Schur multiplier of SL2 over finite commutative rings
Abstract
In this article, we investigate the Schur multiplier of the special linear group SL2(A) over finite commutative local rings A. We prove that the Schur multiplier of these groups is isomorphic to the K-group K2(A) whenever the residue field A/mA has odd characteristic and satisfies |A/mA| ≠ 3,5,9. As an application, we show that if A is either the Galois ring GR(pl,m) or the quasi-Galois ring A(pm,n) with residue field of odd characteristic and |A/mA| ≠ 3,5,9, then the Schur multiplier of SL2(A) is trivial.
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