Internal wave generation in uniformly stratified fluids. Part 2. Moving point sources
Abstract
The Green's function method is applied to the generation of internal gravity waves by a moving point mass source. Arbitrary motion of a source of arbitrary time dependence is treated using the impulsive Green's function, while 'classical' approaches of uniform motion of a steady or oscillatory source are recovered using the monochromatic Green's function. Waves have locally the structure of impulsive waves, emitted at the retarded time t(sub r) and having propagated with the group velocity; at each position and time an implicit equation defines t(sub r), in terms of which the waves are written. A source both oscillating and moving generates two systems of waves, with respectively positive and negative frequencies, and when oscillations vanish these systems merge into one. Three particular cases are considered: the uniform horizontal and vertical motions of a steady source, and the uniform horizontal motion of an oscillatory source. Waves spread downstream of the steady source. For the oscillatory source they can extend both upstream and downstream, depending on the ratio of the source frequency to the buoyancy frequency, and are contained inside conical wavefronts, parts of which are caustics. For horizontal motion, moreover, the steady analysis (based on the monochromatic Green's function) reveals the presence of two insignificant contributions overlooked by the unsteady analysis (based on the impulsive Green's function), but which for an extended source may become of the same order as the main contribution. Among those is an upstream columnar disturbance associated with blocking.
 Publication:

Journal of Fluid Mechanics
 Pub Date:
 February 1994
 DOI:
 10.1017/S0022112094000364
 Bibcode:
 1994JFM...261..333V
 Keywords:

 Gravity Waves;
 Green'S Functions;
 Internal Waves;
 Oscillations;
 Point Sources;
 Stratified Flow;
 Wave Generation;
 Frequencies;
 Group Velocity;
 Time Dependence;
 Wave Fronts;
 Physics (General)