Bibliography for MATH20009: Perspectives in Mathematics BETA

Adams, Colin Conrad. The Knot Book: An Elementary Introduction to the Mathematical Theory of Knots. New York: W.H. Freeman, 1994. Print.

‘Ancestral Inference in Population Genetics’. Web. <https://link.springer.com/content/pdf/10.1007/978-3-540-39874-5_1.pdf>.

Andrews, George E., Richard Askey, and Ranjan Roy. Special Functions. Encyclopedia of mathematics and its applications. Cambridge: Cambridge University Press, 1999. Web. <http://dx.doi.org/10.1017/CBO9781107325937>.

Apostol, Tom M. Introduction to Analytic Number Theory. Undergraduate texts in mathematics. New York: Springer, 1976. Print.

Austin, Bill, Don Barry, and David Berman. ‘The Lengthening Shadow: The Story of Related Rates’. Mathematics Magazine 73.1 (2000): n. pag. Web.

Bhattacharya, Kaushik. Microstructure of Martensite: Why It Forms and How It Gives Rise to the Shape-Memory Effect. Oxford series on materials modelling. Oxford: Oxford University Press, 2003. Print.

Boaler, Jo, and Carol S. Dweck. Mathematical Mindsets: Unleashing Students’ Potential through Creative Math, Inspiring Messages, and Innovative Teaching. San Francisco: Jossey-Bass, 2016. Print.

Brawner, James N. ‘Dinner, Dancing, and Tennis, Anyone?’ Mathematics Magazine 73.1 (2000): n. pag. Web.

Doyle, Peter G. ‘Random Walks and Electric Networks’. (2000): n. pag. Web. <https://arxiv.org/abs/math/0001057>.

Durksen, Tracy L. et al. ‘Motivation and Engagement in Mathematics: A Qualitative Framework for Teacher-Student Interactions’. Mathematics Education Research Journal 29.2 (2017): 163–181. Web.

Falconer, K. J. Fractal Geometry: Mathematical Foundations and Applications. Third edition. Chichester, West Sussex: John Wiley & Sons Ltd, 2014. Web. <https://ebookcentral.proquest.com/lib/bristol/detail.action?docID=1557285>.

Foulds, L. R. Combinatorial Optimization for Undergraduates. Undergraduate texts in mathematics. New York: Springer-Verlag, 1984. Print.

Gelbaum, Bernard, and John M. H. Olmstead. Counterexamples in Analysis. The Mathesis Series. San Francisco: Holden-Day, 1964. Print.

Graver, Jack E. and Mathematical Association of America. Counting on Frameworks: Mathematics to Aid the Design of Rigid Structures. Dolciani mathematical expositions. Washington, D.C.: Mathematical Association of America, 2001. Print.

Grimmett, Geoffrey, and David Stirzaker. Probability and Random Processes. 3rd ed. Oxford: Oxford University Press, 2001. Print.

Horak, Matthew. ‘Disentangling Topological Puzzles by Using Knot Theory’. Mathematics Magazine 79.5 (2006): n. pag. Web.

Houston, Kevin. How to Think like a Mathematician: A Companion to Undergraduate Mathematics. Cambridge: Cambridge University Press, 2009. Print.

‘How to Write Mathematics’. Web. <https://uob-my.sharepoint.com/personal/mancs_bristol_ac_uk/Documents/htwm.pdf>.

Joshua D. Laison and Michelle Schick. ‘Seeing Dots: Visibility of Lattice Points’. Mathematics Magazine 80.4 (2007): 274–282. Web. <http://www.jstor.org/stable/27643042?seq=1#page_scan_tab_contents>.

Körner, T. W. Fourier Analysis. Cambridge: Cambridge University Press, 1988. Web. <http://dx.doi.org/10.1017/CBO9781107049949>.

Korte, B. H., and Jens Vygen. Combinatorial Optimization: Theory and Algorithms. 3rd ed. Vol. 21. Berlin: Springer. Web.

MICHAEL A. JONES. ‘The Geometry behind Paradoxes of Voting Power’. Mathematics Magazine 82.2 (2009): 103–116. Web. <http://www.jstor.org/stable/27765883>.

‘Netflix Prize Problem Notes’. Web. <https://uob-my.sharepoint.com/personal/mancs_bristol_ac_uk/Documents/Netflix%20prize%20problem.pdf?slrid=1f6a1b9e-b026-4000-7aa2-edb69d56df80>.

Niven, Ivan. Irrational Numbers. Cambridge: Cambridge University Press, 2014. Web. <http://dx.doi.org/10.5948/9781614440116>.

‘On Lexell’s Theorem’. The American Mathematical Monthly 124.4 (2017): n. pag. Web.

Rousseau, Christiane, and Yvan Saint-Aubin. Mathematics and Technology. Springer undergraduate texts in mathematics and technology. New York: Springer, 2008. Web.

Sam C. Saunders, N. Chris Meyer and Dane W. Wu. ‘Compounding Evidence from Multiple DNA-Tests’. Mathematics Magazine 72.1 (1999): 39–43. Web. <http://www.jstor.org/stable/2691312?seq=1#page_scan_tab_contents>.

SIEHLER, JACOB. ‘How Long Until a Random Sequence Decreases?’ Mathematics Magazine 83.5 (2010): n. pag. Web. <http://www.jstor.org/stable/10.4169/002557010x529798>.

Silverman, Joseph H., and John T. Tate. Rational Points on Elliptic Curves. Second edition, enlarged and updated. Undergraduate texts in mathematics. Cham: Springer, 2015. Print.

Thomas J. Pfaff and Max M. Tran. ‘Series That Probably Converge to One’. Mathematics Magazine 82.1 (2009): 42–49. Web. <http://www.jstor.org/stable/27643157?seq=1#page_scan_tab_contents>.

Tufte, Edward R. Visual Explanations: Images and Quantities, Evidence and Narrative. Cheshire, Conn: Graphics Press, 1997. Print.

Ware, Colin. Information Visualization: Perception for Design. 3rd ed. The Morgan Kaufmann series in interactive technologies. Waltham, MA: Morgan Kaufmann, 2013. Web. <https://ebookcentral.proquest.com/lib/bristol/detail.action?docID=892223>.

Weiner, Paul A. ‘The Abundancy Ratio, a Measure of Perfection’. Mathematics Magazine 73.4 (2000): n. pag. Web.