Simplest cubic fields with small class number
Abstract
Let m∈Z be an integer and Lm=Q(α) be the simplest cubic field with class number hm and conductor fm where α is a root of fm(X)=X3-mX2-(m+3)X-1. Let OLm be the ring of integers of Lm. By using PARI/GP, we confirm that if [OLm:Z[α]]=1 (resp. 3, 27), i.e. m2+3m+9=fm (resp. 3fm, 27fm), then there exist exactly 581 (resp. 80, 142) integers m≥ -1 such that hm≤ 1000. We also show that if -1≤ m≤ 107, then hm<16 holds for 138=26+31+11+10+36+21+3 integers m. More precisely, there exist 26 (resp. 31, 11, 10, 36, 21, 3) integers m with -1≤ m≤ 107 such that hm=1 (resp. 3, 4, 7, 9, 12, 13) which are given explicitly.
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