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Abstract
In the first part of this paper we give a precise description of all the minimal decompositions of any bi-homogeneous polynomial p (i.e. a partially symmetric tensor of where
are two complex, finite-dimensional vector spaces) if its rank with respect to the Segre–Veronese variety
is at most
. Such a polynomial may not have a unique minimal decomposition as
with
and
coefficients, but we can show that there exist unique
,
, two unique linear forms
,
, and two unique bivariate polynomials
and
such that either
or
, (
being appropriate coefficients). In the second part of the paper we focus on the tangential variety of the Segre–Veronese varieties. We compute the rank of their tensors (that is valid also in the case of Segre–Veronese of more factors) and we describe the structure of the decompositions of the elements in the tangential variety of the two factors Segre–Veronese varieties.
AMS SUBJECT CLASSIFICATION:
Acknowledgements
We would like to thank the anonymous referees who urged us to strongly improve the results of this paper.
Notes
The authors declare that there is no conflict of interests regarding the publication of this paper.