Geodesics on the extended Siegel-Jacobi upper half-plane
Abstract
The semidirect product of the real Heisenberg group H1(R) with SL(2,R), called the real Jacobi group GJ1(R), admits a four-parameter invariant metric expressed in the S-coordinates. We determine the geodesic equations on the extended Siegel--Jacobi upper half-plane XJ1 =GJ1()SO(2)≈XJ1×R≈ X1 ×R3, where XJ1 (X1) denotes the Siegel-Jacobi upper half-plane (respectively Siegel upper half-plane). Equating successively with zero the values of the three parameters in the geodesic equations on XJ1, we get the geodesic equations on XJ1, X1 and H1(R).
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