An epsilon-delta bound for plane algebraic curves and its use for certified homotopy continuation of systems of plane algebraic curves

Abstract

We explain how, given a plane algebraic curve C f(x,y) = 0, x1 ∈ C not a singularity of y w.r.t. x, and > 0, we can compute δ > 0 such that |yj(x1) - yj(x2)| < for all holomorphic functions yj(x) which satisfy f(x, yj(x)) = 0 in a neighbourhood of x1 and for all x2 with |x1 - x2| < δ. Consequently, we obtain an algorithm for reliable homotopy continuation of plane algebraic curves. As an example application, we study continuous deformation of closed discrete Darboux transforms. Moreover, we discuss a scheme for reliable homotopy continuation of triangular polynomial systems. A general implementation has remained elusive so far. However, the epsilon-delta bound enables us to handle the special case of systems of plane algebraic curves. The bound helps us to determine a feasible step size and paths, which are equivalent w.r.t. analytic continuation to the actual paths of the variables but along which we can proceed more easily.