elisa prato

  • P. Iglesias-Zemmour, E. Prato, Quasifolds, Diffeologies and Noncommutative Geometry, preprint (2020), 21 pages, to appear in J. Noncommut. Geom. (pdf)
  • F. Battaglia, E. Prato, D. Zaffran, Hirzebruch surfaces in a one-parameter family, Boll. Unione Mat. Ital. 12 (2019), 293-305 (pdf)
  • F. Battaglia, E. Prato, Nonrational Symplectic Toric Reduction, J. Geom. Phys. 135 (2019), 98-105 (pdf)
  • F. Battaglia, E. Prato, Nonrational Symplectic Toric Cuts, Internat. J. Math. 29 (2018), 19 pages (pdf)
  • E. Prato, Quasifolds, arXiv:1710.07116 [math.DG] (2017), 6 pages
  • F. Battaglia, E. Prato, Toric Geometry of the Regular Convex Polyhedra, J. Math. (2017), Article ID 2542796, 15 pages (pdf)
  • E. Prato, Symplectic toric geometry and the regular dodecahedron, J. Math. (2015), Article ID 967417, 5 pages (pdf)
  • F. Battaglia and E. Prato, Ammann Tilings in Symplectic Geometry, SIGMA 9 (2013), 021, 13 pages (pdf)
  • F. Battaglia and E. Prato, The Symplectic Penrose Kite, Comm. Math. Phys. 299 (2010), 577-601 (pdf)
  • E. Prato, Harmonics and Symplectic Geometry, preprint 2008 (pdf)
  • F. Battaglia and E. Prato, The Symplectic Geometry of Penrose Rhombus Tilings, J. Symplectic Geom. 6 (2008), 139-158 (pdf)
  • E. Prato, The Pentagram: from the Goddess to Symplectic Geometry, Proc. Bridges 2007, 123-126 (pdf)
  • F. Battaglia and E. Prato, Nonrational, Nonsimple Convex Polytopes in Symplectic Geometry, Electr. Res. Announc. Amer. Math. Soc. 8 (2002), 29-34
  • F. Battaglia and E. Prato, Generalized Toric Varieties for Simple Nonrational Convex Polytopes, Internat. Math. Res. Notices 24 (2001), 1315-1337
  • E. Prato, Simple Non-Rational Convex Polytopes via Symplectic Geometry, Topology 40 (2001), 961-975
  • E. Prato, Sur une généralisation de la notion de V-variété, C. R. Acad. Sci. Paris Sér. I Math. 328 (1999), 887-890
  • E. Prato, Convexity Properties of the Moment Map for Certain Non-Compact Manifolds, Comm. Anal. Geom. 2 (1994), 267-278
  • E. Prato and S. Wu, Duistermaat-Heckman Measures in a Non-Compact Setting, Compositio Math. 94 (1994), 113-128
  • V. Guillemin, E. Prato and R. Souza, Consequences of Quasifree, Ann. Global Anal. Geom. 8 (1990), 77-85
  • V. Guillemin and E. Prato, Heckman, Kostant, and Steinberg formulas for symplectic manifolds, Adv. Math. 82 (1990), 160-179

 

indietro