Volume and Homology of One-cusped Hyperbolic 3-manifolds

Let M be a complete, finite-volume, orientable hyperbolic manifold having exactly one cusp. If we assume that π1(M) has no subgroup isomorphic to a genus-2 surface group, and that either (a) dimZp H1(M ;Zp) ≥ 5 for some prime p, or (b) dimZ2 H1(M ;Z2) ≥ 4, and the subspace of H(M ;Z2) spanned by the image of the cup product H(M ;Z2) × H(M ;Z2) → H(M ;Z2) has dimension at most 1, then volM > 5.06. If we assume that dimZ2 H1(M ;Z2) ≥ 11, then volM > 3.66; and furthermore, either volM > 5.06, or the compact core N of M contains a genus-2 connected incompressible surface S of a special type (S is the frontier of some book of I-bundles, possibly with a hollow binding, contained in N).