A classification of local Weyl invariants in D=8

Nicolas Boulanger; Johanna Erdmenger

arXiv:hep-th/0405228·hep-th·November 10, 2009

A classification of local Weyl invariants in D=8

Nicolas Boulanger, Johanna Erdmenger

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TL;DR

This paper provides a comprehensive algebraic classification of local Weyl-invariant scalar densities specifically in eight-dimensional space, advancing understanding of conformal invariants in higher dimensions.

Contribution

It offers the first complete algebraic classification of local Weyl invariants in D=8, filling a gap in the understanding of conformal geometry.

Findings

01

Exhaustive list of Weyl-invariant scalar densities in D=8

02

Methodology applicable to other dimensions

03

Clarifies structure of conformal invariants in higher dimensions

Abstract

Following a purely algebraic procedure, we provide an exhaustive classification of local Weyl-invariant scalar densities in dimension D=8.

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