# Black holes and general Freudenthal transformations

**Authors:** L.Borsten, M. J. Duff, J.J.Fern\'andez-Melgarejo, A. Marrani and, E.Torrente-Lujan

arXiv: 1905.00038 · 2019-09-04

## TL;DR

This paper explores General Freudenthal Transformations in supergravity, revealing their role in black hole entropy invariance and their relation to symmetries, with explicit examples in various supergravity theories.

## Contribution

It introduces and analyzes GFT as a generalization of Freudenthal duality, detailing their properties and connection to supergravity symmetries and U-dualities.

## Key findings

- GFT leave black hole entropy invariant up to a scalar factor
- Existence of Freudenthal rotations subgroup preserving entropy
- Explicit examples in supergravity theories

## Abstract

We study General Freudenthal Transformations (GFT) on black hole solutions in Einstein-Maxwell-Scalar (super)gravity theories with global symmetry of type $E_7$. GFT can be considered as a 2-parameter, $a, b\in {\mathbb R}$, generalisation of Freudenthal duality: $x\mapsto x_F= a x+b\tilde{x}$, where $x$ is the vector of the electromagnetic charges, an element of a Freudenthal triple system (FTS), carried by a large black hole and $ \tilde{x}$ is its Freudenthal dual. These transformations leave the Bekenstein-Hawking entropy invariant up to a scalar factor given by $a^2\pm b^2$. For any $x$ there exists a one parameter subset of GFT that leave the entropy invariant, $a^2\pm b^2=1$, defining the subgroup of Freudenthal rotations. The Freudenthal plane defined by span$_\mathbb{R}\{x, \tilde{x}\}$ is closed under GFT and is foliated by the orbits of the Freudenthal rotations. Having introduced the basic definitions and presented their properties in detail, we consider the relation of GFT to the global sysmmetries or U-dualites in the context of supergravity. We consider explicit examples in pure supergravity, axion-dilaton theories and $N=2,D=4$ supergravities obtained from $D=5$ by dimensional reductions associated to (non-degenerate) $ reduced$ FTS's descending from cubic Jordan Algebras.

## Full text

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## References

100 references — full list in the complete paper: https://tomesphere.com/paper/1905.00038/full.md

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Source: https://tomesphere.com/paper/1905.00038