Undergraduate
Mathematics Day
at the University
of Dayton
November 3, 2007
PROGRAM
| 8:45 -
9:30 |
Check-in, folder pick-up, refreshments |
Science Center Auditorium
Lobby |
|
9:30 - 9:45
|
Welcome:
Paul Benson
Dean
College of Arts and Sciences
|
O'Leary Auditorium |
|
9:45 - 10:45
|
Invited Address:
Colleen Hoover
St. Mary's College
Garden-variety Symmetry
|
O'Leary Auditorium |
| 11:00 - 11:55 |
Contributed
Paper Sessions (Part I) |
Science Center |
|
12:00 - 1:00
|
Lunch |
Main Meeting Room,
Virginia W. Kettering Hall |
|
1:15 - 2:25
|
The Eighth Annual Kenneth C. Schraut Memorial Lecture:
William Dunham
Muhlenberg College
An Euler
Trifecta
|
O'Leary Auditorium |
|
2:25 - 2:55
|
Break with Refreshments |
Science Center Auditorium
Lobby |
|
2:55 - 4:10
|
Contributed
Paper Sessions (Part II) |
Science Center |
|
4:15 - 5:05 |
Panel discussion on summer research
experiences for undergraduate students |
Science Center Auditorium |
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Schedule
for Contributed Paper Sessions, Part I:
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Schedule
for Contributed Paper Sessions, Part II:
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Abstracts:
(Listed in alphabetical order by presenter. If a paper has multiple
authors, the presenters are marked with *)
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David Aaby, University of Dayton
Bacteriophage Biomathematics
Bacteriophage are viruses that attack bacteria. They are the most abundant
biological entity in the world, yet we know very little about them. One of the
goals in studying bacteriophage is to create a phylogenetic tree. Phylogeny is
the study of evolutionary relatedness among various groups of organisms. Because
bacteriophage are unique and numerous, the current phylogenetic techniques do
not work. We developed a new process that finds importance ranking for
bacteriophage proteins and creates evolutionary distances between them in order
to construct a phylogenetic tree. Using category theory, we seek to justify this
new process for determining the phylogeny of bacteriophage.
Dakkak Abdulmajed, University of Toledo
Solving Partial Differential Equations with Dirichlet Boundary Conditions on the
Disk and Finding Their Bifurcation Points
We present our research where we solved a certain class of partial differential
equations under the Dirichlet boundary condition on the disk region. We present
relevant concepts from differential equations, algebra, and graph theory to find
solutions to equations of the form
,
where 
is
the Laplacian operator, effectively. Two main algorithms used to find the
bifurcation points will be presented: tangent Galerkin Newton algorithm (GNGA)
and cylindrical GNGA, along with the significance of these bifurcation points.
Nicholas Armenoff, University of Dayton
Reachability of Positions in a Chip Firing Game
We consider mathematical models of the game Mancala. Let D be a directed graph
with a number of chips on each vertex. A move can be made if a vertex in the
vertex set of D has at least as many chips as its outdegree, in which case a
chip on the vertex is sent along each edge to the adjacent verticies. Given two
game states, we ask if there is a sequence of moves which will transform the
first game state to the second game state. To answer this question, we use
related algebraic concepts.
Jonathan Beagley, Illinois Institute of Technology
Minimum Semi-Definite Rank of Graphs with 2-Vertex Cut Sets
The minimum semidefinite rank (MSR) of a graph, G, is defined to be min{rank(A),
for all A in P(G)}, where P(G) is the set of positive semi-definite matrices
with corresponding graph G. New results in this topic will be described, and a
catalogue of graphs with known MSRs will be discussed.
Michelle Brasdovich* and Katie Puthoff*, University of
Dayton
The Area of a Circle and the History of
We will discuss the influence of the Egyptians and Archimedes on the concept of
the area of the circle and the history of
.
Danielle Carleton, University of Dayton
The Fibonacci Sequence and Golden Numbers
The Fibonacci sequence has been around for over 1,000 years, and many
interesting properties of this sequence are known. We will define the sequence
and prove some of its basic properties. We will establish a connection between
the Fibonacci sequence and the golden numbers, famous for their use in Greek art
and architecture. We will also discuss the continued fraction of Bombelli.
Joshua Craven, University of Dayton
How to Have a Coin Toss Over the Phone
Have you ever been talking with someone on the phone and wanted to decide
something over a coin toss? If you tried, the person who did not flip the coin
would never be completely satisfied that the person flipping the coin did not
cheat. Here is an interesting application of number theory that works just like
a coin toss and will also leave both parties satisfied that no one cheated.
Robert Deis* and Jacquline Nunner*, Carroll High School
There are Just Not Enough Daylight Hours in a Day!
