English

The Compton-Schwarzschild relations in higher dimensions

General Relativity and Quantum Cosmology 2019-01-01 v2 High Energy Physics - Phenomenology Quantum Physics

Abstract

In three spatial dimensions, the Compton wavelength (RCM1(R_C \propto M^{-1}) and Schwarzschild radius (RSM(R_S \propto M) are dual under the transformation MMP2/MM \rightarrow M_{P}^2/M, where MPM_{P} is the Planck mass. This suggests that there is a fundamental link -- termed the Black Hole Uncertainty Principle or Compton-Schwarzschild correspondence -- between elementary particles in the M<MPM < M_{P} regime and black holes in the M>MPM > M_{P} regime. In the presence of nn extra dimensions, compactified on some scale RER_E, one expects RSM1/(1+n)R_S \propto M^{1/(1+n)} for R<RER < R_E, which breaks this duality. However, it may be restored in some circumstances because the effective Compton wavelength depends on the form of the (3+n)(3+n)-dimensional wavefunction. If this is spherically symmetric, then one still has RCM1R_C \propto M^{-1}, as in the 33-dimensional case. The effective Planck length is then increased and the Planck mass reduced, allowing the possibility of TeV quantum gravity and black hole production at the LHC. However, if the wave function is pancaked in the extra dimensions and maximally asymmetric, then RCM1/(1+n)R_C \propto M^{-1/(1+n)}, so that the duality between RCR_C and RSR_S is preserved. In this case, the effective Planck length is reduced but the Planck mass is unchanged, so TeV quantum gravity is precluded and black holes cannot be generated in collider experiments. Nevertheless, the extra dimensions could still have consequences for the detectability of black hole evaporations and the enhancement of pair-production at accelerators on scales below RER_E. Though phenomenologically general for higher-dimensional theories, our results are shown to be consistent with string theory via the minimum positional uncertainty derived from DD-particle scattering amplitudes.

Keywords

Cite

@article{arxiv.1611.01913,
  title  = {The Compton-Schwarzschild relations in higher dimensions},
  author = {Matthew J. Lake and Bernard Carr},
  journal= {arXiv preprint arXiv:1611.01913},
  year   = {2019}
}

Comments

33 pages, 5 figures, 1 appendix. Minor typos in the Abstract corrected (v2)

R2 v1 2026-06-22T16:43:46.497Z