Celestial Klein Spaces
Abstract
We consider the analytic continuation of (p+q)-dimensional Minkowski space (with p and q even) to (p,q)-signature, and study the conformal boundary of the resulting "Klein space". Unlike the familiar (-+++..) signature, now the null infinity I has only one connected component. The spatial and timelike infinities (i0 and i') are quotients of generalizations of AdS spaces to non-standard signature. Together, I, i0 and i' combine to produce the topological boundary Sp+q-1 as an Sp-1 × Sq-1 fibration over a null segment. The highest weight states (the L-primaries) and descendants of SO(p,q) with integral weights give rise to natural scattering states. One can also define H-primaries which are highest weight with respect to a signature-mixing version of the Cartan-Weyl generators that leave a point on the celestial Sp-1 × Sq-1 fixed. These correspond to massless particles that emerge at that point and are Mellin transforms of plane wave states.
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