Does it seem like days get short really fast at the beginning of Autumn? Does
it seem like during the winter it takes a long time for days to gain daylight,
and when spring finally comes, we gain daylight rapidly? How about those long
days of summer? There seems to be a long period of summer when daylight is
plentiful? These are questions that can be answered with a little curve fitting
and a lot of calculus. This talk will summarize an in-class, progressive
project for introducing calculus concepts including the concepts of rate of
change, derivatives of trigonometric functions, maxima and minima, and points of
inflection.
Rob
Denomme, Ohio State University
Elliptic Curve Primality Tests for Fermat and Related Primes
Proofs of three new primality tests for Fermat and associated primes will be
discussed. The tests are very similar to the well known Lucas-Lehmer test, and
the proofs are based on the simple Pepin's test. The twist is that the tests
utilize elliptic curves by manipulating their defect and introducing an
interesting Z[i] module structure.
Ciara Dillon*, Ohio Dominican University, and Ricardo Aguiar
The MicroRNA Genome in Diffuse Large B-cell Lymphoma
MicroRNAs (miRNAs) are small non-protein coding RNAs that attenuate gene
expression by pairing to the 3’UTR of target transcripts inducing RNA cleavage
or translational inhibition. This novel class of genes is believed to regulate
the expression of about one third of the human genome. Expectedly therefore, a
critical role for miRNAs in several physiologic and pathological processes,
including cancer, has been recently uncovered. However, the role of miRNAs in
the most common type of lymphoid malignancies in adults, diffuse large B-cell
lymphoma (DLBCL), has not been studied. To address this issue, we designed and
implemented a tiling array CGH platform that defines the structural integrity of
all human miRNAs in a single assay. Using this tool we analyzed a large series
of 85 well characterized DLBCLs and found disruption of at least one miRNA locus
in 95% of tumors. This data suggests that miRNAs may play a role in the
pathogenesis of DLBCL.
Elizabeth Freshley* and Zengxiang Tong, Otterbein College
The Formula
Should
Be Revised
The above formula is in James
Stewart’s book Calculus. The author presents it as follows: If f is
continuous on [a, b], then
where F is any
antiderivative of f, that is
.
Almost all calculus textbooks adopt this formula as a classic expression of the
second part of the FTC. However, we think this formula has a flaw. The
conditions in the statement of the theorem do not guarantee that F(x)
is defined at the endpoints of the interval [a, b]. We will
provide an example to show the difficulty that arises in that case. We will
further provide a formula that not only takes care of the difficulties at the
endpoints but also provides a natural connection between the indefinite integral
and the definite integral, and between proper and improper definite integrals.
Rachel Grotheer, Denison University
The Complete Story of Stick Knots in K7
In 1983, Conway and Gordon, and Sachs showed the complete graph on 7 vertices is
intrinsically knotted – every embedding contains at least one knot. Recently,
molecular chemists have constructed knotted molecules in hopes that they possess
unique and useful properties. Results regarding these types of knots are of
particular interest to their work. In this original work, we extend the results
of Conway, Gordon and Sachs by finding the frequency of knots in all
straight-edge embeddings of the complete graph on seven vertices where all the
vertices lie on the convex hull. For each embedding, there are 360 Hamiltonian
cycles that could possibly be knotted. Given any embedding, we can distinguish
the number and types of knots present. It was shown in 1983 that there exists
an embedding of the complete graph on six vertices that has no knots. We will
show how the addition of one vertex and its incident edges creates an embedding
of the complete graph on seven vertices that has exactly one knot.
Casey Hanley*, M. Eric Benbow, Albert J. Burky,
Muhtadi M. Islam, Megan E. Shoda, Douglas A. Vonderhaar, University of Dayton
A River Continuum Analysis Of Relationships Between Land Use, Spatial Scale, And
Macroinvertebrate Assemblages Of The Little Miami River, Ohio
Maintaining biodiversity in the face of encroaching human disturbance
has received much attention in recent years. Relationships between in-stream
habitat quality and the surrounding terrestrial realm may serve as practical
predictive models for restoration efforts. Water quality data and six
quantitative macroinvertebrate samples representing thirteen sites along the
Little Miami River in southwestern Ohio were collected in June/July 2007. A
suite of five macroinvertebrate indices was calculated for each sample. Land
cover was characterized for each site at five spatial scales ranging from the
entire catchment to local riparian segments. Catchments for each site were
delineated using ArcMap 6.0 software. Bivariate regression analysis was used to
compare macroinvertebrate indices to land use practices at the three riparian
zone spatial scales. In general, significant correlations were found at the
1000M and 200M riparian buffer segments with correlation coefficients increasing
as spatial scale decreased indicating local land use effects are the best
predictor of in-stream conditions. These results suggest restoration efforts
should focus on local scale riparian corridor characteristics to achieve highest
habitat quality.
