Topology at the Planck Length
arXiv:gr-qc/9708053 · doi:10.1088/0264-9381/15/4/009
Abstract
A basic arbitrariness in the determination of the topology of a manifold at the Planck length is discussed. An explicit example is given of a `smooth' change in topology from the 2-sphere to the 2-torus through a sequence of noncommuting geometries. Applications are considered to the theory of D-branes within the context of the proposed $M$(atrix) theory.
Orsay Preprint 97/34, 17 pages, Latex