Ideals of the Lipschitz class

Author

Konstantin G. Kulev, University of Richmond

Date of Award

5-3-1996

Document Type

Thesis

Degree Name

Bachelor of Arts

Department

Mathematics

First Advisor

Dr. William T. Ross

Abstract

In this paper, a classification of the closed ideals of the Little Oh Lipschitz class of functions on the interval [0,1] is provided. The technique used to classify the ideals of the class of continuous functions is modified and applied to the Little Oh Lipschitz class. It is shown that every ideal of these two classes has the form I = {f : flE = 0} for some closed set E C [0, 1]. Furthermore, it is demonstrated that the same technique cannot be successfully applied to the classification of the closed ideals of the Big Oh Lipschitz class.

Recommended Citation

Kulev, Konstantin G., "Ideals of the Lipschitz class" (1996). Honors Theses. 592.
https://scholarship.richmond.edu/honors-theses/592