中文

Common Structures in 2,3 and 4D Simplicial Quantum Gravity

高能物理 - 格点 2009-10-30 v1

摘要

Two kinds of statistical properties of dynamical-triangulated manifolds (DT mfds) have been investigated. First, the surfaces appearing on the boundaries of 3D DT mfds were investigated. The string-susceptibility exponent of the boundary surfaces (γ~st\tilde{\gamma}_{st}) of 3D DT mfds with S3S^{3} topology near to the critical point was obtained by means of a MINBU (minimum neck baby universes) analysis; actually, we obtained γ~st0.5\tilde{\gamma}_{st} \approx -0.5. Second, 3 and 4D DT mfds were also investigated by determining the string-susceptibility exponent near to the critical point from measuring the MINBU distributions. As a result, we found a similar behavior of the MINBU distributions in 3 and 4D DT mfds, and obtained γst(3)γst(4)0\gamma_{st}^{(3)} \approx \gamma_{st}^{(4)} \approx 0. The existence of common structures in simplicial quantum gravity is also discussed.

引用

@article{arxiv.hep-lat/9709099,
  title  = {Common Structures in 2,3 and 4D Simplicial Quantum Gravity},
  author = {H. S. Egawa and N. Tsuda and T. Yukawa},
  journal= {arXiv preprint arXiv:hep-lat/9709099},
  year   = {2009}
}

备注

3 pages, latex, 3 ps figures, uses espcrc2.sty. Talk presented at LATTICE97(gravity)