Globally generated vector bundles with $c_1 = 5$ on $\mathbb{P}^3$

Abstract: We provide a classification of globally generated vector bundles with $c_1 = 5$ on the projective 3-space. The classification is complete (except for one case) but not as detailed as the corresponding classification in the case $c_1 = 4$ from our paper [Memoirs A.M.S., Vol. 253, No. 1209 (2018), also arXiv:1305.3464]. We determine, at least, the pairs of integers $(a , b)$ for which there exist globally generated vector bundles on the projective 3-space with Chern classes $c_1 = 5$, $c_2 = a$, $c_3 = b$ (except for the case $(12 , 0)$ and the complementary case $(13 , 5)$ which remain undecided), we describe the Horrocks monads of these vector bundles and we organize them into several families with irreducible bases. We use some of the results from our paper arXiv:1502.05553 to reduce the problem to the classification of stable rank 3 vector bundles $F$ with $c_1(F) = -1$, $2 \leq c_2(F) \leq 4$, having the property that $F(2)$ is globally generated. We use, then, the spectrum of such a bundle to get the necessary cohomological information. Some of the constructions appearing in the present paper are used (and reproduced, for the reader's convenience) in another paper of ours [arXiv:1711.06060] in which we provide an alternative to Chang and Ran's proof of the unirationality of the moduli spaces of curves of degree at most 13 from [Invent. Math. 76 (1984), 41--54].