- A Model Category Structure for Differential Graded Coalgebras Ezra Getzler and Paul Goerss \Lambda
- Moduli Spaces of Commutative Ring Spectra P. G. Goerss and M. J. Hopkins
- The Homology of Homotopy Inverse Limits by Paul G. Goerss 1
- MATH 360-2, Winter 2010 MENU Applied Analysis Project 3: The Wave Equation on a Drumhead
- A HOMOTOPY OPERATION SPECTRAL SEQUENCE FOR THE COMPUTATION OF HOMOTOPY GROUPS
- Associative MU-algebras Paul G. Goerss
- Contemporary Mathematics Andr e-Quillen (Co-)homology for Simplicial Algebras over
- MATH 360-1, Fall 2010 MENU Applied Analysis Graphing the solution of an ODE: A Test Example
- MATH 360-1, Fall 2010 MENU Applied Analysis Project 2: Tuning a System
- The Kervaire invariant in homotopy theory Mark Mahowald and Paul Goerss
- Moduli Problems for Structured Ring Spectra P. G. Goerss and M. J. Hopkins1
- MATH 360-1, Winter 2011 MENU Applied Analysis Syntax of Matlab Commands Project 3
- MATH 360-1, Fall 2010 MENU Applied Analysis Each question is worth 15 points.
- Contemporary Mathematics Hopf Rings, Dieudonn'e Modules, and E
- Seminaire BOURBAKI Mars 2009 61`eme annee, 2008-2009, no 1005
- MATH 360-2, Winter 2011 MENU Applied Analysis Practice Test 1
- MATH 360-1, Fall 2010 MENU Applied Analysis Instructor: Paul Goerss Lunt 206, office phone 491-8544.
- MATH 360-1, Fall 2010 MENU Applied Analysis Review Test 2
- The Adams-Novikov Spectral Sequence the Homotopy Groups of Spheres
- Annals of Mathematics, 162 (2005), 777822 A resolution of the K(2)-local sphere
- Quasi-coherent sheaves on the Moduli Stack of Formal Groups
- (Pre-)sheaves of Ring Spectra over the Moduli Stack of
- Realizing Families of Landweber Exact Homology Theories
- MATH 360-2, Winter 2011 MENU Applied Analysis Project 2: The Heat Equation on the Half-Infinite Line
- MATH 360-1, Fall 2010 MENU Applied Analysis Project 3: Disease and Epidemics
- MATH 360-1, Fall 2010 MENU Applied Analysis Test 1 Sample
- MATH 360-1, Fall 2010 MENU Applied Analysis Each question is worth 20 points.
- MATH 360-2, Winter 2011 MENU Applied Analysis Transport Problems
- MATH 360-2, Winter 2011 MENU Applied Analysis Problems about Heat
- MATH 360-2, Winter 2011 MENU Applied Analysis Below are few problems intended to get used to using Fourier series to solve
- MATH 360-1, Fall 2010 MENU Applied Analysis Global variables; multiple graphs on a single plot
- MATH 360-1, Fall 2010 MENU Applied Analysis MATLAB: Medicine in the bloodstream
- MATH 360-1, Fall 2010 MENU Applied Analysis Second Order ODEs
- MATH 360-2, Winter 2011 MENU Applied Analysis Instructor: Paul Goerss, Lunt 206
- MATH 360-2, Winter 2011 MENU Applied Analysis Project 1: Car Following and Collisions
- MATH 360-2, Winter 2011 MENU Applied Analysis Laplace Transform Review
- MATH 360-2, Winter 2011 MENU Applied Analysis Each question is worth 20 points.
- Localization theories for simplicial presheaves P.G Goerss and J.F. Jardine 1
- MATH 360-2, Winter 2011 MENU Applied Analysis Test 2 Sample
- MATH 360-2, Winter 2011 MENU Applied Analysis Basic Heat Formulas
- Spotlight on Modeling: The Possum Plague Reference: Sections 2.6, 7.2 and 7.3.
- MATH 360-2, Winter 2011 MENU Applied Analysis Each question is worth 20 points.
- Contemporary Mathematics Model Categories and Simplicial Methods
- Math 360 Menu Applied Analysis Guidelines for Projects
- MATH 360-1, Fall 2010 MENU Applied Analysis Project 1: Medication in the Bloodstream
- Topological Algebraic Geometry: A Workshop at
- Homotopy and Homology of Simplicial Abelian Hopf Algebras
- Brown-Gitler Spectra { Brown-Gitler spectra were introduced by E.H. Brown, Jr. and Samuel Gitler [1] to study higher order obstructions to immersions of manifolds, but immediately found wide applicability
- Homotopy Theory of Simplicial Abelian Hopf Algebras Paul Goerss 1 and James Turner
- Spotlight on Modeling: Coupled Springs Reference: Sections 3.1 and 6.4.
- Spotlight on Laplace's Equation Reference: Sections 10.1,10.2, and 10.5.
- PICARD GROUPS FOR THE PRIME 3 AND CHROMATIC LEVEL 2 PAUL GOERSS, HANS-WERNER HENN, MARK MAHOWALD AND CHARLES REZK
- THE RATIONAL HOMOTOPY OF THE K(2)-LOCAL SPHERE AND THE CHROMATIC SPLITTING CONJECTURE FOR THE PRIME 3