Gwen Harpring* and Erin Lambka*, University of Dayton
The Pythagorean Theorem
We will present a brief history on Pythagoras and his theorem and show two
proofs of the Pythagorean Theorem.
Evan Hartman, University of Dayton
Random Walks on Z
A random walk is a formalization of the intuitive concept of taking successive
steps (or events), each in a random direction. We will introduce the concept of
random walks by focusing on a probabilistic interpretation of a one-dimensional
random walk on Z.
We will show an application to a simplified gambling game and consider questions
such as "What is the probability of finishing with a certain score?" and "What
is the probability of achieving a certain score and finishing with a certain
score?"
Karl Hess, Sinclair Community College
An Application of Analytic Geometry to Designing Machine Parts – and Dresses
This talk will address a problem in machine design that an engineer asked the
speaker to solve. The problem involves creating a flat pattern for a tubular
machine part. A three-dimensional coordinate system will be used, but anyone
with a solid understanding of trigonometry should be able to follow the
solution. The speaker will also reveal an unexpected connection to another
design problem.
Allison Horney*, Taylor Lowry*, Eric Schwenker, Evan Wray, Fairmont High School
A New Spin on Baseball!
All baseball fans know what a curveball is physically; but what is a curveball
mathematically, and how does it differ from a fastball? The secret of a pitch
lies in its spin. In this talk we will define the spin of a baseball and
investigate the effects of its magnitude and direction by using data collected
by MLB.com Gameday™ from the league’s best pitchers. We will then use this model
to differentiate between the spin of a curveball and that of a fastball.
Sarah Huggins, University of Dayton
An Everywhere Continuous but Nowhere Differentiable Function
It is commonly understood that differentiable functions are continuous. There
are, however, functions that are continuous everywhere but not differentiable at
certain points, such as the absolute value function, which is continuous but not
differentiable at zero. This paper explores the possibility of a function
that is continuous but not differentiable anywhere. In 1872, Karl Weierstrass
found such a function, and we will affirm his conclusions by finding a similar
function that is everywhere continuous but nowhere differentiable.
Kyle Kremer*, Joe Plattenburg*, Amanda Dahlman, Jesse DePinto, Fairmont High
School
Breaking the Curve
Imagine you are up to bat in a baseball game. Would you rather face a pitch
with smaller curvature or smaller break? Would you know the difference? In
this talk we will derive a model for the path of a pitch based on actual data
from MLB.com's Gameday™ feature. Using this model we will analyze the curvature
and break of the pitch.
Shelley Leber, University of Dayton
Mean of Real Numbers
The mean of real numbers is not so average after all. In this talk, we will
discuss the different types of means and how they are interrelated. We will
begin with the idea of a mean pertaining to two real numbers. In the end, we
will be able to find means involving more than two numbers.
Jenita Levine, University of Dayton
Who Has All the Gold Coins?
A sack of gold coins is stolen by a gang of nine thieves. If each thief
gets an equal share of the coins, then two coins remain. If one thief is caught
before the coins are divided so that each of the others get an equal share, then
one coin remains. If two of the thieves are caught before the coins are divided,
then each thief gets an equal share. Find the smallest number of coins in the
sack. This problem will be solved using linear congruences and the Chinese
Remainder Theorem.
Kerry McIver, John Carroll University
The Perfect Shuffle
We will demonstrate two different methods to determine how many riffles are
required to obtain the perfect shuffle using various sized decks.
Jeffrey Neugebauer, University of Dayton
Boundedness Properties of Solutions of Nonlinear
Volterra Integral Equations
Nonlinear Volterra integral equations are studied using the contraction mapping
principle as the primary mathematical tool. In particular, the existence of
bounded solutions of these equations are found using various boundedness
assumptions on a(t)
and a'(t).
Philip Pfeiffer*, Sudhindra Gadagkar and Peter Hovey, University of Dayton
Determining the Statistical Significance of Observed Frequencies of Short DNA
Motifs in a Genome
Until recently over 90 percent of the DNA
in the human genome was considered junk DNA having no known function. However,
this non-coding DNA is now known to harbor elements that perform important
functions in gene regulation. In particular, there is currently much interest in
the search for short DNA motifs collectively known as cis-regulatory elements.
Most studies attempt to identify these elements by means of cross-species
comparisons. We have approached the problem of finding cis-regulatory elements
by searching for conserved DNA motifs within genomes. This requires searching
for DNA motifs that are repeated in the genomes either more or less frequently
than expected by random chance. However, the statistical significance of any
observed frequency cannot be determined by the usual chi-squared test since
overlapping regions of the genome are checked for DNA motif matches. We have
developed a statistical measure to quantify the expectation and variance of the
frequency of a given DNA motif in a given target sequence.
Harrison Potter, Marietta College
Pricing the Asian Call Option
Stochastic calculus is applied to pricing a specific option, known as the
Asian call option, that arises in financial applications of probability theory.
