On rank 3 quadratic equations of Veronese varieties

Abstract

This paper studies the geometric structure of the locus 3 (X) of rank 3 quadratic equations of the Veronese variety X = d (Pn). Specifically, we investigate the minimal irreducible decomposition of 3 (X) of rank 3 quadratic equations and analyze the geometric properties of the irreducible components of 3 (X) such as their desingularizations. Additionally, we explore the non-singularity and singularity of these irreducible components of 3 (X).

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