Generalization Of The Gross-Perry Metrics

M. Jakimowicz; J. Tafel

arXiv:0810.1854·gr-qc·April 29, 2016

Generalization Of The Gross-Perry Metrics

M. Jakimowicz, J. Tafel

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TL;DR

This paper introduces a new class of symmetric solutions to higher-dimensional Einstein equations, extending known 5-dimensional metrics by Gross, Perry, and Millward, with potential implications for theoretical physics.

Contribution

It generalizes existing 5D metrics to a broader class of solutions in higher dimensions, revealing new symmetric solutions to Einstein's equations.

Findings

01

Found a class of SO(n+1) symmetric solutions in (N+n+1)-dimensional Einstein equations.

02

Includes and extends the 5D metrics of Gross and Perry, Millward.

03

Provides a framework for further exploration of higher-dimensional gravitational solutions.

Abstract

A class of SO(n+1) symmetric solutions of the (N+n+1)-dimensional Einstein equations is found. It contains 5-dimensional metrics of Gross and Perry and Millward.

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