On the complexity of solving initial value problems

Abstract

In this paper we prove that computing the solution of an initial-value problem y=p(y) with initial condition y(t0)=y0∈d at time t0+T with precision e-μ where p is a vector of polynomials can be done in time polynomial in the value of T, μ and Y=t0≤slant u≤slant T∈fnormy(u). Contrary to existing results, our algorithm works for any vector of polynomials p over any bounded or unbounded domain and has a guaranteed complexity and precision. In particular we do not assume p to be fixed, nor the solution to lie in a compact domain, nor we assume that p has a Lipschitz constant.