A breakdown of injectivity for weighted ray transforms in multidimensions

Abstract

We consider weighted ray-transforms P\W (weighted Radon transforms along straight lines) in Rd, \, d≥ 2, with strictly positive weights W. We construct an example of such a transform with non-trivial kernel in the space of infinitely smooth compactly supported functions on Rd. In addition, the constructed weight W is rotation-invariant continuous and is infinitely smooth almost everywhere on Rd × Sd-1. In particular, by this construction we give counterexamples to some well-known injectivity results for weighted ray transforms for the case when the regularity of W is slightly relaxed. We also give examples of continous strictly positive W such that P\W ≥ n in the space of infinitely smooth compactly supported functions on Rd for arbitrary n∈ N \∞\, where W are infinitely smooth for d=2 and infinitely smooth almost everywhere for d≥ 3.