Original scientific paper
Diophantine quadruples in the ring Z[√2]
Z. Franušić
Abstract
The set of integers of the quadratic field Q(√d)has the property D(z) if the product of its any two distinct elements increased by z is a perfct square in Q(√d). In case d=2, we prove that there exist infinitely many integer quadruples with the property D(z) if and only if z can be represented as a difference of two squares of integers in Q(√2).
Keywords
Diophantine quadruples; difference of squares; quadratic fields; Pellian equations
Hrčak ID:
680
URI
Publication date:
22.12.2004.
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