H-Instanton Bundles on Three-Dimensional Smooth Toric Varieties with Picard Number Two

Abstract

We study H-instanton bundles on the infinite family of smooth three-dimensional varieties Xe=P(OP2 OP2(e)), for e ≥ 0. We provide two distinct monadic descriptions of H-instanton bundles on Xe, generalizing the classical monads on P3. We then characterize H-instanton bundles with second Chern class supported in a single degree, and investigate their existence and moduli spaces. Finally, for e≤ 3, we prove the existence of H-instanton bundles for all admissible second Chern classes. These results extend previous constructions on specific cases and contribute to the study of instanton bundles on threefolds with higher Picard number.