A first step towards Non-Archimedean Geometric Quantization
- 日時
- 2026年7月17日(金)14:00 - 15:30 (JST)
- 講演者
-
- 後藤 慶太 (理化学研究所 数理創造研究センター (iTHEMS) 数理基礎部門 基礎科学特別研究員)
- 会場
- セミナー室 (359号室) (メイン会場)
- via Zoom
- 言語
- 英語
- ホスト
- Yuto Yamamoto
Calabi--Yau manifolds have long attracted interest from both mathematics and physics, particularly in the context of mirror symmetry, and form an important class of compact Kähler manifolds. A compact Kähler manifold is Calabi--Yau if and only if it admits a Ricci-flat Kähler metric, which we shall call a CY metric. Such a metric is highly analytic in nature, as it is given as the solution to a second-order PDE on the manifold, namely the complex Monge--Ampère equation.
When the Calabi--Yau manifold is a complex projective variety, one algebraic approach to understanding this analytically defined CY metric is to approximate it by algebraically defined metrics called balanced metrics. This framework was initiated by Donaldson and is now known as geometric quantization.
In this talk, following the spirit of this theory, we consider a non-Archimedean analogue of this approximation theory. More precisely, for a non-Archimedean analytic space associated with a maximally degenerating family of Calabi--Yau manifolds, we study the approximation of the NACY metric, a non-Archimedean analogue of the CY metric, by algebraically defined metrics. In particular, we introduce NA balanced metrics, which are expected to provide such an approximation, and explain that, for totally degenerating families of abelian varieties, NA balanced metrics indeed approximate the NACY metric.
このイベントは研究者向けのクローズドイベントです。一般の方はご参加頂けません。メンバーや関係者以外の方で参加ご希望の方は、フォームよりお問い合わせ下さい。講演者やホストの意向により、ご参加頂けない場合もありますので、ご了承下さい。