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Partial Cosine-Funk Transforms at Poles of the $\textrm{Cos}^λ$ Transform on Grassmann Manifolds

The cosine-$λ$ transform, denoted $\mathcal{C}^λ$, is a family of integral transforms we can define on the sphere and on the Grassmann manifolds $\textrm{Gr}(p, \mathbb{K}^n) = \textrm{SU}(n,\mathbb{K})/\text{S}(\textrm{U}(p,\mathbb{K}) \times \textrm{U}(n-p,\mathbb{K}))$ where $\mathbb{K}$ is $\mathbb{R}$, $\mathbb{C}$ or the skew field $\mathbb{H}$ of quaternions. The family $\mathcal{C}^λ$ extends meromorphically in $λ$ to the complex plane with poles at (among other values) $λ=-1,\ldots, -p$. In this paper we normalize $\mathcal{C}^λ$ and evaluate at those poles. The result is a series of integral transforms on the Grassmannians that we can view as partial cosine-Funk transforms. The transform that arises at $λ= -p$ is the natural analog of the Funk transform in this setting.