On the non primality of certain symmetric ideals
Abstract
Let R =k[x1, ·s, xn,·s] be the infinite variable polynomial ring equipped with the natural S∞ action, where k is a field of characteristic zero. In recent work NS21, Nagpal--Snowden gave an indirect proof that S∞-ideal generated by (x1-x2)2n is not S∞-prime. In this paper, we give a direct proof, with explicit elements. We further formulate some conjectures on possible generalizations of the result.
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