![]() Her current research interests are in the middle of the spectrum from algebraic geometry to number theory, where techniques and motivation from one field may shed light on problems in another. Isabel Vogt will receive her PhD this summer from MIT, and has been visiting Stanford this academic year. Rouzbeh Yassini-Fard and Anousheh Ansari. The Mirzakhani Graduate Fellowship is funded by a generous endowment from Dr. ![]() Hannah has previously received several awards and recognitions, including the Intel STS Award, the Davidson Fellowship, the Alice Schaffer Award, and the Hertz Fellowship. Hannah also enjoys working as an instructor for the Stanford Elementary Math Circle. Her current research concerns vector bundles on families of rational curves more generally and the varieties that characterize how splitting types change. Her senior thesis studied normal bundles of lines on hypersurfaces, which provide a natural family of vector bundles on rational curves. Hannah first became interested in algebraic geometry as an undergraduate at Harvard, where she worked with Joe Harris. In particular, she is excited by intersection theory and its power to describe geometric objects. student at Stanford working in algebraic geometry with Ravi Vakil. These fellowships were established in memory of our former colleague, Professor Maryam Mirzakhani, allowing us to attract outstanding students, developing the next generation of world leaders in mathematics. To make a reservation, please contact the hotel of your choice directly.The Stanford Mathematics Department is pleased to announce that Hannah Larson is awarded the Maryam Mirzakhani Graduate Fellowship, and Isabel Vogt is awarded the Maryam Mirzakhani Postdoctoral Fellowship. ***Official hotels and agencies are not allowed to contact participants, unless he/she had already contact the hotel previously. ![]() We recommend strongly to apply for funding until March 31 st. ![]() There will be limited funding for the workshop, with a preference for young participants and participants from Latin America and developing countries. We plan to use the gathering of a vast number of mathematicians for the 2018 ICM in Rio de Janeiro as an opportunity to bring together international and local experts working on tropical geometry, moduli spaces, and nonarchimedean analytic geometry for a conference that will include research talks by leading experts along with mini-courses to help graduate students and early career mathematicians enter this young and very promising area of mathematics. At the same time, new algebraic foundations are emerging for scheme-theoretic tropical geometry, built out of the idempotent semirings studied by Brazilian mathematician and theoretical computer scientist Imre Simon. for counting curves with fixed invariants, and to prove degeneration formulas for logarithmic Gromov–Witten invariants as part of a broader program linking tropical geometry to mirror symmetry. These links explain many older correspondence theorems, from the beginnings of tropical enumerative geometry, and are being used to establish new correspondences and to prove new enumerative results of classical flavor, e.g. In just the past few years, there have been a number of significant advances in building explicit links between tropical geometry and the algebraic geometry of moduli spaces, especially for curves and abelian varieties, using skeletons of nonarchimedean analytic spaces as a bridge between the two. Satellite Conference to the ICM 2018 in Rio de Janeiro Cabo Frio, Rio de Janeiro, August 13 – 17, 2018. ![]()
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