TEACHING EXPERIENCE
INSTRUCTOR
MATH 116, Collage Algebra (WKU) 
MAT 265, Calculus I for Engineers (ASU)
MAT 266, Calculus II for Engineers (ASU)
MAT 211, Mathematics for Business Analysis (ASU)
MATH 2130, Linear Algebra (CU Boulder)
MATH 3430, Ordinary Differential Equations (CU Boulder)
MATH 3001, Analysis I (CU Boulder)
MATH 8304, Topic in Analysis (CU Boulder)
Reading Course on Functional Analysis (CU Boulder)
MATH 1511, Calculus I (NMSU)
MATH 2530, Calculus III (NMSU)

TEACHING ASSISTANT
MAT 109, General Mathematics (WKU)
MATH 136, Calculus I (WKU)
MATH 136, Calculus I-Honors (WKU)
MAT 271/272, Calculus with Analytic Geometry II and III (ASU)
MAT 570/571, Graduate Real Analysis I and II (ASU)





PUBLICATIONS AND PREPRINTS
  1. Valentin Deaconu, M. E. Paulovicks, S. Kaliszewski, and J. Quigg, k-graph algebras are iterated Cuntz-Pimsner algebras-from the bottom up (in progress). 
  2. M. E. Paulovicks and M. Tomforde, Polymorphism Category and Non-negative Rank Factorization (in progress).
  3. M. E. Paulovicks and M. Tomforde,  A Cuntz-Krieger Uniqueness Theorem for Cuntz-Pimsner algebras, Math. Scand. 131 (2025), no. 2, 333-366.
  4. R. J. Deeley, M. Eryüzlü, M. Goeffeng, and A. Yashinski, Wieler Solenoids: Non-Hausdorff expansiveness, Cuntz-Pimsner models, and functorial properties, Trans. Amer. Math. Soc. DOI: https://doi.org/10.1090/tran/9478 Published electronically: July 17, 2025.
  5. M. E. Paulovicks, Exactness of the Cuntz-Pimsner Construction, arXiv:2409.17465v1(2024).
  6. M. Eryüzlü. Passing C*-correspondence Relations to the Cuntz-Pimsner algebras, Münster J. of Math. 15 (2022), no. 2, 441-471. 
  7. M. Eryüzlü, S. Kaliszewski, and J. Quigg. Erratum to ``Exact Sequences in the Enchilada Category’’, Theory Appl. Categ. 38 (2022), no. 14, 432-435.
  8. M. Eryüzlü, S. Kaliszewski, and J. Quigg. Exact Sequences in the Enchilada Category, Theory Appl. Categ. 35 (2020), no. 12, 350-370.