Search
Now showing items 31-40 of 140
Tensor product of semigroups /
(The University of Oklahoma., 1968)
Existence and continuation properties of solutions of a non-linear Volterra integral equation /
(The University of Oklahoma., 1974)
Webs for Type Q Lie Superalgebras
(2017-12-15)
In the first part of this dissertation, we construct a monoidal supercategory whose morphism spaces are spanned by equivalence classes of diagrams called oriented type Q webs, modulo certain relations. We then prove a ...
A comparison study between a traditional and experimental first year linear algebra program.
(2001)
The traditional section was in lecture format whereas the experimental section was in mostly discovery format; Students in the experimental group discovered definitions of basic abstract concepts mostly through visual-based ...
Extensional Maps
(2014-05-09)
In a recent paper, Ziga Virk defined a type of continuous map which preserves extension properties. We generalize this notion and call such maps extensional maps. In this paper we will establish many of the basic properties ...
Mathematical model of flow of fluid in porous media.
(1997)
In this dissertation, we investigate the flow of fluid in porous media. The mathematical drainage models are developed in a domain that is partitioned into a saturated portion and a unsaturated portion. The boundary value ...
Deformations of simple representations of two-generator HNN extensions.
(2002)
This thesis demonstrates the existence of simple representations in any dimension of a specific collection of Baumslag-Solitar groups, BS (m, n), and investigates their deformations. Specifically, the dimension of the ...
Formulation of static and dynamic layered beam systems with an inverse problem.
(2001)
Mathematical models are developed to examine the interfaces of horizontally-layered beam systems. The application examined is that of concrete road overlays. We are particularly interested in how the normal displacement ...
Integration theory in a Banach space and applications to generalized differential equations /
(The University of Oklahoma., 1971)