In analogy with recent works on $K3$ surfaces, we study the existence of infinitely many ruled divisors on projective irreducible holomorphic symplectic (IHS) manifolds. We prove such an existence result for any projective IHS manifold of $K3<^>{[n]}$ or generalized Kummer type, which is not a variety defined over $\overline{\mathbb{Q}}$ with Picard number one or maximal. The result is obtained as a combination of the regeneration principle and of a generalization to higher dimension of a controlled degeneration technique, invented by Chen, Gounelas, and Liedtke in dimension 2.
Beri, P., Mongardi, G., Pacienza, G. (2025). On the Zariski Density of Rational Curves on Irreducible Holomorphic Symplectic Manifolds. INTERNATIONAL MATHEMATICS RESEARCH NOTICES, 2025(19), 1-10 [10.1093/imrn/rnaf256].
On the Zariski Density of Rational Curves on Irreducible Holomorphic Symplectic Manifolds
Beri P.;Mongardi G.
;Pacienza G.
2025
Abstract
In analogy with recent works on $K3$ surfaces, we study the existence of infinitely many ruled divisors on projective irreducible holomorphic symplectic (IHS) manifolds. We prove such an existence result for any projective IHS manifold of $K3<^>{[n]}$ or generalized Kummer type, which is not a variety defined over $\overline{\mathbb{Q}}$ with Picard number one or maximal. The result is obtained as a combination of the regeneration principle and of a generalization to higher dimension of a controlled degeneration technique, invented by Chen, Gounelas, and Liedtke in dimension 2.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
