Bifurcation set of multi-parameter families of complex curves

Abstract: The problem of detecting the bifurcation set of polynomial mappings C m → C k , m 2, m k 1, has been solved in the case m = 2, k = 1 only. Its solution, which goes back to the 1970s, involves the non-constancy of the Euler characteristic of fibers. We provide here a complete answer to the general case m = k + 1 3 in terms of the Betti numbers of fibers and of a vanishing phenomenon discovered in the late 1990s in the real setting.

“…It is well known that analytic and geometric conditions can be used to estimate B(F k ); see, for instance, [6,15,17,19,25]. Thus, we may use these conditions to ensure the topological hypothesis related to B(F k ) in Theorems 1.6, 1.7 and 2.3.…”

On topological approaches to the Jacobian conjecture in ℂⁿ

“…It is well known that analytic and geometric conditions can be used to estimate B(F k ); see, for instance, [6,15,17,19,25]. Thus, we may use these conditions to ensure the topological hypothesis related to B(F k ) in Theorems 1.6, 1.7 and 2.3.…”

On topological approaches to the Jacobian conjecture in ℂⁿ

Symmetry Defect of n- Dimensional Complete Intersections in $$\mathbb C^{2n-1}$$

Global index of real polynomials