On some local rings

Abstract

Given two seprable irreducible polynomials P1 and P2 over a filed K. We show that the rings K[X]/(P1n) and K[X]/(P2n) are isomorphic if and only if their residue fields K[X]/(P1) and K[X]/(P2) are isomorphic. Partial results in this direction are obtained for the case where the polynomials are not seprable. We note that, given a seprable irreducible polynomial P, we prove that we have an isomorphism between K[X]/(Pn) and (K[X](P))[Y]/(Yn).

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