Abstract
Configurational conditions (Schließungsaussagen) of a noncommutative space will be developped from pairs (Δ,\(\tilde \Delta \)) of digraphs where Δ is a partial digraph of\(\tilde \Delta \). In this way we obtain an extensive generalization of Pfalzgraf 's q-simplex-conditions Simq.
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ANDRÉ, J. Endliche nichtkoinmutative Geometrie. Annales Universitatis Saraviensis, Ser.Math.,2, 1–136 (1988)
ANDRÉ, J. Non-commutative geometry and graphs. Topics in Combin. and Graph Theory, R. Bodendiek, R. Henn ed. Physica Verl., Heidelberg, 48–57 (1990)
ANDRÉ J. Non-comutative spaces with transitive translation groups. Geometriae Dedicata36, 125–137 (1990)
BRÜHL, D. Simplexaussagen. Diplomarbeit, Saarbrücken, 1988
CVETKOVIC, D.; DOOB, M.; SACHS, H. Spectra of graphs. Academic Press, New York, London, 1980
PFALZGRAF, J. On a model for non commutative geometric spaces. J. Geometry25, 147–163 (1986)
PFALZGRAF, J. A note on simplizes as geometric configurations. Arch. Math.49, 134–140 (1987)
PICKERT, G. Projektive Ebenen. Springer Verlag, Berlin, New York, 2. Aufl., 1975
WILSON, R. Introduction to graph theory. 2nd ed., London, 1979
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In Memoriam Hans Zassenhaus
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André, J. Configurational conditions and digraphs. J Geom 43, 22–29 (1992). https://doi.org/10.1007/BF01245939
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DOI: https://doi.org/10.1007/BF01245939