Craig Guilbault
- Professor, Mathematical Sciences
Education
- PhD University of Tennessee, Knoxville, 1988
- BS, Northland College, Ashland, Wisconsin, 1982
Teaching Schedule
| Course Num | Title | Meets |
|---|---|---|
| MATH 232-401 | Calculus and Analytic Geometry II | MW 1:30pm-2:20pm |
| MATH 232-601 | Calculus and Analytic Geometry II | TR 1pm-2:15pm |
Research Interests
- Geometric Topology
- Geometric Group Theory
Selected Service and Projects
- Co-organizer of UWM Topology Seminars
- Co-organizer of Annual Workshop in Geometric Topology (1991 – Present)
- Editor of the journal Topology Proceedings
- Member of the Steering Committee for the Spring Topology and Dynamics Conference
Selected Publications
Guilbault, Craig R., Healy, Brendan B., and Pietsch, Brian. “Group boundaries for semidirect products with Z” Groups, Geometry, and Dynamicsto appear. (): 49 pages.
Guilbault, Craig R., and Moran, Molly A.“Coarse Z-boundaries for groups” Michigan Mathematical Journalto appear. (): 25 pages.
Guilbault, Craig R., Moran, Molly A., and Schreve, Kevin . “Compressible spaces and EZ-structures” Fundamenta Mathematicae256.1 (2022): 47-75.
Guilbault, Craig R., Calcut, Jack S., and Haggerty, Patrick V.“Extreme nonuniqueness of end-sum” Journal of Topology and Analysis14 (2022), no. 2.2 (2022): 461-503.
Guilbault, Craig R., and Gu, Shijie. “Compactifications of manifolds with boundary” Journal of Topology and Analysis12.4 (2020): 1073-1101.
Guilbault, Craig R., Geoghegan, Ross, and Mihalik, Michael . “Non co-compact group actions and pi_1-semistability at infinity” Canadian Journal of Mathematics 72.5 (2020): 1275-1303.
Guilbault, Craig R., Geoghegan, Ross, and Mihalik, Michael. “Topological properties of spaces admitting a coaxial homeomorphism” Algebraic & Geometric Topology20. (2020): 601-642.
Guilbault, Craig R., Moran, Molly, and Tirel, Carrie. “Boundaries of Baumslag-Solitar Groups” Algebraic & Geometric Topology19.4 (2019): 2077-2097.
Guilbault, Craig R., Moran, Molly A., and . “Proper homotopy types and Z-boundaries of spaces admitting geometric group actions” Expositiones Mathematicae37.3 (2019): 292-313.
Guilbault, Craig R., and Tinsley, Frederick C.“Manifolds that are inward tame at infinity” Pacific Journal of Mathmatics288.1 (2017): 87-128.
Guilbault, Craig R.“Ends, shapes and boundaries in manifold topology and geometric group theory” "Topology and Geometric Group Theory"184. Ed. Lafont, Jean-Francois, Leary, Ian J., Davis, Michael W., and Fowler, James. Berlin : Proceedings in Mathematics & Statistics (Springer). (2016): 45-125.
Guilbault, Craig R., and Mooney, C. P.“Boundaries of Croke–Kleiner-admissible groups and equivariant cell-like equivalence” Journal of Topology7. (2014): 849-868.
Guilbault, Craig R.“Weak Z-structures for some classes of groups” Algebraic & Geometric Topology14. (2014): 1123-1152.
Geoghegan, R., and Guilbault, Craig R.“Topological properties of spaces admitting free group actions” Journal of Topology5. (2012): 249-275.
Guilbault, Craig R.“A solution to de Groot's absolute cone conjecture” Topology46. (2007): 89-102.
Guilbault, Craig R., and Tinsley, F. C.“Manifolds with non-stable fundamental groups at infinity, III” Geometry & Topology10. (2006): 541-556.
Guilbault, Craig R., and Tinsley, F.. “Manifolds with non-stable fundamental groups at infinity, II” Geometry & Topology7. (2003): 255-286.
Guilbault, Craig R.“A non-Z-compactifiable polyhedron whose product with the Hilbert cube is Z-compactifiable” Fund. Math168. (2001): 165-197.
Guilbault, Craig R.“Manifolds with non-stable fundamental groups at infinity” Geometry & Topology4. (2000): 537-579.
Ancel, Fredric D., and Guilbault, Craig R.“Z-compactifications of open manifolds” Topology38. (1999): 1265-1280.