A determinant-line and degree obstruction to foliation transversality

Abstract

Let pi: Mell+n -> Bn be a submersion that presents a regular foliation by its fibers, and let Sn subset M be a closed embedded complementary submanifold, with f = pi|S: S -> B. We give two concise obstructions to keeping S everywhere transverse. (A) Determinant-line obstruction: with L = det(TS)* tensor f* det(TB) -> S, a C1-small perturbation makes the tangency locus Z = det(df) = 0 subset S a closed (n-1)-dimensional submanifold whose mod 2 fundamental class equals PD(w1(L)) in Hn-1(S; Z2). In particular, when n = 1 the set of tangencies is finite and the parity of #Z equals the pairing <w1(L), [S]> mod 2. (B) Twisted homology/degree obstruction: if pi is proper with connected fibers and f[S]f OB = 0 in Hn(B; OB) (top homology with the orientation local system), then S must be tangent somewhere. These recover the covering-space argument in the orientable case and extend to nonorientable settings via w1(L). We also give short applications beyond the classical degree test, including the case Hn(B; OB) = 0 and a nonorientable base with vanishing top homology.