Abstract
AbstractWe deal with the orbit determination problem for hyperbolic maps. The problem consists in determining the initial conditions of an orbit and, eventually, other parameters of the model from some observations. We study the behaviour of the confidence region in the case of simultaneous increase in the number of observations and the time span over which they are performed. More precisely, we describe the geometry of the confidence region for the solution, distinguishing whether a parameter is added to the estimate of the initial conditions or not. We prove that the inclusion of a dynamical parameter causes a change in the rate of decay of the uncertainties, as suggested by some known numerical evidences.
Funder
Istituto Nazionale di Alta Matematica “Francesco Severi”
Publisher
Springer Science and Business Media LLC
Subject
Space and Planetary Science,Astronomy and Astrophysics,Applied Mathematics,Computational Mathematics,Mathematical Physics,Modeling and Simulation
Reference20 articles.
1. Barreira, L., Pesin, Y.: Introduction to smooth ergodic theory. Graduate Studies in Mathematics, 148. American Mathematical Society, Providence (2013)
2. Chirikov, B.: A universal instability of many-dimensional oscillator systems. Phys. Rep. 52, 263 (1979)
3. Celletti, A., Di Ruzza, S., Lothka, C., Stefanelli, L.: Nearly-integrable dissipative systems and celestial mechanics. Eur. Phys. J. Spec. Top. 186, 33–66 (2010)
4. Gauss, C.F.: Theoria motus corporum coelestium in sectionibus conicis solem ambientium (Theory of the motion of the heavenly bodies moving about the sun in conic sections). Dover publications (1809/1963)
5. Gronchi, G.F., Baù, G., Marò, S.: Orbit determination with the two-body integrals: III. Cel. Mech. Dyn. Ast. 123, 105–122 (2015)