Projective geometry of $3$-Sasaki structures
A.R. Gover, K. Neusser, "Projective geometry of $3$-Sasaki structures," (submitted). arXiv:2204.08384
(arXiv:2204.08384)
Publications
Chains of path geometries on surfaces: theory and examples
G. Bor, T. Willse, "Chains of path geometries on surfaces: theory and examples," Israel J. Math (to appear). arXiv:2201.09141
(arXiv:2201.09141)
Projective geometry of Sasaki–Einstein structures and their compactification
A.R. Gover, K. Neusser, T. Willse, "Projective geometry of Sasaki–Einstein structures and their compactification," Dissertationes Math. 546 (2019): 1–64 doi:10.4064/dm786-7-2019 arXiv:1803.09531
(impan.pl | arXiv:1803.09531)
Homogeneous real $(2, 3, 5)$ distributions with isotropy
T. Willse, "Homogeneous real $(2, 3, 5)$ distributions with isotropy," Symmetry Integrability Geom. Methods Appl. 15(8) (2019): 28 pp. doi:10.3842/SIGMA.2019.008 arXiv:1807.02734
(emis.de | arXiv:1807.02734)
Cartan’s incomplete classification and an explicit ambient metric of holonomy $G_2^*$
T. Willse, "Cartan's incomplete classification and an explicit ambient metric of holonomy $G_2^*$," Eur. J. Math 4 (2018): 622–638. doi:10.1007/s40879-017-0178-9 arXiv:1411.7172
(springer.com | arXiv:1411.7172)
Nearly Kähler geometry and $(2, 3, 5)$-distributions via projective holonomy
A.R. Gover, R. Panai, T. Willse, "Nearly Kähler Geometry and $(2,3,5)$-Distributions via Projective Holonomy," Indiana Univ. Math. J. 66(4) (2017): 1351–1416. doi:10.1512/iumj.2017.66.6089 arXiv:1403.1959
(iumj.indiana.edu | arXiv:1403.1959)
The almost Einstein operator for $(2, 3, 5)$ distributions
K. Sagerschnig, T. Willse, "The almost Einstein operator for $(2, 3, 5)$ distributions," Arch. Math. (Brno) 53(5) (2017): 347–370. doi:10.5817/AM2017-5-347 arXiv:1705.00996
(dml.cz | arXiv:1705.00996)
The Geometry of Almost Einstein $(2, 3, 5)$ Distributions
K. Sagerschnig, T. Willse, "The Geometry of Almost Einstein $(2, 3, 5)$ Distributions," Symmetry Integrability Geom. Methods Appl. 13(4) (2017): 56 pp. doi:10.3842/SIGMA.2017.004 arXiv:1201.2670
(emis.de | arXiv:1201.2670)
Correction of non-intrusive drill core physical properties data for variability in recovered sediment volume
M.H. Walczak, A.C. Mix, T. Willse, A. Slagle, J.S. Stoner, J. Jaeger, S. Gulick, L. LeVay, Arata Kioka, the IODP Expedition 341 Scientific Party, "Correction of non-intrusive drill core physical properties data for variability in recovered sediment volume," Geophys. J. Int. 202(2) (2015): 1317–1323. doi:10.1093/gji/ggv204
(academic.oup.com)
Highly symmetric $2$-plane fields on $5$-manifolds and $5$-dimensional Heisenberg group holonomy
T. Willse, "Highly symmetric $2$-plane fields on $5$-manifolds and $5$-dimensional Heisenberg group holonomy," Differential Geom. Appl. 33 (Supp.) (2014): 81–111. doi:10.1016/j.difgeo.2013.10.010 arXiv:1302.7163
(sciencedirect.com | arXiv:1302.7163)
Parallel tractor extension and ambient metrics of holonomy split $G_2$
C.R. Graham, T. Willse, "Parallel tractor extension and ambient metrics of holonomy split $G_2$," J. Differential Geom. 92(3) (2012): 463–506. doi:10.4310/jdg/1354110197 arXiv:1109.3504
(projecteuclid.org | arXiv:1109.3504)
Subtleties concerning conformal tractor bundles
C.R. Graham, T. Willse, "Subtleties concerning conformal tractor bundles," J. Differential Geom. 92(3) (2012): 1721–1732. doi:10.2478/s11533-012-0093-8 arXiv:1201.2670
(degruyter.com | arXiv:1201.2670)
Parallel tractor extension and metrics of split $G_2$ holonomy [Ph.D. thesis]
T. Willse, "Parallel tractor extension and metrics of split $G_2$ holonomy," University of Washington Ph.D. thesis (2011).
(pdf)