English

Mapped Null Hypersurfaces and Legendrian Maps

Differential Geometry 2008-11-26 v1 General Relativity and Quantum Cosmology Geometric Topology Symplectic Geometry

Abstract

For an (m+1)(m+1)-dimensional space-time (Xm+1,g),(X^{m+1}, g), define a mapped null hypersurface to be a smooth map ν:NmXm+1\nu:N^{m}\to X^{m+1} (that is not necessarily an immersion) such that there exists a smooth field of null lines along ν\nu that are both tangent and gg-orthogonal to ν.\nu. We study relations between mapped null hypersurfaces and Legendrian maps to the spherical cotangent bundle STMST^*M of an immersed spacelike hypersurface μ:MmXm+1.\mu:M^m\to X^{m+1}. We show that a Legendrian map \wtλ:Lm1(STM)2m1\wt \lambda: L^{m-1}\to (ST^*M)^{2m-1} defines a mapped null hypersurface in X.X. On the other hand, the intersection of a mapped null hypersurface ν:NmXm+1\nu:N^m\to X^{m+1} with an immersed spacelike hypersurface μ:MmXm+1\mu':M'^m\to X^{m+1} defines a Legendrian map to the spherical cotangent bundle STM.ST^*M'. This map is a Legendrian immersion if ν\nu came from a Legendrian immersion to STMST^*M for some immersed spacelike hypersurface μ:MmXm+1.\mu:M^m\to X^{m+1}.

Cite

@article{arxiv.math/0702305,
  title  = {Mapped Null Hypersurfaces and Legendrian Maps},
  author = {Vladimir Chernov},
  journal= {arXiv preprint arXiv:math/0702305},
  year   = {2008}
}

Comments

13 pages, 1 figure