A continental shelf bottom boundary layer model the effects of waves, currents, and a movable bed /

Glenn, Scott Michael.

January 1983

Thesis (Sc. D.)--Massachusetts Institute of Technology, Dept. of Ocean Engineering, 1983. / Supervised by William D. Grant. Includes bibliographical references (leaves 201-205).

Rotating and stratified fluids /

Chilakamarri, Kiran Babu

January 1988

No description available.

Physics

Rotating masses of fluid

Stratified flow

Study of abrupt transitions in two-dimensional ideal flows :

Kravchuk, Sergiy.

Unknown Date

The purpose of this research is the development of a method for studying a two-dimensional semi-linear elliptic partial differential equation in an infinite stripe with slow variations of one of the boundaries. The problem is reformulated as a boundary value problem for a semi-linear elliptic equation with a small parameter at one higher derivative (the singular perturbation parameter). The method is based on the boundary function of Tikhonov, shaped by Vasil'eva and Butuzov for a one-dimensional case. The developed method has clear parallels with the one-dimensional boundary function method. / Thesis (PhD)--University of South Australia, 2006.

Fluid dynamics

Stratified flow.

Boundary layer.

Axial flow.

Study of abrupt transitions in two-dimensional ideal flows: a singular perturbation approach

Kravchuk, Sergiy

January 2006

The purpose of this research is the development of a method for studying a two-dimensional semi-linear elliptic partial differential equation in an infinite stripe with slow variations of one of the boundaries. The problem is reformulated as a boundary value problem for a semi-linear elliptic equation with a small parameter at one higher derivative (the singular perturbation parameter). The method is based on the boundary function of Tikhonov, shaped by Vasil?eva and Butuzov for a one-dimensional case. The developed method has clear parallels with the one-dimensional boundary function method.

Fluid dynamics

Stratified flow

Boundary layer

Axial flow

The use of inverse methods in the study of reservoir dynamics and water quality /

Anohin, Vadim V.

January 2006

Thesis (Ph.D.)--University of Western Australia, 2006.

Observations of energy transfer mechanisms associated with internal waves /

Gómez Giraldo, Evelio Andrés.

January 2007

Thesis (Ph.D.)--University of Western Australia, 2007.

Interpretation of ice sheet stratigraphy : a radio-echo sounding study of the Dyer Plateau, Antarctica /

Weertman, Bruce Randall.

January 1993

Thesis (Ph. D.)--University of Washington, 1993. / Vita. Includes bibliographical references (leaves [131]-137).

Mixing dynamics in the Delaware Bay and adjacent shelf

Rice, Ana E.

January 2009

Thesis (Ph.D.)--University of Delaware, 2009. / Principal faculty advisor: A.D. Kirwan, College of Earth, Ocean, & Environment. Includes bibliographical references.

A numerical study of conjugate flows and flat-centred internal solitary waves in an continuously stratified fluid /

Wan, Bangjun,

January 1997

Thesis (M. Sc.)--Memorial University of Newfoundland, 1997. / Bibliography: leaves 106-112.

Selective withdrawal of a linearly stratified fluid in a triangular reservoir

Hnidei, Stephen D.

January 1990

The water in most reservoirs is density stratified with depth. This stratification leads to the inhibition of vertical movement, consequently, when water is withdrawn from the reservoir it tends to move in a jet-like layer called a withdrawal layer, towards the sink. By placing the sink at a certain depth, one is able to selectively withdrawal water from a limited range of depths and thus obtain water of a desired quality. Much work has been done in this field by considering a simplified boundary geometry, usually rectangular. However little attention has been given to the effects of accurate boundary geometry. For this thesis, five numerical experiments were conducted for the problem of a two-dimensional, viscous, incompressible, slightly-stratified flow towards a sink in a triangular reservoir. / Science, Faculty of / Mathematics, Department of / Graduate

Water withdrawals -- Mathematical models

Stratified flow -- Mathematical models