Counting squarefree discriminants of trinomials under abc
classification
🧮 math.NT
keywords
discriminantspositivesquarefreetrinomialsassumingconjecturecountingform
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For an odd positive integer $n\ge 5$, assuming the truth of the $abc$ conjecture, we show that for a positive proportion of pairs $(a,b)$ of integers the trinomials of the form $t^n+at+b (a,b\in \mathbb Z)$ are irreducible and their discriminants are squarefree.
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