Christopher A Briggs

Title: Associate Professor of Data Science and Mathematics
Email: Christopher.Briggs@erau.edu Email
Department: Mathematics Department
College: College of Arts & Sciences

Areas of Expertise

Data Science

Combinatorial Algebra

Education

Ph.D. - Doctor of Philosophy in Mathematics, University of California-San Diego
M.S. - Master of Science in Data Science, Bellevue University
M.A. - Master of Arts in Mathematics, University of California-San Diego
B.A. - Bachelor of Arts in Mathematics, University of California-San Diego

Currently Teaching

MA 241: Calculus & Analytical Geom I
MA 243: Calculus & Analytical Geom III
DS 490: Data Science Capstone
MA 345: Diff Equations & Matrix Method
MA 335: Intro Linear/Abstract Algebra
DS 312: Machine Learning

Courses Taught

CS 303 - Network Security

DS 150 - Intro to Data Science

DS 151 - Foundations of Data Science

DS 244 - Data Acquisition and Manipulation

DS 312 - Machine Learning

DS 413 - Statistics for Data Science

DS 490 - Data Science Capstone

MA 222 - Business Statistics

MA 225 - Introduction to Discrete Structures

MA 241 - Calculus and Analytic Geometry I

MA 242 - Calculus and Analytic Geometry II

MA 243 - Calculus and Analytic Geometry III

MA 335 - Linear and Abstract Algebra I

MA 345 - Differential Equations and Matrix Methods

MA 399 - Special Topics in Mathematics

MA 412 - Probability and Statistics

MA 435 - Linear and Abstract Algebra II

MA 441 - Mathematical Methods for Engineering and Physics I

Publications

1. C. Briggs, Uniform exponential growth in twisted polynomial algebras, Developments of Language, Logic, Algebraic system, and Computer Science no. 2153, RIMS, Kyoto University Press, 2021

2. C. Briggs, C. Briggs, Uniform exponential growth in twisted polynomial algebras, Communications in Algebra 49:2, 631-638 (2021)

3. C. Briggs, A useful homomorphic image of a free abelian by infinite cyclic group, Proc. Exch. Math. Ideas 1 (2019) 122-125

4. C. Briggs, Positive solutions to some systems of nonlinear Diophantine equations, Proc. Exch. Math. Ideas 1 (2019) 80-85

5. C. Briggs, A growth dichotomy for group algebras of free abelian by infinite cyclic groups, Developments of Language, Logic, Algebraic system, and Computer Science no. 2051, RIMS, Kyoto University Press, 2017, ISSN 1880-2818.

6. C. Briggs, Examples of uniform exponential growth in algebras, J. Algebra Appl., 16 (2017)

7. C. Briggs, Y. Hirano and H. Tsutsui, Positive solutions to some systems of Diophantine equations, J. Int. Seq. 19 (2016) 16.8.4

8. C. Briggs, OEIS sequence A275234 (https://oeis.org/A275234) (2016)