Relatively non-degenerate integrated decay estimates on subextremal Kerr de Sitter
Abstract
We study the Klein--Gordon equation -μ2KG=0 on subextremal Kerr de Sitter black hole backgrounds with parameters (a,M,l), where l2=3. We prove a "relatively non degenerate integrated" decay estimate assuming an appropriate mode stability statement for real frequency solutions of Carter's radial ode. Our results, in particular, apply unconditionally in the very slowly rotating case |a| M,l, and in the case where is axisymmetric. Exponential decay for to a constant is a consequence of this estimate. To prove our result, we introduce a novel pseudodifferential commutation operator G that generalizes our previous purely physical space commutation mavrogiannis and we use it in conjunction with the Morawetz estimate of our companion mavrogiannis4. This pseudodifferential operator is defined using Fourier decomposition with respect to time frequencies ω and azimuthal frequencies m, but does not require Carter's full separation.
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