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Experimental Mathematics Volume 30, 2021 - Issue 4
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Original Articles

On the Cohomology of Congruence Subgroups of GL3 over the Eisenstein Integers

Paul E. Gunnellsa Department of Mathematics and Statistics, University of Massachusetts, Amherst, MA, USACorrespondence[email protected]
ORCID Iconhttps://orcid.org/0000-0002-2742-3025View further author information
ORCID Icon,
Mark McConnellb Department of Mathematics, Princeton University, Princeton, NJ, USAView further author information
&
Dan Yasakic Department of Mathematics and Statistics, The University of North Carolina at Greensboro, Greensboro, NC, USAORCID Iconhttps://orcid.org/0000-0001-8179-8197View further author information
ORCID Icon
Pages 499-512 | Published online: 21 Jun 2019

References

  • [Ash 94] A. Ash. “Unstable Cohomology of SL(n,O).” J. Algebra 167:2 (1994), 330–342.
  • [Ash et al. 84] A. Ash, D. Grayson, and P. Green. “Computations of Cuspidal Cohomology of Congruence Subgroups of SL(3,Z).” J. Number Theory 19:3 (1984), 412–436.
  • [Ash et al. 02] A. Ash, P. E. Gunnells, and M. McConnell. “Cohomology of Congruence Subgroups of SL4(Z).” J. Number Theory 94:1 (2002), 181–212.
  • [Ash et al. 08] A. Ash, P. E. Gunnells, and M. McConnell. “Cohomology of Congruence Subgroups of SL(4,Z). II.” J. Number Theory 128:8 (2008), 2263–2274.
  • [Ash et al. 10] A. Ash, P. E. Gunnells, and M. McConnell. “Cohomology of Congruence Subgroups of SL4(Z). III.” Math. Comput. 79:271 (2010), 1811–1831.
  • [Ash et al. 11] A. Ash, P. E. Gunnells, and M. McConnell. “Torsion in the Cohomology of Congruence Subgroups of SL(4,Z) and Galois Representations.” J. Algebra 325 (2011), 404–415.
  • [Borel and Serre 73] A. Borel and J.-P. Serre. “Corners and Arithmetic Groups.” Comment. Math. Helv. 48 (1973), 436–491. Avec un appendice: Arrondissement des variétés à coins, par A. Douady et L. Hérault.
  • [Borel and Wallach 80] A. Borel and N. R. Wallach. Continuous Cohomology, Discrete Subgroups, and Representations of Reductive Groups, Annals of Mathematics Studies, vol. 94. Princeton, NJ/Tokyo: Princeton University Press/University of Tokyo Press, 1980.
  • [Bosma et al. 97] W. Bosma, J. Cannon, and C. Playoust. “The Magma Algebra System. I. The User Language.” J. Symbolic Comput. 24:3–4 (1997), 235–265. Computational Algebra and Number Theory (London, 1993).
  • [Bygott 98] J. Bygott. “Modular Forms and Modular Symbols over Imaginary Quadratic Fields.” Ph.D. thesis, Exeter University, 1998.
  • [Cremona 84] J. E. Cremona. “Hyperbolic Tessellations, Modular Symbols, and Elliptic Curves over Complex Quadratic Fields.” Compos. Math. 51:3 (1984), 275–324.
  • [Cremona 92] J. E. Cremona. “Abelian Varieties with Extra Twist, Cusp Forms, and Elliptic Curves over Imaginary Quadratic Fields.” J. Lond. Math. Soc. (2) 45:3 (1992), 404–416.
  • [Cremona and Whitley 94] J. E. Cremona and E. Whitley. “Periods of Cusp Forms and Elliptic Curves over Imaginary Quadratic Fields.” Math. Comput. 62:205 (1994), 407–429.
  • [Donnelly et al. 15] S. Donnelly, P. E. Gunnells, A. Klages-Mundt, and D. Yasaki. “A Table of Elliptic Curves over the Cubic Field of Discriminant –23.” Exp. Math. 24:4 (2015), 375–390.
  • [Dutour Sikirić et al. 16] M. Dutour Sikirić, H. Gangl, P. E. Gunnells, J. Hanke, A. Schürmann, and D. Yasaki. “On the Cohomology of Linear Groups over Imaginary Quadratic Fields.” J. Pure Appl. Algebra 220:7 (2016), 2564–2589.
  • [Elbaz-Vincent et al. 13] P. Elbaz-Vincent, H. Gangl, and C. Soulé. “Perfect Forms, K-Theory and the Cohomology of Modular Groups.” Adv. Math. 245 (2013), 587–624.
