Faculty Profile

Kiko Kawamura

Title

Principal Lecturer

Department

Mathematics

College

College of Science

Curriculum Vitae

Click Here to View Faculty CV

Education

SCD, Nara Women's University, Japan, 1998.

Major: Mathematics

Dissertation Title: On a classification of self-similar sets

MS, Nara Women's University, Japan, 1995.

Major: Mathematics

Dissertation Title: A few remarks on real functions with fractal properties

BS, Ritsumeikan University, Japan, 1993.

Major: Mathematics

Current Scheduled Teaching^*

MATH 3680.400, Applied Statistics, Summer 2024

^* 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 3680.510, Applied Statistics, Fall 2023 Syllabus SPOT

MATH 3680.520, Applied Statistics, Fall 2023 Syllabus SPOT

MATH 1720.620, Calculus II, Fall 2023 Syllabus SPOT

MATH 3180.001, Probability for Engineers, Fall 2023 Syllabus SPOT

MATH 1780.510, Probability Models, Fall 2023 Syllabus SPOT

MATH 3680.400, Applied Statistics, Summer 10W 2023 Syllabus

MATH 3680.400, Applied Statistics, Spring 2023 Syllabus SPOT

MATH 3680.420, Applied Statistics, Spring 2023 Syllabus SPOT

MATH 4610.001, Probability, Spring 2023 Syllabus SPOT

MATH 3680.510, Applied Statistics, Fall 2022 Syllabus SPOT

MATH 1780.510, Probability Models, Fall 2022 Syllabus SPOT

MATH 1780.520, Probability Models, Fall 2022 Syllabus SPOT

MATH 3680.001, Applied Statistics, Spring 2022 Syllabus SPOT

MATH 3680.400, Applied Statistics, Spring 2022 Syllabus SPOT

MATH 3680.420, Applied Statistics, Spring 2022 Syllabus SPOT

MATH 1780.400, Probability Models, Spring 2022 Syllabus SPOT

MATH 3680.510, Applied Statistics, Fall 2021 Syllabus SPOT

MATH 1720.610, Calculus II, Fall 2021 Syllabus SPOT

MATH 1720.611, Calculus II, Fall 2021

MATH 1720.612, Calculus II, Fall 2021

MATH 1720.613, Calculus II, Fall 2021

MATH 1720.614, Calculus II, Fall 2021

MATH 1780.510, Probability Models, Fall 2021 Syllabus SPOT

MATH 1780.515, Probability Models, Fall 2021 Syllabus SPOT

MATH 1780.520, Probability Models, Fall 2021 SPOT

MATH 4900.702, Special Problems, Summer 8W1 2021

MATH 3680.002, Applied Statistics, Spring 2021 Syllabus SPOT

MATH 3680.004, Applied Statistics, Spring 2021 Syllabus SPOT

MATH 1780.004, Probability Models, Spring 2021 Syllabus SPOT

MATH 4900.702, Special Problems, Spring 2021

MATH 1780.001, Probability Models, Fall 2020 Syllabus SPOT

MATH 1780.002, Probability Models, Fall 2020 Syllabus SPOT

MATH 1780.003, Probability Models, Fall 2020 Syllabus SPOT

MATH 1780.004, Probability Models, Fall 2020 Syllabus SPOT

MATH 4910.702, Special Problems, Fall 2020

MATH 3680.500, Applied Statistics, Summer 10W 2020 Syllabus SPOT

MATH 3680.501, Applied Statistics, Summer 10W 2020 SPOT

MATH 3680.510, Applied Statistics, Summer 10W 2020 Syllabus SPOT

MATH 3680.001, Applied Statistics, Spring 2020 Syllabus

MATH 3680.002, Applied Statistics, Spring 2020 Syllabus

MATH 3680.004, Applied Statistics, Spring 2020 Syllabus

MATH 1780.003, Probability Models, Spring 2020 Syllabus

MATH 4900.703, Special Problems, Spring 2020

MATH 3680.004, Applied Statistics, Fall 2019 Syllabus SPOT

MATH 3680.005, Applied Statistics, Fall 2019 Syllabus SPOT

MATH 1780.002, Probability Models, Fall 2019 Syllabus SPOT

MATH 1780.003, Probability Models, Fall 2019 Syllabus SPOT

MATH 3410.001, Differential Equations I, Spring 2019 Syllabus SPOT

MATH 3410.004, Differential Equations I, Spring 2019 Syllabus SPOT

MATH 2730.001, Multivariable Calculus, Spring 2019 Syllabus SPOT

MATH 2730.002, Multivariable Calculus, Spring 2019 Syllabus SPOT

MATH 3410.003, Differential Equations I, Fall 2018 Syllabus SPOT

MATH 3410.005, Differential Equations I, Fall 2018 Syllabus SPOT

MATH 3410.006, Differential Equations I, Fall 2018 Syllabus SPOT

MATH 3410.007, Differential Equations I, Fall 2018 Syllabus SPOT

MATH 3680.003, Applied Statistics, Fall 2017 Syllabus SPOT

