Consistency of a non-measurable set of reals when the continuum cannot be well-ordered – mathoverflow.net

Consistency of a non-measurable set of reals when the continuum cannot be well-ordered – mathoverflow.net

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Can it be shown, on the assumption that $ZF$ is consistent, that there is a model of $ZF$ in which the reals cannot be well-ordered but there does exist a set of reals which is not Lebesgue ...

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