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Let R be a commutative local principal ideal ring which is not integral, f a polynomial in Rx such that f (0) ̸ = 0 and N (f ) its Newton polygon.If N (f ) contains r sides of different slopes, we show that f has at least r different pure factors in Rx.This generalizes the Newton polygon method over a ring which is not integral.
Brahim Boudine (Wed,) studied this question.