Student Technical Reports

Many of our students complete demanding projects over their senior years. We are proud of our student's work. Students have made presentations at national and international conferences, and some of these works are published outside of this technical report series.

^* Denotes a senior honors thesis.    ^** Denotes an REU project.

• S55 Susan Abernathy, The Structure of Differential Manifolds via Morse Theory, Mathematics Technical Report #S55, San Antonio, TX 2007.
• S54 Evan O'Dea, A New Character for Polyhedrons in Rⁿ₊, Mathematics Technical Report #S54, San Antonio, TX 2006.
• S53 ^** J. Amos, C. Chen, O. Lepigina, T. Nezhmetdinov, D. Ong, M. Richer, and L. Zirbel, The Mulit-Dimensional Frobenius Problem 2, Trinity University, Mathematics Technical Report #S53, San Antonio, TX 2006.
• S52 ^** N. Hine and J. Paixao, Length Sets and V Sets of Numerical Monoids, Trinity University, Mathematics Technical Report #S52, San Antonio, TX 2006.
• S50 ^** J. Bauman, On Factorization Properties of Semi-Regular Congruence Mondoids, Trinity University, Mathematics Technical Report #S50, San Antonio, TX 2006.
• S49 ^** G. Schaeffer, The Delta-set of a Singular ACM, Trinity University, Mathematics Technical Report #S49, San Antonio, TX 2006.
• S48 J. Carlos Suarez, Dynamic Programming and Its Applications to Economic Theory, Trinity University, Mathematics Technical Report #S48, San Antonio, TX 2006.
• S47 M. Brady, A Weighted Analysis of the Senior Survey, Trinity University, Mathematics Technical Report #S47, San Antonio, TX 2006.
• S46 M. Jones, Demystifying Functions: The Historical and Pedagogical Difficulties of the Concept of the Function, Trinity University, Mathematics Technical Report #S46, San Antonio, TX 2006.
• S45 L. Murphy, Reviewing Reformed Calculus, Trinity University, Mathematics Technical Report #S45, San Antonio, TX 2006.
• S44 ^** J. Carlos Suarez and Z. Avellaneda, Juanita's Money Order: Income Effects on Human Capital Investment in Mexico, Trinity University, Mathematics Technical Report #S44, San Antonio, TX 2005.
• S43 ^** F. Elliott-Farren and M. Gallant, A Look at f-Invariant delta-Scrambled Sets and Their Placement in Sarkovskii's Stratification of the Real Numbers, Trinity University, Mathematics Technical Report #S43, San Antonio, TX 2005.
• S42 ^** J. Amos, E. Trevino, I. Pascu, and Y. Zhang, On the Vector Frobenius Problem, Trinity University, Mathematics Technical Report #S42, San Antonio, TX 2005.
• S40 ^** P. Blain, A. Holder, J. Silva, and C. Vinzant, Mathematical Approaches to the Pure Parsimony Problem, Trinity University, Mathematics Technical Report #S40, San Antonio, TX 2005.
• S39 J. Sterbanz, Where Has All the Value Gone? Porfolio Risk Optimization Using CVaR, Trinity University, Mathematics Technical Report #S39, San Antonio, TX 2005.
• S38 J. Reese, Vector Quantizatin, Graph Theory, and IMRT Design, Trinity University, Mathematics Technical Report #S38, San Antonio, TX 2005.
• S37 A. O'Brien, Optimal Pricing Strategy for Second Degree Price Discriminiation, Trinity University, Mathematics Technical Report #S37, San Antonio, TX 2005.
• S36 ^** K. Cervello, D. Terry, and L. Zhu, Extraction Degrees of Zero Sequences of Finite Abelian Groups, Trinity University, Mathematics Technical Report #S36, San Antonio, TX 2004.
• S34 ^** G. Harrision-Shermoen and O. Zeid, On the Necessary and Sufficient Conditions for the Existence of f-Invariant Delta-Scrambled Sets, Trinity University, Mathematics Technical Report #S34, San Antonio, TX 2003. (see the attached note as well).
• S33 ^** L. Ang, A Characterization of the Henon Map from R² to R² for positive a and 4a between -3(1-a)² and (1-a)², Trinity University, Mathematics Technical Report #S33, San Antonio, TX 2004.
• S32 ^** J. Louie and L. Sherbakov, The Minimum Letter Flip Problem for Haplotyping a Single Individual, Trinity University, Mathematics Technical Report #S32, San Antonio, TX 2004.
• S31 R. Castillo, Functional Neuroimaging and the ALE Method: A 2D Analyis, Trinity University, Mathematics Technical Report #S31, San Antonio, TX 2004.
• S30 K. DeHoff, Mathematical Analysis of a Cell Cycle Model, Trinity University, Mathematics Technical Report #S30, San Antonio, TX 2004.
• S29 ^* B. McClain Factorisation Properties of Integer-Valued Polynomials, Trinity University, Mathematics Technical Report #S29, San Antonio, TX 2004.
