Exact pairs of homogeneous zero divisors
classification
🧮 math.AC
keywords
divisorshomogeneouszeroalgebraexactartiniancompressedconsequence
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Let S be a standard graded Artinian algebra over a field k. We identify constraints on the Hilbert function of S which are imposed by the hypothesis that S contains an exact pair of homogeneous zero divisors. As a consequence, we prove that if S is a compressed level algebra, then S does not contain any homogeneous zero divisors.
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