Integral binary Hamiltonian forms and their waterworlds
Parkkonen, J., & Paulin, F. (2021). Integral binary Hamiltonian forms and their waterworlds. Conformal Geometry and Dynamics, 25(7), 126-169. https://doi.org/10.1090/ecgd/362
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Conformal Geometry and DynamicsDate
2021Discipline
MatematiikkaAnalyysin ja dynamiikan tutkimuksen huippuyksikköMathematicsAnalysis and Dynamics Research (Centre of Excellence)Copyright
© Authors 2021
We give a graphical theory of integral indefinite binary Hamiltonian forms f analogous to the one by Conway for binary quadratic forms and the one of Bestvina-Savin for binary Hermitian forms. Given a maximal order O in a definite quaternion algebra over Q, we define the waterworld of f, analogous to Conway's river and Bestvina-Savin's ocean, and use it to give a combinatorial description of the values of f on O×O. We use an appropriate normalisation of Busemann distances to the cusps (with an algebraic description given in an independent appendix), and the SL2(O)-equivariant Ford-Voronoi cellulation of the real hyperbolic 5-space.
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American Mathematical Society (AMS)ISSN Search the Publication Forum
1088-4173Keywords
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This work was supported by the French-Finnish CNRS grant PICS No. 6950. The second author greatly acknowledges the financial support of Warwick University for a one month stay, decisive for the writing of this paper.License
Except where otherwise noted, this item's license is described as In Copyright