No finite axiomatizations for posets embeddable into distributive lattices
classification
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distributiveposetsaxiomatizationsaxiomatizedcannotcardinalitiescardinalsclass
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Let $m$ and $n$ be cardinals with $3\leq m,n\leq\omega$. We show that the class of posets that can be embedded into a distributive lattice via a map preserving all existing meets and joins with cardinalities strictly less than $m$ and $n$ respectively cannot be finitely axiomatized.
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