Douglas P. Brozovic

Title: Associate Professor

Department: Mathematics

College: College of Science

General Academic Building 417
dpb0011@unt.edu
http://www.math.unt.edu/~brozovic/

General Information Previous Courses Publications Research

Curriculum Vitae

Curriculum Vitae Link

Education

PhD, Ohio State University, 1991
Major: Mathematics
Dissertation: "On Lengths of Chains in Lie Type Groups in Characteristic 3"
MS, Ohio State University, 1986
Major: Mathematics
BS, Ohio State University, 1984
Major: Mathematics

Current Scheduled Teaching

MATH 3510.002	Abstract Algebra I	Spring 2025
MATH 1710.721	Calculus I	Spring 2025
MATH 5000.002	Instructional Issues for the Professional Mathematician	Fall 2024
MATH 1650.621	Pre Calculus	Fall 2024	Syllabus

Texas Education Code 51.974 (HB 2504) requires each institution of higher education to make available to the public, a syllabus for undergraduate lecture courses offered for credit by the institution.

Previous Scheduled Teaching

MATH 1710.310	Calculus I	Spring 2024	Syllabus	SPOT
MATH 4500.001	Introduction to Topology	Spring 2024	Syllabus	SPOT
MATH 5600.001	Introduction to Topology	Spring 2024		SPOT
MATH 5000.002	Instructional Issues for the Professional Mathematician	Fall 2023		SPOT
MATH 5900.720	Special Problems	Fall 2023
MATH 1710.721	Calculus I	Spring 2023	Syllabus	SPOT
MATH 6950.714	Doctoral Dissertation	Spring 2023
MATH 5530.001	Modern Algebra	Spring 2023		SPOT
MATH 4900.704	Special Problems	Spring 2023
MATH 6950.706	Doctoral Dissertation	Fall 2022
MATH 1650.621	Pre Calculus	Fall 2022	Syllabus	SPOT
MATH 6510.001	Topics in Algebra	Fall 2022		SPOT
MATH 5900.702	Special Problems	Summer 5W1 2022
MATH 1710.721	Calculus I	Spring 2022	Syllabus	SPOT
MATH 6950.720	Doctoral Dissertation	Spring 2022
MATH 5900.705	Special Problems	Spring 2022
MATH 6510.001	Topics in Algebra	Spring 2022		SPOT
MATH 6950.711	Doctoral Dissertation	Fall 2021
MATH 5000.002	Instructional Issues for the Professional Mathematician	Fall 2021		SPOT
MATH 1650.621	Pre Calculus	Fall 2021	Syllabus	SPOT
MATH 1710.621	Calculus I	Spring 2021	Syllabus	SPOT
MATH 5530.001	Selected Topics in Modern Algebra	Spring 2021	Syllabus	SPOT
MATH 5900.706	Special Problems	Spring 2021
MATH 5520.001	Modern Algebra	Fall 2020	Syllabus	SPOT
MATH 5520.002	Modern Algebra	Fall 2020	Syllabus	SPOT
MATH 1650.621	Pre Calculus	Fall 2020	Syllabus	SPOT
MATH 5900.706	Special Problems	Fall 2020
MATH 6520.001	Algebra Seminar	Spring 2020
MATH 1710.621	Calculus I	Spring 2020	Syllabus
MATH 5900.703	Special Problems	Spring 2020
MATH 6510.001	Topics in Algebra	Spring 2020
MATH 5000.002	Instructional Issues for the Professional Mathematician	Fall 2019		SPOT
MATH 1650.621	Pre Calculus	Fall 2019	Syllabus	SPOT
MATH 5900.706	Special Problems	Fall 2019
MATH 1710.621	Calculus I	Spring 2019	Syllabus	SPOT
MATH 5900.708	Special Problems	Spring 2019
MATH 6510.001	Topics in Algebra	Spring 2019		SPOT
MATH 5520.001	Modern Algebra	Fall 2018		SPOT
MATH 1650.623	Pre Calculus	Fall 2018	Syllabus	SPOT
MATH 5900.706	Special Problems	Fall 2018
MATH 1710.621	Calculus I	Spring 2018	Syllabus	SPOT
MATH 5530.001	Selected Topics in Modern Algebra	Spring 2018		SPOT
MATH 4910.703	Special Problems	Spring 2018
MATH 5900.704	Special Problems	Spring 2018
MATH 6520.001	Algebra Seminar	Fall 2017
MATH 5520.001	Modern Algebra	Fall 2017		SPOT
MATH 1650.622	Pre Calculus	Fall 2017	Syllabus	SPOT
MATH 4900.703	Special Problems	Fall 2017
MATH 5900.706	Special Problems	Fall 2017
MATH 1710.620	Calculus I	Spring 2017	Syllabus	SPOT
