheurle, J 2017, Patterns in Fourier Space. in P Gurevich, J Hell, A Scheel & B Sandstede (eds), Patterns of Dynamics - In Honour of Bernold Fiedler’s 60th Birthday. Springer Proceedings in Mathematics and Statistics, vol. 205, Springer New York LLC, pp. 16-27, Conference on Patterns of Dynamics held in honor of Bernold Fiedler’s 60th Birthday, 2016, Berlin, Germany, 25/07/16. https://doi.org/10.1007/978-3-319-64173-7_2

Patterns in Fourier Space. / Scheurle, Jürgen.
Patterns of Dynamics - In Honour of Bernold Fiedler’s 60th Birthday. ed. / Pavel Gurevich; Juliette Hell; Arnd Scheel; Bjorn Sandstede. Springer New York LLC, 2017. p. 16-27 (Springer Proceedings in Mathematics and Statistics; Vol. 205).

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › peer-review

TY - GEN

T1 - Patterns in Fourier Space

AU - Scheurle, Jürgen

N1 - Publisher Copyright: © Springer International Publishing AG 2017.

PY - 2017

Y1 - 2017

N2 - In this article we study how symmetries (invariance properties with respect to appropriate group actions) of periodic and quasiperiodic functions on Rn(n∈ N) manifest themselves as patterns in Fourier space, i.e. as specific relations between certain Fourier coefficients of such a function. This is motivated by the experimental method of X-ray diffraction in crystallography, by which the atomic structure within a crystal can be determined. Mathematically, this tool heavily relies on Fourier analysis. In fact, it (approximately) produces the Fourier expansion of the corresponding electron density distribution function. Our results confirm that especially certain symmetries of this function are detected in that way. The case of quasiperiodic functions is related to quasicrystals.

AB - In this article we study how symmetries (invariance properties with respect to appropriate group actions) of periodic and quasiperiodic functions on Rn(n∈ N) manifest themselves as patterns in Fourier space, i.e. as specific relations between certain Fourier coefficients of such a function. This is motivated by the experimental method of X-ray diffraction in crystallography, by which the atomic structure within a crystal can be determined. Mathematically, this tool heavily relies on Fourier analysis. In fact, it (approximately) produces the Fourier expansion of the corresponding electron density distribution function. Our results confirm that especially certain symmetries of this function are detected in that way. The case of quasiperiodic functions is related to quasicrystals.

KW - Application of group representations in physics

KW - Crystalline structure

KW - Fourier coefficients and fourier series

KW - Invariance and symmetry properties

KW - Pattern recognition

KW - Trigonometric series

UR - http://www.scopus.com/inward/record.url?scp=85044474481&partnerID=8YFLogxK

U2 - 10.1007/978-3-319-64173-7_2

DO - 10.1007/978-3-319-64173-7_2

M3 - Conference contribution

AN - SCOPUS:85044474481

SN - 9783319641720

T3 - Springer Proceedings in Mathematics and Statistics

SP - 16

EP - 27

BT - Patterns of Dynamics - In Honour of Bernold Fiedler’s 60th Birthday

A2 - Gurevich, Pavel

A2 - Hell, Juliette

A2 - Scheel, Arnd

A2 - Sandstede, Bjorn

PB - Springer New York LLC

T2 - Conference on Patterns of Dynamics held in honor of Bernold Fiedler’s 60th Birthday, 2016

Y2 - 25 July 2016 through 29 July 2016

ER -

Patterns in Fourier Space

Abstract

Publication series

Conference

Keywords

Access to Document

Other files and links

Fingerprint

Cite this