MATH 3680.004, Applied Statistics, Fall 2017 Syllabus SPOT

MATH 2730.001, Multivariable Calculus, Fall 2017 Syllabus SPOT

MATH 2730.002, Multivariable Calculus, Fall 2017 Syllabus SPOT

MATH 3680.004, Applied Statistics, Spring 2017 Syllabus SPOT

MATH 3680.005, Applied Statistics, Spring 2017 Syllabus SPOT

MATH 1710.150, Calculus I, Spring 2017 Syllabus SPOT

MATH 1710.151, Calculus I, Spring 2017

MATH 1710.152, Calculus I, Spring 2017

MATH 1710.153, Calculus I, Spring 2017

MATH 1710.154, Calculus I, Spring 2017

MATH 1710.160, Calculus I, Spring 2017 Syllabus SPOT

MATH 1710.161, Calculus I, Spring 2017

MATH 1710.162, Calculus I, Spring 2017

MATH 1710.163, Calculus I, Spring 2017

MATH 3680.003, Applied Statistics, Fall 2016 Syllabus SPOT

MATH 3680.004, Applied Statistics, Fall 2016 Syllabus SPOT

MATH 1710.120, Calculus I, Fall 2016 Syllabus SPOT

MATH 1710.121, Calculus I, Fall 2016

MATH 1710.122, Calculus I, Fall 2016

MATH 1710.123, Calculus I, Fall 2016

MATH 1710.124, Calculus I, Fall 2016

MATH 1710.130, Calculus I, Fall 2016 Syllabus SPOT

MATH 1710.131, Calculus I, Fall 2016

MATH 1710.132, Calculus I, Fall 2016

MATH 1710.133, Calculus I, Fall 2016

MATH 1710.134, Calculus I, Fall 2016

MATH 3680.001, Applied Statistics, Spring 2016 Syllabus SPOT

MATH 3680.005, Applied Statistics, Spring 2016 Syllabus SPOT

MATH 2730.002, Multivariable Calculus, Spring 2016 Syllabus SPOT

MATH 2730.003, Multivariable Calculus, Spring 2016 Syllabus SPOT

MATH 3680.001, Applied Statistics, Fall 2015 Syllabus SPOT

MATH 3680.003, Applied Statistics, Fall 2015 Syllabus SPOT

MATH 2730.001, Multivariable Calculus, Fall 2015 Syllabus SPOT

MATH 2730.006, Multivariable Calculus, Fall 2015 Syllabus SPOT

MATH 3680.002, Applied Statistics, Spring 2015 Syllabus

MATH 3680.003, Applied Statistics, Spring 2015 Syllabus

MATH 1710.620, Calculus I, Spring 2015 Syllabus

MATH 2730.002, Multivariable Calculus, Spring 2015 Syllabus

MATH 1650.621, Pre Calculus, Fall 2014 Syllabus

MATH 4610.001, Probability, Fall 2014 Syllabus

MATH 3000.001, Real Analysis I, Fall 2014 Syllabus

MATH 1710.050, Calculus I, Spring 2014 Syllabus

MATH 1710.620, Calculus I, Spring 2014 Syllabus

MATH 1720.010, Calculus II, Spring 2014 Syllabus

MATH 2700.005, Linear Algebra and Vector Geometry, Spring 2014 Syllabus

MATH 4900.727, Special Problems, Spring 2014

MATH 1710.009, Calculus I, Fall 2013 Syllabus

MATH 1720.003, Calculus II, Fall 2013 Syllabus

MATH 1650.621, Pre Calculus, Fall 2013 Syllabus

MATH 1710.007, Calculus I, Spring 2013 Syllabus

MATH 1710.200, Calculus I, Spring 2013 Syllabus

MATH 1710.620, Calculus I, Spring 2013 Syllabus

MATH 1720.001, Calculus II, Fall 2012 Syllabus

MATH 1720.005, Calculus II, Fall 2012 Syllabus

MATH 2700.002, Linear Algebra and Vector Geometry, Fall 2012 Syllabus

MATH 2730.002, Multivariable Calculus, Fall 2012 Syllabus

MATH 1710.621, Calculus I, Spring 2012 Syllabus

MATH 1720.002, Calculus II, Spring 2012 Syllabus

MATH 2730.003, Multivariable Calculus, Spring 2012 Syllabus

MATH 1710.003, Calculus I, Fall 2011 Syllabus

MATH 1710.620, Calculus I, Fall 2011 Syllabus

MATH 2700.002, Linear Algebra and Vector Geometry, Fall 2011 Syllabus

MATH 2700.006, Linear Algebra and Vector Geometry, Fall 2011 Syllabus

MATH 1710.200, Calculus I, Spring 2011 Syllabus

MATH 2700.001, Linear Algebra and Vector Geometry, Spring 2011 Syllabus

MATH 2700.003, Linear Algebra and Vector Geometry, Spring 2011 Syllabus

MATH 2700.006, Linear Algebra and Vector Geometry, Spring 2011 Syllabus

MATH 1100.002, College Algebra, Fall 2010

MATH 1100.007, College Algebra, Fall 2010

MATH 4610.002, Probability, Fall 2010 Syllabus

MATH 5810.002, Probability and Statistics, Fall 2010

MATH 1710.003, Calculus I, Spring 2010

MATH 1710.006, Calculus I, Spring 2010

MATH 1710.210, Calculus I, Spring 2010

