Beilinson-Drinfeld Grassmannians and chiral algebras in differential geometry

微分几何中的 Beilinson-Drinfeld Grassmannians 和手性代数

• 批准号: RGPIN-2020-04845
• 负责人: Borisov, Dennis
• 金额: $ 1.31万
• 依托单位: University of Windsor
• 依托单位国家: 加拿大
• 项目类别: Discovery Grants Program - Individual
• 财政年份: 2020
• 资助国家: 加拿大
• 起止时间: 2020-01-01 至 2021-12-31
• 项目状态: 已结题
• 来源: https://www.nserc-crsng.gc.ca/ase-oro/Details-Detailles_eng.asp?id=717436
• 关键词: Beilinson; Drinfeld; Grassmannians; chiral; algebras

This proposal is for obtaining support for my ongoing research in developing a theory and constructing interesting examples of chiral algebras (equivalently known as factorization algebras) in the setting of differential geometry. This research is in collaboration with professor Kobi Kremnizer (University of Oxford, UK). It is well known that in quantum Physics one cannot measure simultaneously the position and the momentum of a particle. This is the famous indeterminacy principle. However, this principle does not imply that there are no laws of Physics on the quantum level. One way to describe these laws is to use smearing, i.e. to view observables not as functions, but as functionals on test functions defined on the space-time. Such formulation leads to very rich algebraic structures, that encode independence of measurements that are performed far away from each other. In quantum physics such formulation is usually called algebraic quantum field theory. In mathematical setting these algebraic structures are called factorization algebras (there is an equivalent reformulation in term of chiral algebras). Under the name of vertex operator algebras they were known for more than 30 years, and in the 1990's a geometric formulation (chiral algebras) was introduced by A.Beilinson and V.Drinfeld. The work of Beilinson and Drinfeld is within algebraic geometry, and this limits in their method of constructing chiral algebras the possible dimension of the space-time to 2. In our research, we are constructing non-trivial examples of chiral algebras in differential geometry. Switching to differential geometry immediately removes the limit on dimension, but introduces many other problems. Some of them we have already solved, others are still a work in progress. The overall direction of this research is towards formulating an algebraic quantum field theory on a 4-dimensional space-time. This problem is open for at least two generations now, and we do not claim to be close to a solution. However, we like to have this challenge in mind to give a direction to our research. Our approach is through adapting the algebraic-geometric techniques of Beilinson and Drinfeld to differential geometry. Different from algebraic geometry objects in differential geometry are described not by polynomial rings but by rings of smooth functions. There are many differences between these two kinds of rings, for example infinitesimals are considerably more complicated in the case of rings of smooth functions. However, we were able to adapt enough of the algebraic-geometric techniques of Beilinson and Drinfeld to make it possible to construct a whole new class of examples of non-trivial chiral algebras.

这个提议是为了支持我正在进行的研究，即在微分几何的背景下发展一个理论并构造手征代数（等价地称为因子分解代数）的有趣例子。这项研究是与Kobi Kremnizer教授（英国牛津大学）合作进行的。 众所周知，在量子物理学中，人们不能同时测量粒子的位置和动量。这就是著名的不确定性原理。然而，这一原理并不意味着在量子层面上没有物理定律。描述这些定律的一种方法是使用涂抹，即不将可观测量视为函数，而是将其视为定义在时空上的测试函数的泛函。 这样的公式导致非常丰富的代数结构，其编码远离彼此执行的测量的独立性。在量子物理学中，这种表述通常被称为代数量子场论。在数学上，这些代数结构被称为因子分解代数（在手征代数方面有一个等价的重新表述）。在顶点算子代数的名义下，它们已经被认识了30多年，在20世纪90年代，A.Beilinson和V. Drinfeld引入了一个几何公式（手征代数）。 贝林森和德林费尔德的工作是在代数几何中，这限制了他们构造手征代数的方法，时空的可能维数为2。在我们的研究中，我们正在构造微分几何中手征代数的非平凡例子。切换到微分几何立即消除了对尺寸的限制，但引入了许多其他问题。其中一些我们已经解决了，其他的仍在进行中。 这项研究的总体方向是制定一个代数量子场论的4维时空。这个问题至少已经持续了两代人的时间，我们并不声称已经接近解决方案。然而，我们希望记住这一挑战，为我们的研究指明方向。 我们的方法是将贝林森和德林菲尔德的代数几何技术应用于微分几何。与代数几何不同的是，微分几何中的对象不是用多项式环来描述，而是用光滑函数环来描述。这两种环之间有许多不同之处，例如无穷小在光滑函数环的情况下要复杂得多。然而，我们能够适应足够的代数几何技术的贝林森和德林费尔德，使之有可能构建一个全新的一类的例子，非平凡手征代数。