Abstract
It is known that the basic tensor valuations which, by a result of S. Alesker, span the vector space of tensor valued, continuous, isometry covariant valuations on convex bodies, are not linearly independent. P. McMullen has discovered linear dependences between these basic valuations and has implicitly raised the question as to whether these are essentially the only ones. The present paper provides a positive answer to this question. The dimension of the vector space of continuous, isometry covariant tensor valuations, of a fixed rank and of a given degree of homogeneity, is explicitly determined. Our approach is constructive and permits one to provide a specific basis.
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