These books are all will be on overnight reserve in Math-Physics-Astronomy library. You can also borrow copies of most of them from me, Your first source of reference should be your text. Look for something that interests you at the end of each section. There are references given there. Here are some more: Modeling Differential Equations in Biology; Clifford Henry Taubes; QH 323.5 T38 This is a very elementary mathematics text on systems of ordinary differential equations. Its main feature is a lot of Nature and Science papers using fairly elemenary mathematics. I recommend that you look at it! Its kind of fun at every level. Mathematical Models in Biology; Elizabeth S. Allman and John A. Rhodes; QH 323.5 A44 I put another text for a course like ours. This one has a different flavor.`This has a chapter on phylogenetic Trees.This was used as a text Mathematical models in Cell biology and cancer theorapy. Martin M. Eisen; QH581.2 E483 This book I don't know...it sounds really interesting. Let me know. Mathematical Physiology; James Keener and James Sneyd; QP33.6 M36K4 I recommend the first chapter of this text for anybody seriously interested in biochemistry. The book is rather advanced...so it is for the ambitious! Mathematical models in molecular and cellular biology; Lee A. Segel; QH506 M38 This is less advanced than Keener and Sneyd and goes into topics in our text, chapter 7 in more detail. Modeling dynamic phenomena in molectular and cellular biology; Lee A. Segel; QH506 S44 This has a lot about enzyme kinetics...I think it is probably easier to read than our text (but it only treats the biochemistry). Differential Equation Models; (Modules in Applied Mathematics) Martin Braun, Courtney Coleman and Donald Drew QA37.2 M6 This is a classic set of models which is accessible to calculus students. For a project which has simple math, this is ideal. Mathematical Biology; J.D. Murray; QH323.5 M88 The standard text in mathematical biology. I think the biology is less interesting than the biology in our text. Mathematics in Medicine and the Life Sciences; F.C. Hoppenstadt and C.S. Peskin; QH323.5 H67 Another book which is accessible to calculus students and ideal if you are looking for interesting problems using simple mathematics. A first course in chaotic dynamical systems; Robert L. Devaney; QA 6148.8 D49 For the mathematically inclined who would like to study the logistics equation in more detail. Nonlinear dynhamics and chaos:with applications in physics, biology, chemistry and engineering; Steven H. Strogatz; Q172.5 C45 S767 This is my favorite ordinary differential equations text. It has lots of great examples, but isn't so heavy on the biology. I recommend it to the physics students in the course. Dynamic Models in Biology; Stephen Ellner and John Guckenheimer Chapter 5 has some very basic information about dynamical systems. The book has a great many analyses of interesting behavior systems of ODE. Differential Equations,dynamical systems and Linear algebra Morris Hirsch and Steve Smale This is a rigorous mathematical treatment at a higher level that the lectures in this class. It is usually considered too difficult for undergraduate students, but it is a very good book.