Russian Academy of Science Institute for Problem in Mechanics Roman N. Bardakov

1. Russian Academy of Science Institute for Problem in Mechanics Roman N. Bardakov Internal wave generation problem exact analytical and numerical solution

2. Basic set of equations Boundary conditions

3. Navier-Stokes equation for stream function Boundary conditions

4. Dispersion equation Exact solution for stream function

5. Velocity absolutevalue L = 1 cm, plate movingspeedU = 0.25 cm/s,buoyancy periodTb = 14 s. (Fr =U/LN =0.55, Re =UL/n=25, l=UTb=3.5 cm).

6. Vertical component of velocity L = 1 cm, plate moving speed U = 0.25 cm/s, buoyancy period Tb = 14 s. (Fr = U/LN =0.55, Re =UL/n=25, l= UTb =3.5 cm).

8. Stream lines (N = 0.45 s-1, U=0.25 cm/sl=UTb=3.5 cm,L=4 cm, Fr = 0.14)

9. Absolutevalue (left) and horizontal component (right) of velocity boundary layer (U = 1 cm/s, L= 4 cm, Fr = 0.56, Re = 400, N = 0.45 s-1,   l = UTb = 14 cm).

10. Vertical component of velocity boundary layer (U = 1 cm/s, L= 4 cm, Fr = 0.56, Re = 400, N = 0.45 s-1,   l = UTb = 14 cm).

11. =7.5 с, =0.11 см, =20 см, =2.6

12. Vertical component of velocity (N = 0.45 s-1, U=0.25 cm/s, l=UTb= 3.5 cm, Fr = 0.014, Re = 1000)

13. Absolutevalue and vertical component of velocity. (N = 1 s-1, Tb = 6 s, U=0.01 cm/s, l =UTb=0.06 cm, L=1 cm, Fr = 0.01, Re = 1)

14. Comparing with experimental results

15. Comparing with experimental results