Let E be a toric fibration arising from symplectic reduction of a direct sum of line bundles over (almost-) K��hler base B. Then each torus-fixed point of the toric manifold fiber defines a section of the fibration. Let L_a be convex line bundles over B, A_a smooth divisors of B arising as the zero loci of generic sections of L_a, and \a:B\to E a particular fixed-point section of E. Further assume the \{A_a\} to be mutually disjoint. We compute genus-0 Gromov--Witten invariants of the blowup of E along \a(\coprod_a A_a) in terms of genus-0 Gromov--Witten invariants of B and of \{A_a\}, the matrix used for the symplectic reduction description of the fiber of the toric fibration E\to B, and the restriction maps i_{A_a}^*:H^*(B)\to H^*(A_a).

55 pages