SIGMA 8 (2012), 047, 7 pages      arXiv:1205.4664      https://doi.org/10.3842/SIGMA.2012.047 Contribution to the Special Issue “Mirror Symmetry and Related Topics” Mutations of Laurent Polynomials and Flat Families with Toric Fibers Nathan Owen Ilten Department of Mathematics, University of California, Berkeley CA 94720, USA Received May 21, 2012, in final form July 25, 2012; Published online July 28, 2012 Abstract We give a general criterion for two toric varieties to appear as fibers in a flat family over P1. We apply this to show that certain birational transformations mapping a Laurent polynomial to another Laurent polynomial correspond to deformations between the associated toric varieties. Key words: toric varieties; mirror symmetry; deformations; Newton polyhedra. pdf (334 kb)   tex (181 kb) References Altmann K., Hausen J., Polyhedral divisors and algebraic torus actions, Math. Ann. 334 (2006), 557-607, math.AG/0306285. Auroux D., Mirror symmetry and T-duality in the complement of an anticanonical divisor, J. Gökova Geom. Topol. GGT 1 (2007), 51-91, arXiv:0706.3207. Fulton W., Introduction to toric varieties, Annals of Mathematics Studies, Vol. 131, Princeton University Press, Princeton, NJ, 1993. Galkin S., Usnich A., Mutations of potentials, Preprint IPMU 10-0100. Ilten N.O., Vollmert R., Deformations of rational T-varieties, J. Algebraic Geom. 21 (2012), 531-562, arXiv:0903.1393. Mavlyutov A., Deformations of toric varieties via Minkowski sum decompositions of polyhedral complexes, arXiv:0902.0967.

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