Idempotents of 2× 2 matrix rings over rings of formal power series

Abstract

Let A1,…,As be unitary commutative rings which do not have non-trivial idempotents and let A=A1·s As be their direct sum. We describe all idempotents in the 2× 2 matrix ring M2(A[[X]]) over the ring A[[X]] of formal power series with coefficients in A and in arbitrary set of variables X. We apply this result to the matrix ring M2( Zn[[X]]) over the ring Zn[[X]] for an arbitrary positive integer n greater than 1. Our proof is elementary and uses only the Cayley-Hamilton theorem (for 2× 2 matrices only) and, in the special case A= Zn, the Chinese reminder theorem and the Euler-Fermat theorem.