On resonances generated by conic diffraction
Abstract
We describe the resonances closest to the real axis generated by diffraction of waves among cone points on a manifold with Euclidean ends. These resonances lie asymptotically evenly spaced along a curve of the form λ | λ |= -; here =(n-1)/2 L0 where n is the dimension and L0 is the length of the longest geodesic connecting two cone points. Moreover there are asymptotically no resonances below this curve and above the curve λ | λ |= - for a fixed >.
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