On coverings of four-space by spheres

January 1960

acase@tulane.edu

Tulane University

Mathematics

Ph.D

On the isomorphism of the endomorphism rings of modules

January 1974

acase@tulane.edu

Tulane University

Mathematics

Ph.D

On invariant bilinear forms on finite-dimensional lie algebras

January 1984

The objective of this dissertation is to give a description of the non-degenerate invariant bilinear forms on finite-dimensional Lie algebras over fields of characteristic zero which do not generally arise as trace forms Chapter I provides the necessary background information on Lie algebras Chapter II introduces the notion of invariant bilinear forms, with special attention given to trace forms Chapter III is devoted to a general presentation of L-modules with a non-degenerate invariant bilinear form, particularly in relation to duality in the presence of a non-degenerate bilinear form. The first part of the chapter exploits the annihilator ideal in greater detail Chapter IV treats invariant bilinear forms on simple and semi-simple Lie algebras. For simple Lie algebras L, all non-zero invariant bilinear forms are non-degenerate and, if F is an algebraically closed field, every such form is an F-multiple of the Killing form (kappa) of L. It is shown that this result still holds if F is replaced by the field of real numbers Chapter V provides background information on nilpotent and solvable Lie algebras. Then it is shown that a solvable Lie algebra can carry a non-degenerate invariant bilinear form only if it is of a special type. The theory of ground ring extensions developed here will lead to a construction of nilpotent Lie algebras of arbitrary nilpotency class with a non-degenerate invariant bilinear form Chapter VI analyzes the structure of finite-dimension Lie algebras L over fields of characteristic zero with a non-degenerate invariant bilinear form. The results of this investigation lead to a description of the non-degenerate invariant bilinear forms on L / acase@tulane.edu

Tulane University

Mathematics

Ph.D

On the integral closure of function algebras

January 1972

acase@tulane.edu

Tulane University

Mathematics

Ph.D

On the existence and concentration of solutions to nonlinear Schroedinger equations

January 1995

What are the roles of two competing potential functions $V(x)$ and $K(x)$ in the process of concentration for ground state solutions of an elliptic equation $h\sp2\Delta u-V(x)u+ K(x)\vert u\vert\sp{p-1}u=0,x\in R\sp{n}$ arising in the study of standing wave solutions to nonlinear Schrodinger equations? This is the motivating question and one of the questions this dissertation answers. After a careful analysis of movement of the energy, the existence and concentration behaviors of ground states are established and an explicit formula for the concentration points are found. Then the variational methods are adapted to attack an equation with more general nonlinear terms. Similar results are obtained and two limiting situations are discussed On another direction, it is proved that positive bound states for nonlinear Schrodinger equations exist and these solutions can form sequences concentrating at each critical point of a so-called minimax value function under certain technical conditions. At the end, a necessary condition for concentration of positive bound states is given / acase@tulane.edu

Tulane University

Mathematics

Ph.D

On linearly ordered topological spaces

January 1964

acase@tulane.edu

Tulane University

Mathematics

Ph.D

On the structure of certain classes of topological semigroups

January 1961

acase@tulane.edu

Tulane University

Mathematics

Ph.D

The paradox of the reformed subjectivist principle in Whitehead's philosophy

January 1970

acase@tulane.edu

Tulane University

Philosophy

Ph.D

Ostracoda of the Central Louisiana continental shelf

January 1971

acase@tulane.edu

Tulane University

Geology

Ph.D

Pacifism in Greek and modern drama

January 1969

acase@tulane.edu

Tulane University

Theater

Ph.D