Construction of pointwise bounds for solutions of the problem of flow on a uniformly heated moving continuous flat surface
Abstract
The steady, twodimensional, boundary layer flow on a uniformly heated continuous flat surface moving with a constant velocity in a fluid medium at rest is discussed. Upper and lower bounds for the velocity and temperature fields are constructed by the use of a monotonicity theorem. Bounds for the shearing stress, temperature gradient at the surface, displacement thickness and momentum thickness are also obtained.
 Publication:

Journal of Mathematical and Physical Sciences
 Pub Date:
 February 1982
 Bibcode:
 1982JMPS...16...29R
 Keywords:

 Boundary Layer Flow;
 Computational Fluid Dynamics;
 Flat Plates;
 Steady Flow;
 Two Dimensional Flow;
 Boundary Value Problems;
 Flow Theory;
 Flow Velocity;
 Shear Stress;
 Temperature Gradients;
 Velocity Distribution;
 Fluid Mechanics and Heat Transfer