Math @ Duke

Books
 Getz, J; Goresky, M, Hilbert modular forms with coefficients in intersection homology and quadratic base change,
in Progress in Mathematics, vol. 298
(January, 2012),
pp. 1256, Springer Science & Business Media, ISBN 9783034803519 [doi] [abs]
 Getz, J; Goresky, M, Introduction, vol. 298
(January, 2012),
pp. 119 [doi] [abs]
Papers Published
 Getz, JR, A fourvariable automorphic kernel function,
Research in the Mathematical Sciences, vol. 3 no. 1
(December, 2016) [doi]
 Getz, JR; Herman, PE, A nonabelian trace formula,
Research in the Mathematical Sciences, vol. 2 no. 1
(2015) [doi] [abs]
 Getz, JR; Klassen, J, Isolating RankinSelberg lifts,
Proceedings of the American Mathematical Society, vol. 143 no. 8
(2015),
pp. 33193329, ISSN 00029939 [doi]
 Getz, JR; Hahn, H, A general simple relative trace formula,
Pacific Journal of Mathematics, vol. 277 no. 1
(2015),
pp. 99118, ISSN 00308730 [doi]
 Getz, JR; Hahn, H, Algebraic cycles and tate classes on hilbert modular varieties,
International Journal of Number Theory, vol. 10 no. 1
(2014),
pp. 161176, ISSN 17930421 [doi] [abs]
 Getz, JR; Wambach, E; Getz, JR; Wambach, E, Twisted relative trace formulae with a view towards unitary groupsTwisted relative trace formulae with a view towards unitary groups,
American Journal of Mathematics, vol. 136
(January, 2014),
pp. 157, Johns Hopkins University Press: American Journal of Mathematics [abs]
 Getz, J; Goresky, M, Eisenstein series with coefficients in intersection homology,
in Progress in Mathematics, vol. 298
(January, 2012),
pp. 179182 [doi] [abs]
 Getz, J; Goresky, M, Generalities on Hilbert modular forms and varieties,
in Progress in Mathematics, vol. 298
(January, 2012),
pp. 5789 [doi] [abs]
 Getz, J; Goresky, M, The full version of theorem 1.3,
in Progress in Mathematics, vol. 298
(January, 2012),
pp. 167177 [doi] [abs]
 Getz, J; Goresky, M, Automorphic vector bundles and local systems,
in Progress in Mathematics, vol. 298
(January, 2012),
pp. 91110 [doi] [abs]
 Getz, J; Goresky, M, Review of chains and cochains,
in Progress in Mathematics, vol. 298
(January, 2012),
pp. 2128 [doi] [abs]
 Getz, J; Goresky, M, The automorphic description of intersection cohomology,
in Progress in Mathematics, vol. 298
(January, 2012),
pp. 111134 [doi] [abs]
 Getz, J; Goresky, M, Explicit construction of cycles,
in Progress in Mathematics, vol. 298
(January, 2012),
pp. 151166 [doi] [abs]
 Getz, J; Goresky, M, Review of intersection homology and cohomology,
in Progress in Mathematics, vol. 298
(January, 2012),
pp. 2939 [doi] [abs]
 Getz, J; Goresky, M, Review of arithmetic quotients,
in Progress in Mathematics, vol. 298
(January, 2012),
pp. 4155 [doi] [abs]
 Getz, J; Goresky, M, Hilbert modular forms with coefficients in a Hecke module,
in Progress in Mathematics, vol. 298
(January, 2012),
pp. 135150 [doi] [abs]
 Getz, JR, An approach to nonsolvable base change and descent,
Journal of the Ramanujan Mathematical Society, vol. 27 no. 2
(2012),
pp. 143211 [pdf] [abs]
 Getz, J, Intersection numbers of Hecke cycles on Hilbert modular varieties,
American Journal of Mathematics, vol. 129 no. 6
(2007),
pp. 16231658, ISSN 00029327 [doi] [abs]
 S. Basha, J.R. Getz, H. Nover and E. Smith, Systems of orthogonal polynomials arising from the modular jfunctions,
J. Math. Anal. Appl., vol. 289 no. 1
(2004),
pp. 336354
 Getz, J, A generalization of a theorem of Rankin and SwinnertonDyer on zeros of modular forms,
Proceedings of the American Mathematical Society, vol. 132 no. 8
(2004),
pp. 22212231, ISSN 00029939 [doi] [abs]
 Basha, S; Getz, J; Nover, H; Smith, E, Systems of orthogonal polynomials arising from the modular jfunction,
Journal of Mathematical Analysis and Applications, vol. 289 no. 1
(2004),
pp. 336354, ISSN 0022247X [doi] [abs]
 Getz, J; Mahlburg, K, Partition identities and a theorem of Zagier,
Journal of Combinatorial Theory, Series A, vol. 100 no. 1
(2002),
pp. 2743, ISSN 00973165 [doi] [abs]
 Getz, J, Extension of a theorem of Kiming and Olsson for the partition function,
Ramanujan Journal, vol. 5 no. 1
(2001),
pp. 4751 [doi] [abs]
 J.R. Getz, On congruence properties of the partition function,
Int. J. Math. Math. Sci., vol. 23 no. 7
(2000),
pp. 493496
Papers Submitted
 Getz, JR, Nonabelian fourier transforms for spherical representations,
Pacific Journal of Mathematics, vol. 294 no. 2
(January, 2018),
pp. 351373, Mathematical Sciences Publishers [doi] [abs]
 J.R. Getz, Automorphic kernel functions in four variables
(2014)
 Getz, JR, Invariant four variable automorphic kernel functions,
arXiv
(2014) [abs]


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ph: 919.660.2800
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Mathematics Department
Duke University, Box 90320
Durham, NC 277080320

