Representation of Algebraic Integers as Sum of Units over the Real Quadratic Fields
Fundamental units of real quadratic field
Integers of real quadratic field as sum of finite units
Real quadratic fields.
In this paper we generalize Jacobsons results by proving that any integer in is a square-free integer), belong to . All units of are generated by the fundamental unit having the forms
our generalization build on using the conditions
This leads us to classify the real quadratic fields into the sets Jacobsons results shows that and Sliwa confirm that and are the only real quadratic fields in .
