Infinite families of Diophantine quadruples in Z[-2] in the remaining exceptional congruence classes
Abstract
We continue the study of D(z)-quadruples in the ring Z[-2]. Motivated by the earlier classification due to the authors and by the subsequent partial results for the remaining families, we consider the exceptional congruence classes arising in the forms 24a+5+(12b+6)-2, 24a+2+(12b+6)-2, and 48a+44+(24b+12)-2. By combining the regular extension method with new families obtained by fixing a divisor e 3z and a small element v∈ Z[-2], we construct explicit D(z)-quadruples in each of the previously unsolved congruence classes. More precisely, we show that every exceptional class contains infinitely many values of z admitting a twice semi-regular D(z)-quadruple, i.e., a quadruple containing two regular D(z)-triples. We also include remarks on the exceptional values z∈\-1,1 2-2\ and on a computational search in the exceptional congruence classes.
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