The relative Clemens Conjectures for 12-log Calabi-Yau threefolds

Abstract

We formulate a relative analogue of the Clemens conjectures for 1/2-log Calabi-Yau threefold pairs (X,Y) (where KX+2Y is isomorphic to OX). This framework rests on the restoration of a perfect deformation/obstruction duality specific to the 1/2-log CY threefold setting. Based on this duality, we conjecture that for a generic intersection configuration on the boundary divisor Y, the number of rational curves anchored to these points is finite, and every such curve possesses the balanced relative normal bundle NC/X(-Y) isomorphic to OC(-1) + OC(-1). In a joint appendix with Adrian Zahariuc, we verify this framework for prime Fano threefolds of index two. Using specialization techniques, we demonstrate that the usual virtual complications of relative Gromov-Witten theory are naturally suppressed in this setting. This trivialization of the relative moduli space cleanly reduces the virtual invariants to honest, classical enumerative counts, thereby rigorously proving the geometric conjecture.