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Bokuan Li
@@ -97,12 +97,12 @@
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&= 2[x(yxy) + y(xyx)] \in \ker \phi
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&= 2[x(yxy) + y(xyx)] \in \ker \phi
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\end{align*}
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\end{align*}
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and $(xy - yx)^2 \in \ker\phi$ as well, and
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and $(xy - yx)^2 \in \ker\phi$. Since
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\[
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\[
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(\phi(xy - yx))^2 = \phi((xy - yx)^2) = 0
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(\phi(xy - yx))^2 = \phi((xy - yx)^2) = 0
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\]
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\]
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Therefore $2xy = (xy + yx) - (xy - yx) \in \ker \phi$, $\ker \phi$ is an ideal, and $\phi$ is a homomorphism.
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The commutator $xy - yx \in \ker \phi$ as well. Therefore $2xy = (xy + yx) - (xy - yx) \in \ker \phi$, $\ker \phi$ is an ideal, and $\phi$ is a homomorphism.
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\end{proof}
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\end{proof}
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