Normal operators for momentum ray transforms, II: Saint Venant operator

Abstract

The momentum ray transform Imk integrates a rank m symmetric tensor field f on Rn over lines with the weight tk, Imkf(x,)=∫-∞∞ tk f(x+t),m\,dt. Let Nkm=(Ikm)*Ikm be the normal operator of Imk. To what extent is a symmetric m-tensor field f determined by the data (Nm0f,…,Nmrf) given for some 0 r m? The Saint Venant operator Wrm is a linear differential operator of order m-r with constant coefficients on the space of symmetric m-tensor fields. We derive an explicit formula expressing Wrmf in terms of (Nm0f,…,Nmrf). The tensor field Wrmf represents the full local information on f that can be extracted from the data (Nm0f,…,Nmrf).