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In fluid dynamics, Hicks equation, sometimes also referred as Bragg–Hawthorne equation or Squire–Long equation, is a partial differential equation that describes the distribution of stream function for axisymmetric inviscid fluid, named after William Mitchinson Hicks, who derived it first in 1898.
16 lug 2021 · Topics. Coordinate system, Vector fields, Chirality, Fluid dynamics, Fluid flows, Laminar flows, Vortex dynamics. I. INTRODUCTION. Bragg–Hawthorne equation 1 (or “B–H equation” in short) plays a central role in the study of axisymmetric steady flow of incompressible ideal fluids.
He was born on 17 November 1923 to Lawrence Bragg, physicist, X-ray crystallographer and Nobel Prize winner for physics (1915) and his wife Alice Grace Jenny née Hopkinson. [2] He studied engineering at the University of Cambridge graduating with an BA in 1945 and an MA in 1949. He went on to study at the Massachusetts Institute of Technology ...
with cylindrical cyclones. The latter are derived from the equivalent Bragg-Hawthorne equation (BHE) expressed in cylindrical coordinates. This particular framework leads to di erent types of confined, axially-reversing vortex motions that can be used to model the cyclonic flowfield associated with the Vortex Combustion Cold Wall Chamber
Bragg–Hawthorne equation1 (or “B–Hequation” in short) plays a central role in the study of axisymmetric steady flow of incompress-ible ideal fluids. The solutions of this equation (and its equivalent equation in magnetohydrodynamics, i.e., the Grad–Shafranov equa-tion) can be applied to support a variety of research from hydrody-
- Ting Yi
- 2021
Some General Solutions for Linear Bragg‐Hawthorne Equation Ting Yi (tingyi.physics@gmail.com) Abstract: Linear cases of Bragg-Hawthorne equation for steady axisymmetric incompressible ideal flows are systematically discussed. The equation is converted to a more convenient form in spherical coordinate system.
1 ago 2007 · We discuss the incompressible stationary axisymmetric Euler equations with swirl, for which we derive via a scalar stream function an equivalent representation, the Bragg–Hawthorne equation [Bragg, S.L., Hawthorne, W.R., 1950. Some exact solutions of the flow through annular cascade actuator discs. J. Aero. Sci. 17, 243].