MATH 4980.002	Experimental Course	Spring 2017	Syllabus	SPOT
MATH 5700.002	Selected Topics in Contemporary Mathematics	Spring 2017		SPOT
MATH 5900.707	Special Problems	Spring 2017
MATH 5000.002	Instructional Issues for the Professional Mathematician	Fall 2016		SPOT
MATH 1650.621	Pre Calculus	Fall 2016	Syllabus	SPOT
MATH 5900.706	Special Problems	Fall 2016
MATH 1710.620	Calculus I	Spring 2016	Syllabus	SPOT
MATH 4900.702	Special Problems	Spring 2016
MATH 6510.001	Topics in Algebra	Spring 2016		SPOT
MATH 5000.002	Instructional Issues for the Professional Mathematician	Fall 2015		SPOT
MATH 1650.621	Pre Calculus	Fall 2015		SPOT
MATH 1710.621	Calculus I	Spring 2015	Syllabus
MATH 5530.001	Selected Topics in Modern Algebra	Spring 2015
MATH 5520.001	Modern Algebra	Fall 2014
MATH 1650.622	Pre Calculus	Fall 2014	Syllabus
MATH 4900.709	Special Problems	Fall 2014
MATH 1710.621	Calculus I	Spring 2014	Syllabus
MATH 6510.001	Topics in Algebra	Spring 2014
MATH 4430.001	Introduction to Graph Theory	Fall 2013	Syllabus
MATH 1650.624	Pre Calculus	Fall 2013	Syllabus
MATH 1710.622	Calculus I	Spring 2013	Syllabus
MATH 4450.001	Introduction to the Theory of Matrices	Spring 2013	Syllabus
MATH 5500.001	Introduction to the Theory of Matrices	Spring 2013
MATH 5000.002	Instructional Issues for the Professional Mathematician	Fall 2012
MATH 1650.622	Pre Calculus	Fall 2012	Syllabus
MATH 1710.623	Calculus I	Spring 2012	Syllabus
MATH 5530.001	Selected Topics in Modern Algebra	Spring 2012
MATH 5900.709	Special Problems	Spring 2012
MATH 6900.709	Special Problems	Spring 2012
MATH 5520.001	Modern Algebra	Fall 2011
MATH 1650.623	Pre Calculus	Fall 2011	Syllabus
MATH 5900.704	Special Problems	Fall 2011
MATH 1710.621	Calculus I	Spring 2011	Syllabus
MATH 4500.001	Introduction to Topology	Spring 2011	Syllabus
MATH 5600.001	Introduction to Topology	Spring 2011
MATH 5900.709	Special Problems	Spring 2011
MATH 5000.002	Instructional Issues for the Professional Mathematician	Fall 2010
MATH 1650.623	Pre Calculus	Fall 2010	Syllabus
MATH 5900.704	Special Problems	Fall 2010
MATH 6900.707	Special Problems	Fall 2010
MATH 5900.707	Special Problems	Summer 5W2 2010
MATH 5910.707	Special Problems	Summer 5W2 2010
MATH 1710.624	Calculus I	Spring 2010
MATH 4500.001	Introduction to Topology	Spring 2010
MATH 5600.001	Introduction to Topology	Spring 2010
MATH 4900.712	Special Problems	Spring 2010
MATH 5900.725	Special Problems	Spring 2010
MATH 5000.002	Instructional Issues for the Professional Mathematician	Fall 2009
MATH 1650.624	Pre Calculus	Fall 2009
MATH 5900.704	Special Problems	Fall 2009
MATH 1710.620	Calculus I	Spring 2009
MATH 5530.001	Selected Topics in Modern Algebra	Spring 2009
MATH 5520.001	Modern Algebra	Fall 2008
MATH 1650.622	Pre Calculus	Fall 2008
MATH 5900.704	Special Problems	Fall 2008
MATH 1710.620	Calculus I	Spring 2008
MATH 3410.001	Differential Equations I	Spring 2008
MATH 2700.002	Linear Algebra and Vector Geometry	Fall 2007
MATH 1650.624	Pre Calculus	Fall 2007
MATH 1710.624	Calculus I	Spring 2006
MATH 5530.001	Selected Topics in Modern Algebra	Spring 2006
MATH 5520.001	Modern Algebra	Fall 2005
MATH 1650.624	Pre Calculus	Fall 2005
MATH 5900.707	Special Problems	Fall 2005
MATH 1720.001	Calculus II	Summer 5W2 2005
MATH 1710.008	Calculus I	Spring 2005
MATH 6950.705	Doctoral Dissertation	Spring 2005
MATH 2520.001	Real Analysis II	Spring 2005
MATH 1720.007	Calculus II	Fall 2004
MATH 6950.707	Doctoral Dissertation	Fall 2004
MATH 2510.002	Real Analysis I	Fall 2004

