R-matrix for a geodesic flow associated with a new integrable peakon equation
Abstract
We use the r-matrix formulation to show the integrability of geodesic flow on an N-dimensional space with coordinates qk, with k=1,...,N, equipped with the co-metric gij=e-|qi-qj|(2-e-|qi-qj|). This flow is generated by a symmetry of the integrable partial differential equation (pde) mt+umx+3mux=0, m=u-α2uxx ( is a constant). This equation -- called the Degasperis-Procesi (DP) equation -- was recently proven to be completely integrable and possess peakon solutions by Degasperis, Holm and Hone (DHH[2002]). The isospectral eigenvalue problem associated with the integrable DP equation is used to find a new L-matrix, called the Lax matrix, for the geodesic dynamical flow. By employing this Lax matrix we obtain the r-matrix for the integrable geodesic flow.
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