Lower Bounds for the Relative Volume of Poincare-Einstein Manifolds

Abstract

In this paper, we show that for a Poincar\'e-Einstein manifold (Xn+1,g+) with conformal infinity (M,[g]) of nonnegative Yamabe type, the fractional Yamabe constants of the boundary provide lower bounds for the relative volume. More explicitly, for any γ∈ (0,1), (Y2γ (M,[g])Y2γ (Sn , [gS]))n2γ ≤ V(t(p),g+)V(t(0),gH) ≤ V( Bt(p),g+)V( Bt(0), gH) ≤ 1, 0<t<∞, where Bt(p), t(p) are the the geodesic ball and geodesic sphere of radius t in (X,g+) with center at p∈ Xn+1; and Bt(0), t(0) are the the geodesic ball and geodesic sphere in Hn+1 with center at 0∈Hn+1.

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