Published Intellectual Contributions

Journal Article

Douglas Brozovic and Peter Sin. (2016). A note on point stabilizers in sharp permutation groups of type {0,k}. Communications in Algebra. 44 (8) 3324-3339. Taylor & Francis.
Douglas Brozovic. (2014). The Classification of Primitive Sharp Permutation Groups of type {0,k}, Communications in Algebra, 42 (7) (2014). http://www.tandfonline.com/toc/lagb20/42/7#.U_zS9GO9aOU
with Chat Yin Ho. (2006). Some Characterizations for Desarguesian Translation Planes By Orders of Subgroups in Translation Complements.
with Chat Yin Ho and Akihiro Munemasa. (2002). A Correction to ``Incidence Matrices and Collineations of Finite Projective Planes, by Chat Yin Ho, Designs, Codes and Crypt ography, 18, (1999), 159-162''.
Brozovic, D.P. (2000). One point stabilizers in almost simple sharp permutation groups.
with Ron Solomon. (1997). On Groups of Hyperbolic Length.
Brozovic, D.P. (1996). On primitive sharp permutation groups.
Brozovic, D.P. (1994). A reduction theorem for the chain length of an odd characteristic Lie Type Group.
Brozovic, D.P. (1994). Almost Simple p-obstructions in Odd Characteristic Lie Type Groups.
Brozovic, D.P. (1994). Groups of hyperbolic length in odd characteristic groups of Lie type.
Brozovic, D.P. (1994). The Length of Chains in Odd Characteristic groups of Lie Type.
with Ron Solomon. (1993). A Survey on Chains of Subgroups.
Brozovic, D.P. (1993). Subgroup Chains in Finite Groups.

,
Overall Summative Rating	Challenge and Engagement Index	Response Rate
out of 5	out of 7	% of students responded

Overall Summative Rating (median):
This rating represents the combined responses of students to the four global summative items and is presented to provide an overall index of the class’s quality. Overall summative statements include the following (response options include a Likert scale ranging from 5 = Excellent, 3 = Good, and 1= Very poor):
- The course as a whole was
- The course content was
- The instructor’s contribution to the course was
- The instructor’s effectiveness in teaching the subject matter was
Challenge and Engagement Index:
This rating combines student responses to several SPOT items relating to how academically challenging students found the course to be and how engaged they were. Challenge and Engagement Index items include the following (response options include a Likert scale ranging from 7 = Much higher, 4 = Average, and 1 = Much lower):
- Do you expect your grade in this course to be
- The intellectual challenge presented was
- The amount of effort you put into this course was
- The amount of effort to succeed in this course was
- Your involvement in course (doing assignments, attending classes, etc.) was