{"title":"Axialgravisolitons at infinite corner","authors":"Federico Manzoni","doi":"10.1088/1361-6382/ad61b5","DOIUrl":null,"url":null,"abstract":"\n Gravitational solitons (gravisolitons) are particular exact solutions of Einstein field equation in vacuum build on a given background solution. Their interpretation is not yet fully clear but they contain many of the physically relevant solutions low N-solitons solutions. However, a systematic study and characterization of gravisolitons solution for every N is lacking and their relevance in a theory of quantum gravity is not fully understood. This work aims to investigate and characterize some properties of N-axialsoliton solutions such as their asymptotically behaviour and asymptotic symmetries given minimal assumptions on the background metric. We develop an explicit systematic asymptotically expansion for the N-axialsoliton solution and we compute the leading order of the asymptotic killing vectors. Moreover, in the perspective to better understand the role of gravisolitons in quantum gravity we make a link, and a one of the first explicit test, to the corner symmetry proposal deriving which subalgebra of the universal corner symmetry algebra is generated by the asymptotic Killing vectors of N-axialsoliton solution. In the spirit of the corner proposal, the axialgravisoliton corner symmetry algebra (agcsa) can be useful for the quantization of the non-asymptotically flat sector of gravity while, in the spirit of IR triangle, new soft theorems and memory effects could emerge.","PeriodicalId":505126,"journal":{"name":"Classical and Quantum Gravity","volume":null,"pages":null},"PeriodicalIF":0.0000,"publicationDate":"2024-07-10","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"Classical and Quantum Gravity","FirstCategoryId":"1085","ListUrlMain":"https://doi.org/10.1088/1361-6382/ad61b5","RegionNum":0,"RegionCategory":null,"ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"","JCRName":"","Score":null,"Total":0}
引用次数: 0
Abstract
Gravitational solitons (gravisolitons) are particular exact solutions of Einstein field equation in vacuum build on a given background solution. Their interpretation is not yet fully clear but they contain many of the physically relevant solutions low N-solitons solutions. However, a systematic study and characterization of gravisolitons solution for every N is lacking and their relevance in a theory of quantum gravity is not fully understood. This work aims to investigate and characterize some properties of N-axialsoliton solutions such as their asymptotically behaviour and asymptotic symmetries given minimal assumptions on the background metric. We develop an explicit systematic asymptotically expansion for the N-axialsoliton solution and we compute the leading order of the asymptotic killing vectors. Moreover, in the perspective to better understand the role of gravisolitons in quantum gravity we make a link, and a one of the first explicit test, to the corner symmetry proposal deriving which subalgebra of the universal corner symmetry algebra is generated by the asymptotic Killing vectors of N-axialsoliton solution. In the spirit of the corner proposal, the axialgravisoliton corner symmetry algebra (agcsa) can be useful for the quantization of the non-asymptotically flat sector of gravity while, in the spirit of IR triangle, new soft theorems and memory effects could emerge.
引力孤子(gravvisolitons)是建立在给定背景解基础上的爱因斯坦真空场方程的特殊精确解。对它们的解释还不完全清楚,但它们包含了许多与物理相关的低 N 孤子解。然而,目前还缺乏对每一个 N 的引力索解的系统研究和特征描述,对它们在量子引力理论中的相关性也不完全了解。这项工作旨在研究和描述 N 轴玻色子解的一些特性,如它们的渐近行为和渐近对称性,前提是对背景度量的最小假设。我们为 N-axialsoliton 解建立了明确的系统渐近展开,并计算了渐近杀伤向量的前阶。此外,为了更好地理解引力子在量子引力中的作用,我们首次明确检验了角对称性提议,推导出 N-axialsoliton 解的渐近基林向量生成了通用角对称性代数的哪个子代数。本着拐角提议的精神,轴向索里顿拐角对称代数(agcsa)可用于引力非渐近平坦扇形的量子化,而本着红外三角的精神,新的软定理和记忆效应可能会出现。