Spectral triples and the geometry of fractals

Institut for Matematiske Fag

Spectral triples and the geometry of fractals

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Standard

Spectral triples and the geometry of fractals. / Christensen, Erik; Ivan, Cristina; Schroe, Elmar .

I: Journal of Noncommutative Geometry, Bind 6, 2012, s. 249 - 274.

Publikation: Bidrag til tidsskrift › Tidsskriftartikel › Forskning › fagfællebedømt

Harvard

Christensen, E, Ivan, C & Schroe, E 2012, 'Spectral triples and the geometry of fractals', Journal of Noncommutative Geometry, bind 6, s. 249 - 274.

APA

Christensen, E., Ivan, C., & Schroe, E. (2012). Spectral triples and the geometry of fractals. Journal of Noncommutative Geometry, 6, 249 - 274.

Vancouver

Christensen E, Ivan C, Schroe E. Spectral triples and the geometry of fractals. Journal of Noncommutative Geometry. 2012;6:249 - 274.

Author

Christensen, Erik ; Ivan, Cristina ; Schroe, Elmar . / Spectral triples and the geometry of fractals. I: Journal of Noncommutative Geometry. 2012 ; Bind 6. s. 249 - 274.

Bibtex

@article{8605d6a5a1934db189e6384319e2dccc,

title = "Spectral triples and the geometry of fractals",

abstract = "It is shown that one can construct a spectral triple for the Sierpinski gasket such that it represents any given K-homology class, On the other hand if the geodesic distance and the dimension has to be part of the data from the triple, there are certain restriction.",

author = "Erik Christensen and Cristina Ivan and Elmar Schroe",

year = "2012",

language = "English",

volume = "6",

pages = "249 -- 274",

journal = "Journal of Noncommutative Geometry",

issn = "1661-6952",

publisher = "European Mathematical Society Publishing House",

}

RIS

TY - JOUR

T1 - Spectral triples and the geometry of fractals

AU - Christensen, Erik

AU - Ivan, Cristina

AU - Schroe, Elmar

PY - 2012

Y1 - 2012

N2 - It is shown that one can construct a spectral triple for the Sierpinski gasket such that it represents any given K-homology class, On the other hand if the geodesic distance and the dimension has to be part of the data from the triple, there are certain restriction.

AB - It is shown that one can construct a spectral triple for the Sierpinski gasket such that it represents any given K-homology class, On the other hand if the geodesic distance and the dimension has to be part of the data from the triple, there are certain restriction.

M3 - Journal article

VL - 6

SP - 249

EP - 274

JO - Journal of Noncommutative Geometry

JF - Journal of Noncommutative Geometry

SN - 1661-6952

ER -

ID: 43210991