Intrinsic Conformal Symmetries in Szekeres models
Abstract: We show that Spatially Inhomogeneous (SI) and Irrotational dust models admit a \emph{6-dimensional algebra } of \emph{Intrinsic Conformal Vector Fields} (ICVFs) $\mathbf{X}{\alpha }$ satisfying $p{a}{c}p_{b}{d}\mathcal{L}{\mathbf{X}{\alpha }}p_{cd}=2\phi (\mathbf{X}{\alpha })p{ab}$ where $p_{ab}$ is the associated metric of the 2d distribution $\mathcal{X}$ normal to the fluid velocity $u{a}$ and the radial unit spacelike vector field $x{a}$. The Intrinsic Conformal (IC) algebra is determined for each of the curvature value $\epsilon $ that characterizes the structure of the screen space $\mathcal{X}$. In addition the conformal flatness of the hypersurfaces $\mathbf{u}=\mathbf{0}$ indicates the existence of a \emph{% 10-dimensional algebra} of ICVFs of the 3d metric $h_{ab}$. We illustrate this expectation and propose a method to derive them by giving explicitly the \emph{7 proper} ICVFs of the Lema^{\i}tre-Tolman-Bondi (LTB) model which represents the simplest subclass within the Szekeres family.
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