The nonmonotonicity of solutions in swirling flow
Abstract
The paper studies a boundaryvalue problem arising from the behavior of a fluid occupying the region where the variable x is greater than or equal to zero and less than or equal to one, between two disks rotating about a common axis perpendicular to their planes. The differential equations describing the axially symmetric solutions of this problem are analyzed and the main theorem concerning these solutions is proved.
 Publication:

Proceedings of the Royal Society of Edinburgh
 Pub Date:
 1977
 Bibcode:
 1977RSEPS..76..161M
 Keywords:

 Boundary Value Problems;
 Fluid Dynamics;
 Monotone Functions;
 Rotating Disks;
 Swirling;
 Asymptotes;
 Axisymmetric Flow;
 Rotating Fluids;
 Fluid Mechanics and Heat Transfer