Multi-Secant Lemma

Abstract

We present a new generalization of the classical trisecant lemma. Our approach is quite different from previous generalizations. Let X be an equidimensional projective variety of dimension d. For a given k ≤ d + 1, we are interested in the study of the variety of k-secants. The classical trisecant lemma just considers the case where k = 3 while elsewhere the case k = d + 2 is considered. Secants of order from 4 to d + 1 provide service for our main result. In this paper, we prove that if the variety of k-secants (k ≤ d + 1) satisfies the three following conditions: (i) trough every point in X, passes at least one k-secant, (ii) the variety of k-secant satisfies a strong connectivity property that we defined in the sequel, (iii) every k-secant is also a (k+1)-secant, then the variety X can be embedded into Pd+1. The new assumption, introduced here, that we called strong connectivity is essential because a naive generalization that does not incorporate this assumption fails as we show in some example. The paper concludes with some conjectures concerning the essence of the strong connectivity assumption.