Solving p-adic polynomial equations using Jarratt's Method

Abstract

We implement an iterative numerical method to solve polynomial equations f(x)=0 in the p-adic numbers, where f(x) ∈Zp[x]. This method is a simplified p-adic analogue of Jarratt's method for finding roots of functions over the real numbers. We establish that our method has a higher order of convergence than J.F.T. Rabago's p-adic version of Olver's method from 2016. Moreover, we weaken the initial conditions in Rabago's method, which allows us to start the iteration with a multiple root of the congruence f(x) 0 p.

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