کد مقاله | کد نشریه | سال انتشار | مقاله انگلیسی | نسخه تمام متن |
---|---|---|---|---|
4665079 | 1633788 | 2016 | 45 صفحه PDF | دانلود رایگان |
عنوان انگلیسی مقاله ISI
On Landau-Ginzburg models for quadrics and flat sections of Dubrovin connections
ترجمه فارسی عنوان
در مدل های لاندو-گینزبورگ برای چهارگوشه ها و بخش های مسطح اتصالات دوبروین
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کلمات کلیدی
موضوعات مرتبط
مهندسی و علوم پایه
ریاضیات
ریاضیات (عمومی)
چکیده انگلیسی
This paper proves a version of mirror symmetry expressing the (small) Dubrovin connection for even-dimensional quadrics in terms of a mirror-dual Landau-Ginzburg model (XËcan,Wq). Here XËcan is the complement of an anticanonical divisor in a Langlands dual quadric. The superpotential Wq is a regular function on XËcan and is written in terms of coordinates which are naturally identified with a cohomology basis of the original quadric. This superpotential is shown to extend the earlier Landau-Ginzburg model of Givental, and to be isomorphic to the Lie-theoretic mirror introduced in [36]. We also introduce a Laurent polynomial superpotential which is the restriction of Wq to a particular torus in XËcan. Together with results from [31] for odd quadrics, we obtain a combinatorial model for the Laurent polynomial superpotential in terms of a quiver, in the vein of those introduced in the 1990's by Givental for type A full flag varieties. These Laurent polynomial superpotentials form a single series, despite the fact that our mirrors of even quadrics are defined on dual quadrics, while the mirror to an odd quadric is naturally defined on a projective space. Finally, we express flat sections of the (dual) Dubrovin connection in a natural way in terms of oscillating integrals associated to (XËcan,Wq) and compute explicitly a particular flat section.
ناشر
Database: Elsevier - ScienceDirect (ساینس دایرکت)
Journal: Advances in Mathematics - Volume 300, 10 September 2016, Pages 275-319
Journal: Advances in Mathematics - Volume 300, 10 September 2016, Pages 275-319
نویسندگان
C. Pech, K. Rietsch, L. Williams,