By modeling the asset price as a geometric Brownian motion, the risk-neutral
conditional expectation representation of the option price is simplified to a
double integral involving an implicitly defined joint density function. An
approximation is then made that enables the exact price of a closely related
option to be calculated more explicitly. This latter result is strikingly
similar to the Black-Scholes-Merton formula. Robert Merton and Myron Scholes won
the 1997 Nobel Prize in Economics for this work, which serves as a model for our
approach to pricing the Asian call option.
Anne Rollick*, John Carroll University, and
Jessica Flores, Kimberly Jones, James Weigandt,
The Mordell-Weil Group of the Elliptic Curves
.
We will define elliptic curves, their ranks, and rational points and give
several important theorems. We will then look at the current rank records and
some results pertaining to curves of high rank.
Shawn
Ryan, University of Akron
A Buckling Problem for Graphene Sheets
We develop a continuum model that describes the elastic bending of a
graphene sheet, which is a hexagonal lattice of carbon atoms. The sheet
interacts with a rigid substrate by van der Waals forces. After describing
basic ideas about buckling and stability, we present a buckling problem for the
graphene sheet perpendicular to the substrate. After identifying a branch of
vertical solutions, we discuss the stability of solutions on this branch. Also
presented are the results of atomistic simulations. The simulations agree
qualitatively with the predictions of our continuum model but also suggest the
importance, for some problems, of developing a continuum description of the van
der Waals interaction that incorporates information on atomic positions.
Erin Shafer, University of Dayton
Property Distributions and Blending Predictions of JP-8 Fuel
We will provide a background on plans to blend JP-8 fuel with synthetic FT fuel
to produce cleaner fuels. We will discuss the distribution of the different
properties of JP-8 in the five regions of the United States over the past six
years. Using these distributions, we will determine if the properties of JP-8
fuel can be predicted for future years to determine the maximum amount of FT
fuel that can be safely blended with the JP-8 fuel.
Jinyang Sun, University of Dayton
A Basic Building Block in Life Insurance--Time-Until-Death Random Variable
T(x)
A basic problem in insurance is to determine the premium. To solve it, the basic
building block in life insurance, time-until-death random variable
T(x),will
be introduced. How to determine its distribution by life table will be discussed
and presented. It will be shown by examples how to use this random variable to
solve premium problems for life contingency insurance products.
Edward Timko, University of Dayton
Conditional Convergence of Integrals in Analogy to Series
The conditional convergence of the series
motivates
the study of the improper integral
.
In particular, the improper integral
is
defined, analyzed, and a process analogous to rearrangement of terms for
conditionally convergent series is described. For example, given
, we shall construct a
so-called rearrangement of the integral such that
.
Victor Velten, University of Dayton
The Mathematics Behind the Finite Element Method
The finite element method is used in a variety of simulations today. Also named
the finite volume method, it is a discretization technique that seeks to divide
a finite volume into discrete parts and solve the problem over all of the
pieces. This method ascribes to the idea that the whole is the sum of the
parts. In the presentation the basics and underlying theory surrounding the
finite element method are explored and then the method is applied to a basic
Poisson problem, a problem that has applications in electrostatics and various
potential fields. This talk assumes knowledge of the concepts of partial
derivatives, the gradient operator, and basic vector operations.
Kevin Ventullo, Illinois Institute of Technology
Silver Cubes
Let Kn be
a complete graph of order n. Let * denote a Cartesian product. Let I be a
maximum independent set in Kn*Kn*Kn.
A silver cube then is a coloring of all vertices (using 3n-2 colors) in Kn*Kn*Kn such
that the closed neighborhood of every vertex in I contains every color precisely
once. The problem can be restated visually in a somewhat friendlier way, bearing
a slight resemblance to a sudoku puzzle. If two cubes of size a and b exist,
then a cube of size ab is constructible. It is an open question whether any
silver cubes exist besides those where
.
The factor 7 was discovered this past summer using a method that will be
presented in the talk.
Brandon Weislak, Xavier University
Euler: Harmonious Mathematics
Euler outlined a "new music theory" in his lengthy Tentamen novae theoriae
musicae. This paper proposes to examine the fundamentals of Euler's theory, and
locate similar ideas in the theories of other musically minded mathematicians
such as d'Alembert, Descartes, Mersenne, and even the musical theories of the
ancient Greeks. Finally, we bring to light the legacy of such an important work
on music by situating the work in the context of modern music theory.
Emily Wheeler, University of Dayton
The Connection Between Similarity and Right Triangle Trigonometry
This talk begins with a statement of the definition of triangle similarity,
followed by the Angle-Angle-Angle (AAA) postulate for determining similarity.
Next, we provide a proof of an important property of proportions, which leads to
a discussion of the relationship between right triangle similarity and the
trigonometric functions of sine, cosine and tangent for acute angles.
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