Normal-Euler excess for disjoint nonorientable surfaces in a closed 4-manifold

Abstract

Let \(M\) be a closed connected oriented topological \(4\)-manifold. We prove that if \(F1,…,Fr⊂ M\) are pairwise disjoint connected locally flat topologically embedded nonorientable surfaces with nonorientable genera \(gi\), same-sign twisted normal Euler numbers \(ei\), and \( [F1]+·s+[Fr]=0∈ H2(M;2), \) then the normal-Euler excess \( Σi=1r (ei-2gi) \) is bounded above by a constant depending only on \(M\). Thus same-sign mod-\(2\)-null families of disjoint nonorientable surfaces in a fixed ambient \(4\)-manifold have uniformly bounded total excess over Massey's \(S4\) bound. The proof combines a tubing construction with the signature and Euler-characteristic formulas for \(2\)-fold branched covers. As corollaries, every closed oriented topological \(4\)-manifold contains only finitely many pairwise disjoint locally flat topologically embedded copies of \(2\) with \(e>2\), and only finitely many pairwise disjoint tubular neighborhoods modeled on real \(2\)-plane bundles over \(2\) whose total spaces are orientable and whose twisted Euler numbers have absolute value greater than \(2\). When \(M\) is a homology \(4\)-sphere, the ambient error term vanishes, and the theorem recovers Massey's sharp inequality \(e(F) 2g(F)\) for nonorientable surfaces in \(S4\).