Curves in High Degree Plane Pencils with Bounded Degree Components

Abstract

In this paper, we study pencils of plane curves of sufficiently large degree d with simple base points, and their reducible curves whose irreducible components have degree at most k≥ 2. Combining techniques from algebraic geometry and combinatorics, we establish an explicit upper bound on the number mk of such curves in the pencils. We prove that, for sufficiently large d, pencils with more than six such curves do not exist. Consequently, under the stronger assumption d≥72k(k-1)-2, we obtain the bound mk≤ 6, improving the previously known bound for d 2k. We also establish restrictions on pencils containing reducible curves consisting of one irreducible component of degree k together with lines, and obtain nonexistence results for certain such pencils.