MATH 1720.007, Calculus II, Fall 2008

MATH 1350.002, Mathematics for Elementary Education Majors I, Fall 2008

MATH 1350.003, Mathematics for Elementary Education Majors I, Fall 2008

MATH 2730.001, Multivariable Calculus, Fall 2008

MATH 1710.001, Calculus I, Spring 2008

MATH 1720.005, Calculus II, Spring 2008

MATH 1350.003, Mathematics for Elementary Education Majors I, Spring 2008

MATH 1350.005, Mathematics for Elementary Education Majors I, Spring 2008

MATH 1710.005, Calculus I, Fall 2007

MATH 1100.003, College Algebra, Fall 2007

MATH 1100.013, College Algebra, Fall 2007

MATH 1350.006, Mathematics for Elementary Education Majors I, Fall 2007

MATH 1350.002, Mathematics for Elementary Education Majors I, Spring 2007

MATH 1350.004, Mathematics for Elementary Education Majors I, Spring 2007

MATH 1350.002, Mathematics for Elementary Education Majors I, Fall 2006

MATH 1350.005, Mathematics for Elementary Education Majors I, Fall 2006

Published Publications

Published Intellectual Contributions

Conference Proceeding

Kawamura, K. (2001). Computational complexity of self-similar sets.

Kawamura, K. (1999). Hausdorff dimension and Computational Complexity.

Kawamura, K. (1998). Real Function with Fractal Property (communicated by Prof. A. Tsutsumi).

Journal Article

Kawamura, K., Dalaklis, N., Mathis, T., Paizanis, M. (2023). The partial derivative of Okamoto's functions with respect to the parametor. Real Analysis Exchange. 48(1), pp 1-14.

Kawamura, K., Allen, A. (2021). Revolving Fractals. Journal of Fractal Geometry. 8(doi: 10.4171/JFG/107), 289-304. European Mathematical Society.

Kawamura, K. (2011). On the set of points where Lebesgue's singular function has the derivative zero.

Kawamura, K., Allaart, P. C. (2011). Takagi function: Survey. Denton:.

Kawamura, K. (2010). The improper infinite derivatives of Takagi's nowhere differentiable function.

Kawamura, K. (2007). Dimensions of coordinate functions of space-filling curves.

Kawamura, K. (2006). Extreme values of some nowhere differentiable functions.

Kawamura, K. (2005). On the coordinate functions of Levy 's dragon curve.

Kawamura, K. (2002). On the classification of self-similar sets determined by two contractions on the plane.

Kawamura, K. (2000). Computational complexity of fractal sets.

Kawamura, K. (1999). Computability of self-similar sets.

Kawamura, K. (1997). A few remark s on real function s with fractal properties.

Kawamura, K. (1997). Computability of self-affine sets.

Kawamura, K. (1996). Computability of Koch curve and Koch island.

Awarded Grants

Contracts, Grants and Sponsored Research

Grant - Research

Kawamura, K. (Principal), "Travel support for Invited Speaker in workshop “60 years of dynamics and number expansions” in Pisa, Italy," Sponsored by Leiden University, International, $1600 Funded. (December 10, 2018 – December 14, 2018).

Kawamura, K. (Principal), "On nowhere differntiable functions," Sponsored by RIMS, Kyoto University, International, $20000 Funded. (January 2009 – June 2009).

Kawamura, K. (Principal), "On a classification of self-similar sets," Sponsored by Japan association for mathematical sciences, National, $2500 Funded. (1999 – 1999).

Kawamura, K. (Principal), "Computational complexity of fractal sets," Sponsored by International information science foundation, International, $8000 Funded. (1998 – 1998).

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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

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Faculty Profile

Kiko Kawamura

Curriculum Vitae

Education

Current Scheduled Teaching*

Previous Scheduled Teaching*

Published Publications

Published Intellectual Contributions

Conference Proceeding

Journal Article

Awarded Grants

Contracts, Grants and Sponsored Research

Grant - Research

Current Scheduled Teaching^*

Previous Scheduled Teaching^*