A Generalized Positive Energy Theorem for Spaces with Asymptotic SUSY Compactification
Naqing Xie
TL;DR
This paper proves a generalized positive energy theorem for spaces with asymptotic supersymmetric (SUSY) compactification, extending previous results to include non-symmetric data, with implications for theoretical physics and geometry.
Contribution
It introduces a new positive energy theorem applicable to spaces with asymptotic SUSY compactification involving non-symmetric data, broadening the scope of prior results.
Findings
Proved a generalized positive energy theorem for asymptotic SUSY compactified spaces.
Extended positive energy results to non-symmetric data scenarios.
Built upon and generalized previous work by Dai, Hertog-Horowitz-Maeda, and Zhang.
Abstract
A generalized positive energy theorem for spaces with asymptotic SUSY compactification involving non-symmetric data is proved. This work is motivated by the work of Dai [D1][D2], Hertog-Horowitz-Maeda [HHM], and Zhang [Z].
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