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3–4, 607–628.  B. Fu, A survey on symplectic singularities and resolutions, Ann. Math. Blaise Pascal 13 (2006), no. 2, 209–236. L. Gan and V. Ginzburg, Almost-commuting variety, D-modules, and Cherednik Algebras, with an appendix by Ginzburg, IMRP Int. Math. Res. Pap. (2006), 26439, 1–54.  V. , 9 (2003), 379–407.  V. , Represent. Theory 13 (2009), 236–271.  V. Ginzburg, N. Guay, E. Opdam and R. Rouquier, On the category O for rational Cherednik algebras, Invent. , 154 (2003), 617–651.
FM4] Farb, Benson; Mosher, Lee. Problems on the geometry of finitely generated solvable groups. Crystallographic groups and their generalizations (Kortrijk, 1999) , 121–134, Contemp. , 262, Amer. Math. , Providence, RI, 2000. [FP] Fisher, D; Peng, I; Geometry of rank one solvable Lie groups, in preparation. [Gr1] Gromov, Mikhael. Groups of polynomial growth and expanding maps. Inst. ´ Hautes Etudes Sci. Publ. Math. No. 53 (1981), 53–73. [Gr2] Gromov, Mikhael. Infinite groups as geometric objects.
82 (1995), 133–168 (1996). [S2] Schwartz, Richard Evan. Quasi-isometric rigidity and Diophantine approximation. Acta Math. 177 (1996), no. 1, 75–112. [Sh] Shalom, Yehuda. Harmonic analysis, cohomology, and the large-scale geometry of amenable groups. Acta Math. 192 (2004), no. 2, 119–185. [SX] Shanmugalingam,Nageswari; Xie,Xiangdong. A Rigidity Property of Some Negatively Curved Solvable Lie Groups. Preprint. ; Woess, Wolfgang. Amenability, unimodularity, and the spectral radius of random walks on infinite graphs.