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On Valuations, the Characteristic Polynomial, and Complex Subspace Arrangements

โœ Scribed by Richard Ehrenborg; Margaret A. Readdy

Publisher
Elsevier Science
Year
1998
Tongue
English
Weight
203 KB
Volume
134
Category
Article
ISSN
0001-8708

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โœฆ Synopsis

We present a new combinatorial method to determine the characteristic polynomial of any subspace arrangement that is defined over an infinite field, generalizing the work of Blass and Sagan. Our methods stem from the theory of valuations and Groemer's integral theorem. As a corollary of our main theorem, we obtain a result of Zaslavsky about the number of chambers of a real hyperplane arrangement. The examples we consider include a family of complex subspace arrangements, which we call the divisor Dowling arrangement, whose intersection lattice generalizes that of the Dowling lattice. We also determine the characteristic polynomial of interpolations between subarrangements of the divisor Dowling arrangement, generalizing the work of Jo zefiak and Sagan.

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