Complementary regions for maps of surfaces

Let F be a closed connected surface, M a closed connected 3-manifold with H₁(M,ℤ/2) = 0, and i: F → M a generic map. Then M - i(F) is a union of connected regions, which may be colored black and white by a checkerboard coloring. This coloring induces a color black or white to each cross-cap of i, namely, the color of the majority of the three local regions in its neighborhood. For k ≥ 0, let a_k and b_k respectively, be the number of black and white components U, with χ(U) = 1 - k. Let C_a, C_b respectively be the number of black and white cross-caps of i. Two more integers attached to i are the number N of triple points of i, and χ = χ(F). In this work, we determine what sets of data ({a_k}, {b_k}, χ, N, C_a, C _b) may appear in this way.