• S28 D. LLagostera Developing a Treatment Plan for Photdynamics Therapy, Trinity University, Mathematics Technical Report #S28, San Antonio, TX 2004.
• S26 ^** S. Hoffman and J. Taylor, Sufficient Conditions to Guarantee a Globally Attractive 2-Cycle of the Non-autonomous Quadratic Family, Trinity University, Mathematics Technical Report #S26, San Antonio, TX 2003.
• S25 ^** R. Herring, C. Nightingale, and T. Stohs, Asymptotic Sign-Solvability and Multiple Objective Linear Programming, Trinity University, Mathematics Technical Report #S25, San Antonio, TX 2003.
• S24 ^** B. Finklea, T. Moore, and Z. Turner, Combinatorial Approaches to Minimal Zero Sequences of Finite Abelian Groups and a Surprising Connection, Trinity University, Mathematics Technical Report #S24, San Antonio, TX 2003.
• S23 C. Davis, Characterizations of Minimum Diversity Graphs, Trinity University, Mathematics Technical Report #S23, San Antonio, TX 2003.
• S22 ^* D. Ragan, Reduction by Symmetry in Lagrangian Mechanics, Trinity University, Mathematics Technical Report #S22, San Antonio, TX 2003.
• S21 ^** A. Beste, D. Leventhal, J. Williams, and Q. Lu, The Markowitz Model: Selecting an Efficient Investment Portfolio, Trinity University, Mathematics Technical Report #S21, San Antonio, TX 2002.
• S20 ^** D. Ragan and G. Tims Bounding the Derived Length of Lie Algebras of a Special Kind, Trinity University, Mathematics Technical Report #S20, San Antonio, TX 2002.
• S19 ^** C. Abbott and M. Swadley, Period Doubling Routes to Chaos in Family of Unimodal Maps, Trinity University, Mathematics Technical Report #S19, San Antonio, TX 2002.
• S18 ^** G. Salazar, D. Dunn, and S. Graham, An Examination of Quaternary Higher-Dimensional Affine Variety Codes with an Improved Minimum Distance Bound, Trinity University, Mathematics Technical Report #S18, San Antonio, TX 2002.
• S17 ^** L. Cayton and J. Holzer, Asymptotic Multiple Objective Linear Programming, Trinity University, Mathematics Technical Report #S17, San Antonio, TX 2002.
• S16 ^** M. Holden and T. Moore, Asymptotic Elasticity and the Full Elasticity Property in Atomic Monoids, Trinity University, Mathematics Technical Report #S16, San Antonio, TX 2002.
• S15 ^** J. Cuomo, N. Nwasokwa, and V. Ponomarenko Three-Dimensional Jump Systems and Manhattan Polytopes, Trinity University, Mathematics Technical Report #S15, San Antonio, TX 2002.
• S13 B. Passty, An Honors Junior High Course in Social Mathematics , Trinity University, Mathematics Technical Report #S13, San Antonio, TX 2002.
• S12 J. Lamb, Classification of (F₄^k, F₂) - polynomials , Trinity University, Mathematics Technical Report #S12, San Antonio, TX 2002.
• S11 N. Coelen, Black-Scholes Option Pricing Model, Trinity University, Mathematics Technical Report #S11, San Antonio, TX 2002.
• S10 M. Cheatham, The Teacher's Aid, Trinity University, Mathematics Technical Report #S10, San Antonio, TX 2002.
• S9 ^** V. Lyubashevsky and C. Newell, Characterization of Jump Systems and Other Results, Trinity University, Mathematics Technical Report #S9, San Antonio, TX, 2001
• S8 ^** J. Genauer and P. Sullivan, Dynamical Properties of Continuous Maps of the Interval, Trinity University, Mathematics Technical Report #S8, San Antonio, TX, 2001
• S6 ^** B. Ellison and J. Wilson, p-adic Upper Half-Planes and Representation Numbers of Quadratic Forms, Trinity University, Mathematics Technical Report #S6, San Antonio, TX, 2001
• S5 ^** A. Brown, A. Gedlaman, and S. Martinez, Analyzing the General Linear Piecewise Lexicographic Programming Problem and an Extension of the Fundamental Theorem of Linear Programming , Trinity University, Mathematics Technical Report #S5, San Antonio, TX, 2001
• S4 ^* A. Crabbe, Generalized Factorial Functions and Binomial Coefficients, Trinity University, Mathematics Technical Report #S4, San Antonio, TX, 2001
• S3 S. Rush, Logistic Regression: The Standard Method of Analysis in Medical Research, Trinity University, Mathematics Technical Report #S3, San Antonio, TX, 2001
• S2 C. Wetzel, Adjusting Radiotherapy Plans, Trinity University, Mathematics Technical Report #S2, San Antonio, TX, 2000.
• S1 S. Quach, Pruning Radiosurgery Plan, Trinity University, Mathematics Technical Report #S1, San Antonio, TX, 2000. (To appear in the NCUR 2000 conference preceedings)