On the first eigenvalue of the area Jacobi operator for complex curves in K\"ahler surfaces

Abstract

In this paper, we investigate the first eigenvalue 1 of the area Jacobi operator for complex curves in K\"ahler surfaces, establishing an extrinsic counterpart to the classical Lichnerowicz theorem for the Laplace-Beltrami operator. By analyzing the second variation of a conformally invariant Willmore-type functional, we derive the lower bound 1 ≥ 2\,Ric, where Ric denotes the infimum of the ambient Ricci curvature. For K\"ahler-Einstein surfaces with positive Einstein constant c>0, this bound reduces to 1 ≥ 2c. We then explore the equality case, computing the exact dimension of the corresponding first eigenspace in terms of the area, genus, and the dimension of a space of holomorphic sections. This analysis shows that the equality is achieved for all curves of genus g ≤ 1.