A condition concerning the existence of continuous solutions to Poisson's equation

Cook, Frederick Lee

12 1900

No description available.

Differential equations, Partial

Harmonic functions

Random harmonic functions and multivariate Gaussian estimates

Wei, Ang.

January 2009

Thesis (Ph.D.)--University of Delaware, 2009. / Principal faculty advisor: Wenbo Li, Dept. of Mathematical Sciences. Includes bibliographical references.

Generalized theory of asynchronous MMF harmonics in induction machines

Davis, James Harley,

January 1970

Thesis (Ph. D.)--University of Wisconsin--Madison, 1970. / Typescript. Vita. eContent provider-neutral record in process. Description based on print version record. Includes bibliographical references.

The downward continuation to the earth's surface of truncated spherical and ellipsoidal harmonic series of the gravity and height anomalies.

Jekeli, Christopher

January 1981

No description available.

Education

Gravity anomalies

Harmonic functions

Integral representation for multiply superharmonic functions.

Drinkwater, Anne Elizabeth

January 1972

No description available.

Harmonic functions

Linear topological spaces

Superharmonic and multiply superharmonic functions and Jensen measures in axiomatic Brelot spaces

Alakhrass, Mohammad

January 2009

No description available.

Axiomatic set theory.

Harmonic functions.

Characterizing the Geometry of a Random Point Cloud

Unknown Date

This thesis is composed of three main parts. Each chapter is concerned with characterizing some properties of a random ensemble or stochastic process. The properties of interest and the methods for investigating them di er between chapters. We begin by establishing some asymptotic results regarding zeros of random harmonic mappings, a topic of much interest to mathematicians and astrophysicists alike. We introduce a new model of harmonic polynomials based on the so-called "Weyl ensemble" of random analytic polynomials. Building on the work of Li and Wei [28] we obtain precise asymptotics for the average number of zeros of this model. The primary tools used in this section are the famous Kac-Rice formula as well as classical methods in the asymptotic analysis of integrals such as the Laplace method. Continuing, we characterize several topological properties of this model of harmonic polynomials. In chapter 3 we obtain experimental results concerning the number of connected components of the orientation-reversing region as well as the geometry of the distribution of zeros. The tools used in this section are primarily Monte Carlo estimation and topological data analysis (persistent homology). Simulations in this section are performed within MATLAB with the help of a computational homology software known as Perseus. While the results in this chapter are empirical rather than formal proofs, they lead to several enticing conjectures and open problems. Finally, in chapter 4 we address an industry problem in applied mathematics and machine learning. The analysis in this chapter implements similar techniques to those used in chapter 3. We analyze data obtained by observing CAN tra c. CAN (or Control Area Network) is a network for allowing micro-controllers inside of vehicles to communicate with each other. We propose and demonstrate the e ectiveness of an algorithm for detecting malicious tra c using an approach that discovers and exploits the natural geometry of the CAN surface and its relationship to random walk Markov chains. / Includes bibliography. / Dissertation (Ph.D.)--Florida Atlantic University, 2018. / FAU Electronic Theses and Dissertations Collection

Stochastic processes

Harmonic functions

Random point cloud

Separation of Laplace's equation

January 1948

R.M. Redheffer. / "June 2, 1948." "This report is a copy of a thesis ... submitted ... for the degree of Doctor of Philosophy in Mathematics at the Massachusetts Institute of Technology." / Bibliography: p. 88. / Army Signal Corps Contract No. W-36-039 sc-32037.

TK7855.M41 R43 no.68

Harmonic functions

On connections between univalent harmonic functions, symmetry groups, and minimal surfaces /

Taylor, Stephen M.,

January 2007

Thesis (M.S.)--Brigham Young University. Dept. of Mathematics, 2007. / Includes bibliographical references (p. 57-58).

A Fatou- type theorem for harmonic functions on symmetric spaces

Helgason, S., Koranyi, A.

January 1968

First published in the Bulletin of the American Mathematical Society in Vol.74, 1968, published by the American Mathematical Society

harmonic functions

symmetric spaces

Fatou-type theorem