RESONANCE TRAPPING AND EVOLUTION OF PARTICLES SUBJECT TO POYNTING-ROBERTSON DRAG - ADIABATIC AND NONADIABATIC APPROACHES

被引：16

作者：

GOMES, RS

机构：

[1] Rua General José Cristino, Observatório Nacional, Rio de Janeiro, 20921-400, RJ

来源：

CELESTIAL MECHANICS & DYNAMICAL ASTRONOMY | 1995年 / 61卷 / 01期

关键词：

POYNTING-ROBERTSON DRAG; RESONANCE TRAPPING; EVOLUTION IN RESONANCE;

D O I：

10.1007/BF00051690

中图分类号：

P1 [天文学];

学科分类号：

0704 ;

摘要：

The problem of resonance trapping for particles subject to Poynting-Robertson drag is approached initially from an adiabatic regime theory. A simplified Hamiltonian system is presented for simple eccentricity-type resonances up to order 3, and expressions related to the trapping process are deduced. The fast dissipation provoked by Poynting-Robertson leads to the employment of a numerical approach for the computation of resonance capture probabilities, for particles in the size range of practical importance. Some aspects of the dynamical evolution of a particle after capture are noticed from results of numerical integrations. Analytical methods are used in order to confirm the numerical results.

引用

页码：97 / 113

页数：17

共 15 条

[1]

Beauge C., Ferraz-Mello S., Resonance Trapping in the Primordial Solar Nebula: the Case of Stoke's Drag Dissipation, Icarus, 103, pp. 301-318, (1993)

[2]

Borderies N., Goldreich P., A Simple Derivation of Capture Probabilities for the j + 1 : j and j + 2 : j Orbit-Orbit Resonance Problems, Celestial Mechanics, 32, pp. 127-136, (1984)

[3]

Burns J.A., Lamy P.L., Soter S., Radiation Forces on Small Particles in the Solar System, Icarus, 40, pp. 1-48, (1979)

[4]

Dermott S.F., Malhotra R., Murray C.D., Dynamics of the Uranian and Saturnian Satellite Systems: A Chaotic Route to Melting Miranda, Icarus, 76, pp. 295-334, (1988)

[5]

Gonczi R., Froeschle, Froeschle, Poynting-Robertson Drag and Orbital Resonance, Icarus, 51, pp. 633-654, (1982)

[6]

Grun E., Zook H.A., Fechtig H., Giese R.H., Collisional Balance of Meteoritic Complex, Icarus, 62, pp. 244-272, (1985)

[7]

Henrard J., Capture into Resonance: An Extension of the Use of Adiabatic Invariants, Celest. Mech., 27, pp. 3-22, (1982)

[8]

Henrard J., Lemaitre A., A Second Fundamental Model for Resonance, Celest. Mech., 30, pp. 197-218, (1983)

[9]

Jackson A.A., Zook H.A., A Solar System Dust Ring with the Earth as its Shepherd, Nature, 337, pp. 629-631, (1989)

[10]

Lemaitre A., High-Order Resonances in the Restricted Three-body Problem, Celest. Mech., 32, pp. 109-126, (1984)

← 1 2 →