  • [Elstrodt et al. 98] J. Elstrodt, F. Grunewald, and J. Mennicke. Groups Acting on Hyperbolic Space: Harmonic Analysis and Number Theory, Springer Monographs in Mathematics. Berlin: Springer-Verlag, 1998. .
  • [Franke 98] J. Franke. “Harmonic Analysis in Weighted L2-Spaces.” Ann. Sci. École Norm. Sup. (4) 31:2 (1998), 181–279.
  • [Goldfeld 15] D. Goldfeld. Automorphic Forms and L-Functions for the Group GL(n,R), Cambridge Studies in Advanced Mathematics, vol. 99. Cambridge: Cambridge University Press, 2015. With an Appendix by Kevin A. Broughan, Paperback Edition of the 2006 Original [MR2254662].
  • [Goldfeld and Hundley 11a] D. Goldfeld and J. Hundley. Automorphic Representations and L-Functions for the General Linear Group. Volume I, Cambridge Studies in Advanced Mathematics, vol. 129. Cambridge: Cambridge University Press, 2011a. With Exercises and a Preface by Xander Faber.
  • [Goldfeld and Hundley 11b] D. Goldfeld and J. Hundley. Automorphic Representations and L-Functions for the General Linear Group. Volume II, Cambridge Studies in Advanced Mathematics, vol. 130. Cambridge: Cambridge University Press, 2011b. With Exercises and a Preface by Xander Faber.
  • [Grunewald et al. 78] F. Grunewald, H. Helling, and J. Mennicke. “SL2 over Complex Quadratic Number Fields. I.” Algebra Logika 17:5 (1978), 512–580, 622.
  • [Gunnells 00] P. E. Gunnells. “Computing Hecke Eigenvalues Below the Cohomological Dimension.” Exp. Math. 9:3 (2000), 351–367.
  • [Gunnells et al. 13] P. E. Gunnells, F. Hajir, and D. Yasaki. “Modular Forms and Elliptic Curves over the Field of Fifth Roots of Unity.” Exp. Math. 22:2 (2013), 203–216.
  • [Gunnells and Yasaki 08] P. E. Gunnells and D. Yasaki. “Hecke Operators and Hilbert Modular Forms.” In Algorithmic Number Theory, Lecture Notes in Comput. Sci., vol. 5011, pp. 387–401. Berlin: Springer, 2008.
  • [Gunnells and Yasaki 13] P. E. Gunnells and D. Yasaki. “Modular Forms and Elliptic Curves over the Cubic Field of Discriminant −23.” Int. J. Number Theory 9:1 (2013), 53–76.
  • [Harder 91] G. Harder. “Eisenstein Cohomology of Arithmetic Groups and Its Applications to Number Theory.” In Proceedings of the International Congress of Mathematicians, Vol. I, II (Kyoto, 1990), pp. 779–790. Tokyo: Mathematical Society of Japan, 1991.
  • [Harris et al. 16] M. Harris, K.-W. Lan, R. Taylor, and J. Thorne. “On the Rigid Cohomology of Certain Shimura Varieties.” Res. Math. Sci. 3 (2016), 37.
  • [Jones 16] A. Jones. “Modular Elliptic Curves over the Field of Twelfth Roots of Unity.” LMS J. Comput. Math. 19:1 (2016), 155–174.
  • [Lingham 05] M. Lingham. “Modular Forms and Elliptic Curves over Imaginary Quadratic Fields.” Ph.D. thesis, University of Nottingham, 2005.
  • [Reeder 91] M. Reeder. “Old Forms on GLn.” Amer. J. Math. 113:5 (1991), 911–930.
  • [Scholze 15] P. Scholze. “On Torsion in the Cohomology of Locally Symmetric Varieties.” Ann. Math. (2) 182:3 (2015), 945–1066.
  • [Staffeldt 79] R. E. Staffeldt. “Reduction Theory and K3 of the Gaussian Integers.” Duke Math. J. 46:4 (1979), 773–798.
  • [The LMFDB Collaboration 13] The LMFDB Collaboration. The L-Functions and Modular Forms Database. Available at http://www.lmfdb.org, 2013.
  • [van Geemen et al. 97] B. van Geemen, W. van der Kallen, J. Top, and A. Verberkmoes. “Hecke Eigenforms in the Cohomology of Congruence Subgroups of SL(3,Z).” Exp. Math. 6:2 (1997), 163–174.
  • [Watkins 11] M. Watkins. Computing with Hecke Grössencharacters, Actes de la Conférence “Théorie des Nombres et Applications”, Publ. Math. Besançon Algèbre Théorie Nr., vol. 2011, pp. 119–135. Besançon: Presses Univ. Franche-Comté, 2011.

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