| dc.description |
In semiclassical theories for chaotic systems, such as Gutzwiller's periodic orbit theory, the energy eigenvalues and resonances are obtained as poles of a non-convergent series . We present a general method for the analytic continuation of such a non-convergent series by harmonic inversion of the `time' signal, which is the Fourier transform of g(w). We demonstrate the general applicability and accuracy of the method on two different systems with completely different properties: the Riemann zeta function and the three-disk scattering system. The Riemann zeta function serves as a mathematical model for a bound system. We demonstrate that the method of harmonic inversion by filter-diagonalization yields several thousand zeros of the zeta function to about 12 digit precision as eigenvalues of small matrices. However, the method is not restricted to bound and ergodic systems, and does not require the knowledge of the mean staircase function, i.e. the Weyl term in dynamical systems, which is a prerequisite in many semiclassical quantization conditions. It can therefore be applied to open systems as well. We demonstrate this on the three-disk scattering system, as a physical example. The general applicability of the method is emphasized by the fact that one does not have to resort to a symbolic dynamics, which is, in turn, the basic requirement for the application of cycle expansion techniques. |
