Partially complex ranks for real projective varieties
Abstract
Let X( C)⊂ Pr( C) be an integral non-degenerate variety defined over R. For any q∈ Pr( R) we study the existence of S⊂ X( C) with small cardinality, invariant for the complex conjugation and with q contained in the real linear space spanned by S. We discuss the advantages of these additive decompositions with respect to the X( R)-rank, i.e. the rank of q with respect to X( R). We describe the case of hypersurfaces and Veronese varieties.
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