On the Geometry of the Caloger-Moser System
Publication date
2005
Authors
Couwenberg, W.
Heckman, G.
Looijenga, E.
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Document Type
Article
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Abstract
We discuss a special eigenstate of the quantized periodic Calogero-
Moser system associated to a root system. This state has the property that its
eigenfunctions, when regarded as multivalued functions on the space of regular
conjugacy classes in the corresponding semisimple complex Lie group, transform
under monodromy according to the complex reflection representation of
the affine Hecke algebra. We show that this endows the space of conjugacy
classes in question with a projective structure. For a certain parameter range this
projective structure underlies a complex hyperbolic structure. If in addition a
Schwarz type of integrality condition is satisfied, then it even has the structure of
a ball quotient minus a Heegner divisor. For example, the case of the root system
E8 with the triflection monodromy representation describes a special eigenstate
for the system of 12 unordered points on the projective line under a particular
constraint.