Publication Date
7-12-2014
Abstract
A remarkable and special Galois Theory appears from the study of the arithmetic analogue of ordinary differential equations; where functions are replaced by integers, the derivative operator replaced by the Fermat quotient operator' and differential equations are replaced by arithmetic differential equations. The main result presented in the thesis will be the study of a very special class of arithmetic subgroups of GL_n. We also introduce a set of functions, that we call Leibniz systems. These functions 'generate' some examples of the differential subgroups of GL_n. As a by-product we found more analogies between the ordinary differential operator and the Fermat quotient operator, such as the chain rule and the product rule.
Degree Name
Mathematics
Level of Degree
Doctoral
Department Name
Mathematics & Statistics
First Committee Member (Chair)
Alexandru Buium
Second Committee Member
Charles Boyer
Third Committee Member
Janet Vassilev
Fourth Committee Member
Lance Miller
Language
English
Keywords
Arihmetic differential Subgroups og GL_{n}
Document Type
Dissertation
Recommended Citation
Heras-Llanos, Alfonso E.. "Arithmetic Differential Subgroups of GL_{n}." (2014). https://digitalrepository.unm.edu/math_etds/19
