Education, Licensure and Certification
Ph.D.
Oklahoma State University
Mathematics
2004
B.S.
Wisconsin Lutheran College
Mathematics
1997
Industry Expertise
Education/Learning
Areas of Expertise
Properties of Morphisms of Affine Schemes
Commutative Algebra
Mathematics
Algebraic Geometry
Properties of Ring Extensions
Accomplishments
OER Course Redesign Incentive
State University of New York, Awarded for redesign of University Calculus I & II, June 2018
Affiliations
- American Mathematical Society : Member
- Mathematical Association of America : Member
- Upstate New York Inquiry-Based Learning Consortium : Member
Social
Selected Publications
Uniformly primary ideals
Journal of Pure and Applied Algebra2008
This article introduces and advances the basic theory of “uniformly primary ideals” for commutative rings, a concept that imposes a certain boundedness condition on the usual notion of “primary ideal”. Characterizations of uniformly primary ideals are provided along with examples that give the theory independent value. Applications are also provided in contexts that are relevant to Noetherian rings.