On an analytic description of the $alpha$-cosine transform on real Grassmannians

The goal of this paper is to describe the $alpha$-cosine transform on functions on a Grassmannian of $i$-planes in an $n$-dimensional real vector space. in analytic terms as explicitly as possible. We show that for all but finitely many complex $alpha$ the $alpha$-cosine transform is a composition of the $(alpha+2)$-cosine transform with an explicitly written (though complicated) O(n)-invariant differential operator. For all exceptional values of $alpha$ except one we interpret the $alpha$-cosine transform explicitly as either the Radon transform or composition of two Radon transforms. Explicit interpretation of the transform corresponding to the last remaining value $alpha$, which is $-(min{i,n-i}+1)$, is still an open problem.