This is a problem I asked in SE, but it seems the question is more suitable for MO.
Consider a ring $R$ (not necessary with identity or commutative) such that for any proper two-sided ideal $I$, $R\cong\frac RI$ (as rings), e.g., $\Bbb{Z}_{2^\infty}$ with zero product. Is it true that the set of two-sided ideals of $R$ is a chain ?!
If there are ideals $I_1,I_2$ not forming a chain, we can assume that $I_1,I_2\ne0=I_1\cap I_2$ just passing to $R\simeq R/(I_1\cap I_2)$. Pick any $0\ne r\in R$. By the Zorn lemma, there is a maximal ideal $I$ in the set of the ideals with the property $r\notin I$. Passing to $R\simeq R/I$, we can assume that every nonnull ideal of $R$ contains $r$. So, $r\in I_1\cap I_2=0$. A contradiction. Therefore, the ideals of $R$ form a chain.
