Non-split superstrings of dimension (1|2)

IF 1.2 3区数学 Q1 MATHEMATICS

Journal of Geometry and Physics Pub Date : 2025-06-27 DOI:10.1016/j.geomphys.2025.105579

Dimitry Leites , Alexander S. Tikhomirov

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引用次数: 0

Abstract

Any supermanifold diffeomorphic to one whose structure sheaf is the sheaf of sections of the exterior algebra of a vector bundle E over the underlying manifold M is called split. Gawȩdzki (1977) and Batchelor (1979) were the first to prove that any smooth supermanifold is split. In 1981, P. Green, and Palamodov, found examples of non-split analytic supermanifolds and described obstructions to splitness that were further studied by Manin (resp., Onishchik with his students) following Palamodov's (resp., Green's) approach. Following Palamodov, Donagi and Witten demonstrated that some of the moduli supervarieties of superstring theories are non-split. Except for arXiv:2210.17096, the odd parameters of supervarieties of obstructions to splitness were never considered. Here, using Palamodov's approach, we classify and describe the even (degree-2) and the odd (degree-1) obstructions to splitness of

(1 | 2)

-dimensional superstrings. In particular, we correct calculations of degree-2 obstructions due to Bunegina and Onishchik and confirm Manin's answer, but correct his description of the group

Aut (E)

查看原文本刊更多论文

维数为（1|2）的非分裂超弦

任何超流形的微分同构，其结构束是一个向量束E在其下流形M上的外部代数的截面束，称为分裂。Gawȩdzki（1977）和Batchelor（1979）首先证明了任何光滑超流形都是分裂的。1981年，P. Green和Palamodov发现了非分裂解析超流形的例子，并描述了分裂的障碍，这些障碍被Manin （resp.）进一步研究。（奥尼什奇克和他的学生）跟随帕拉莫多夫（发言）。（格林的）方法。继Palamodov之后，Donagi和Witten证明了超弦理论的一些模超变是非分裂的。除arXiv:2210.17096外，未考虑分裂障碍超变的奇参数。在这里，我们使用Palamodov的方法，对（1bbbb2）维超弦分裂的偶（2度）和奇（1度）障碍进行分类和描述。特别是，我们修正了由于Bunegina和Onishchik造成的2级障碍的计算，并确认了Manin的答案，但修正了他对Aut(E)群的描述。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Journal of Geometry and Physics 物理-物理：数学物理

CiteScore

2.90

自引率

6.70%

发文量

205

审稿时长

64 days

期刊介绍： The Journal of Geometry and Physics is an International Journal in Mathematical Physics. The Journal stimulates the interaction between geometry and physics by publishing primary research, feature and review articles which are of common interest to practitioners in both fields. The Journal of Geometry and Physics now also accepts Letters, allowing for rapid dissemination of outstanding results in the field of geometry and physics. Letters should not exceed a maximum of five printed journal pages (or contain a maximum of 5000 words) and should contain novel, cutting edge results that are of broad interest to the mathematical physics community. Only Letters which are expected to make a significant addition to the literature in the field will be considered. The Journal covers the following areas of research: Methods of: • Algebraic and Differential Topology • Algebraic Geometry • Real and Complex Differential Geometry • Riemannian Manifolds • Symplectic Geometry • Global Analysis, Analysis on Manifolds • Geometric Theory of Differential Equations • Geometric Control Theory • Lie Groups and Lie Algebras • Supermanifolds and Supergroups • Discrete Geometry • Spinors and Twistors Applications to: • Strings and Superstrings • Noncommutative Topology and Geometry • Quantum Groups • Geometric Methods in Statistics and Probability • Geometry Approaches to Thermodynamics • Classical and Quantum Dynamical Systems • Classical and Quantum Integrable Systems • Classical and Quantum Mechanics • Classical and Quantum Field Theory • General Relativity • Quantum Information • Quantum Gravity