Classical worldvolumes as generalised geodesics
Abstract
It is a standard result that the integral curves of an auto-parallel vector field are geodesics which, for null and timelike vectors, are the paths of freely-falling particles in general relativity. We introduce a definition of an "auto-parallel" generalised vector field and show that it gives the analogous statements for the classical worldvolumes of strings and branes in arbitrary background field configurations. This appears to give a unified description of the worldvolume equations of strings and branes, similar to the way that generalised geometry provides a unified description of maximal supergravity theories. We present details of the cases of string worldsheets in generalised geometry and M2 branes restricted to the four dimensions of generalised geometry. A key quantity is the infinitesimal flow of the conjugate momentum along the generalised tangent vector, which is equated to the gradient of the Hamiltonian, viewed as a function on spacetime.
Cite
@article{arxiv.2102.00555,
title = {Classical worldvolumes as generalised geodesics},
author = {Charles Strickland-Constable},
journal= {arXiv preprint arXiv:2102.00555},
year = {2021}
}
Comments
29 pages