Koss, Lorelei. Ordinary Differential Equations and Easter Island: A Survey of Recent Research Developments on the Relationship Between Humans, Trees, and Rats. European Journal of Mathematics (Article published online April...
Published as:Hawkins, Jane and Lorelei Koss. Parametrized Dynamics of the Weierstrass Elliptic Function. Conformal Geometry and Dynamics 8, no. 1 (2004): 1-35. For more information on the published version, visit American...
We analyze the dynamics of a sequence of families of non-polynomial rational maps, {f a,d }, for a ∈ C* = C \ {0}, d ≥ 2. For each d, {f a,d } is a family of rational maps of degree d of the Riemann sphere parametrized by a ∈...
For more information on the published version, visit American Mathematical Society's (AMS) Website. See also: Furno, Joanna, and Lorelei Koss. Relating Singularly Perturbed Rational Maps to Families of Entire Maps. In...
We analyze the existence and types of unbounded Fatou components for elliptic functions and other meromorphic functions with doubly periodic Julia sets. We show that apart from Herman rings and Siegel disks, all types of...
Published as:Koss, Lorelei. Sustainability in a Differential Equations Course: A Case Study of Easter Island. International Journal of Mathematical Education in Science & Technology, 42, no.. 4 (2011): 545-53. For more...
The mathematical study of frieze symmetry in art is well established; to date, scholarship has focused primarily on historical artefacts or traditional crafts. Here, we apply established tools to an emerging craft of a global...
This is the third paper in a series to connect ideas from differential equations to relevant and interesting material from the arts and humanities. Here, we discuss connections between differential equations and the creation,...
The author describes a first-year seminar in cryptology with three major assignments which were planned to help students develop information literacy, oral presentation, and writing skills. and Published as:Koss, Lorelei....