Fuchsian analysis of S^2 x S^1 and S^3 Gowdy spacetimes

• The Gowdy spacetimes are vacuum solutions of Einstein's equations with two commuting Killing vectors having compact spacelike orbits with T^3, S^2 x S^1 or S^3 topology. In the case of T^3 topology, Kichenassamy and Rendall have found a family of singular solutions which are asymptotically velocity dominated by construction. In the case when the velocity is between zero and one, the solutions depend on the maximal number of free functions. We consider the similar case with S^2 x S^1 or S^3 topology, where the main complication is the presence of symmetry axes. The results for T^3 may be applied locally except at the axes, where one of the Killing vectors degenerate. We use Fuchsian techniques to show the existence of singular solutions similar to the T^3 case. We first solve the analytic case and then generalise to the smooth case by approximating smooth data with a sequence of analytic data. However, for the metric to be smooth at the axes, the velocity must be -1 or 3 there, which is outside the range where the constructed solutions depend on the full number of free functions. A plausible explanation is that in general a spiky feature may develop at the axis, a situation which is unsuitable for a direct treatment by Fuchsian methods.

Subject headings

NATURVETENSKAP  -- Matematik (hsv//swe)

NATURAL SCIENCES  -- Mathematics (hsv//eng)

Keyword

general relativity

cosmology

differential equations

wave map

Fuchsian analysis

singularity

asymptotic expansion

NATURAL SCIENCES

NATURVETENSKAP

MATHEMATICS

MATEMATIK

Publication and Content Type

ref (subject category)

art (subject category)