The diagram lattice as structural principle in mathematics

Kerber, Adalbert

doi:10.1007/3-540-08848-2_4

The diagram lattice as structural principle in mathematics

Adalbert Kerber¹

Invited Lectures
Conference paper
First Online: 01 January 2005

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3 Citations

Part of the book series: Lecture Notes in Physics ((LNP,volume 79))

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References

E. Ruch/A. Schönhofer: Theorie der Chiralitätsfunktionen. Theor. Chim. Acta 19 (1970), 225–287.
Google Scholar
T. Brylawski: The lattice of integer partitions. Discrete Math. 6 (1973), 201–209.
Google Scholar
C. Berge:Graphs and Hypergraphs. North-Holland Publishing Company 1973.
Google Scholar
C.W. Curtis/I. Reiner: Representation theory of finite groups and associative algebras. Interscience Publishers, New York 1962.
Google Scholar
A.J. Coleman: Induced representations with applications to S_n and GL(_n). Lecture Notes prepared by C.J. Bradley. Queen's Papers in Pure and Applied Mathematics, no. 4. Queen's University, Kingston, Ontario, 1966.
Google Scholar
H.J. Ryser: Combinatorial Mathematics. Wiley, New York 1963.
Google Scholar
H.-R. Halder/W. Heise: Einführung in die Kombinatorik. Hanser, München, 1976.
Google Scholar
E. Snapper:Group characters and nonnegative integral matrices. J. Algebra 19 (1971), 520–535.
Google Scholar
R.A. Liebler/M.R. Vitale: Ordering the partition characters of the symmetric group. J. Algebra 25 (1973), 487–489.
Google Scholar
S. J. Mayer: On the irreducible characters of the symmetric group. Advances in Math. 15 (1975), 127–132.
Google Scholar
A. Mead: Symmetry and Chirality. Topics in Current Chemistry, vol. 49. Springer, Berlin, 1974.
Google Scholar
A. Kerber: Representations of Permutation Groups I. Lecture Notes in Math., vol. 240, Springer, Berlin, 1971.
Google Scholar
A. Kerber: Representations of Permutation Groups II. Lecture Notes in Math., vol. 495, Springer, Berlin, 1975.
Google Scholar
J.S. Lomont: Applications of finite groups. Academic Press, New York 1959.
Google Scholar
D. Kinch/L. Geissinger: Representations of the hyperoctahedral groups.(in preparation)
Google Scholar
S.J. Mayer: On the characters of Weyl groups of type C. J. Algebra 33 (1975), 59–67.
Google Scholar
A. Kerber/J. Tappe: On permutation characters of wreath products. Discrete Math. 15 (1976), 151–161.
Google Scholar
A. Kerber: Zur Theorie der M-Gruppen. Math. Z. 115 (1970), 4–6.
Google Scholar
F. Sänger: Einige Charakterentafeln von Symmetrien symmetrischer Gruppen. Mitt. math. Sem. Univ. Giessen 98 (1973), 21–38.
Google Scholar
B. Gretschel/A. Hilge: Berechnung der Charakterentafeln von Symmetrien symmetrischer Gruppen. Diplomarbeiten, Giessen 1973.
Google Scholar
A. Mead/E. Ruch/A. Schönhofer: Theory of Chirality Functions, Generalized for Molecules with chiral Ligands. Theor. Chim. Acta 29 (1973), 269–304.
Google Scholar

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Lehrstuhl D für Mathematik, Rhein.-Westf. Techn. Hochschule, 51, Aachen, Germany
Adalbert Kerber

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Adalbert Kerber
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P. Kramer A. Rieckers

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Kerber, A. (1978). The diagram lattice as structural principle in mathematics. In: Kramer, P., Rieckers, A. (eds) Group Theoretical Methods in Physics. Lecture Notes in Physics, vol 79. Springer, Berlin, Heidelberg. https://doi.org/10.1007/3-540-08848-2_4

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DOI: https://doi.org/10.1007/3-540-08848-2_4
Published: 09 July 2005
Publisher Name: Springer, Berlin, Heidelberg
Print ISBN: 978-3-540-08848-6
Online ISBN: 978-3-540-35813-8
eBook Packages: Springer Book Archive

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