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Access Type
WSU Access
Date of Award
January 2018
Degree Type
Dissertation
Degree Name
Ph.D.
Department
Mathematics
First Advisor
Robert R. Bruner
Abstract
We study the relationship between Euler classes in connective K-theory of certain metacyclic groups and Eulerian periods living in algebraic number fields. The division of these Euler classes living in connective K-Theory map into a subgroup of the cyclotomic units in the algebraic number fields. With the use of algebraic number theory we further the computations in connective K-theory for certain cases.
Recommended Citation
Keogh, Michael, "A Relationship Between Connective K-Theory Of Finite Groups And Number Theory" (2018). Wayne State University Dissertations. 2037.
https://digitalcommons.wayne.edu/oa_dissertations/2037