Holomorphic vector bundles on quadric hypersurfaces of infinite-dimensional projective spaces (Q2565486)

This paper on algebraic geometry in projectivized Banach spaces continues the author's work on splitting and vanishing for finite rank holomorphic vector bundles over finite codimensional varieties. The main result is Theorem~1.1 below. Theorem~1.1. Let \(V\) be a Banach space with a countable unconditional basis and the localizing property, \(Q\subset P(V)\) a quadric hypersurface in the projectivization \(P(V)\) of \(V\), \(E\to Q\) a holomorphic vector bundle of rank \(r\). If \(Q\) is smooth or its singular locus is finite dimensional, then there is a splitting \(E\cong {\mathcal O}_Q(a_1)\oplus\ldots\oplus{\mathcal O}_Q(a_r)\) for uniquely determined integers \(a_1\geq\ldots\geq a_r\), and the Betti number \(h^1(Q,E(t))\) vanishes for all \(t\in{\mathbb Z}\). The proof relies on the author's previous work on the analogous problem in finite dimensions in [Ann. Univ. Ferrara, N. Ser., Sez. VII 27, 135--146 (1981; Zbl 0495.14008)], some newer techniques in infinite dimensions in [Georgian Math. J. 10, No. 1, 37--43 (2003; Zbl 1058.32015)], and on the vanishing and splitting theorems of \textit{L. Lempert} [J. Am. Math. Soc. 11, No. 3, 485--520 (1998; Zbl 0904.32014)]. The author uses the fact that through any point of \(Q\) there passes a line in \(Q\), the Grothendieck splitting type, various projections and blow-ups and many other techniques to bear on his problem. Theorem~1.1 is likely to admit a relaxation of its conditions while keeping its conclusions. The paper is rather technical.