Pages that link to "Item:Q372732"

The following pages link to Existence of an infinite family of pairs of quadratic fields \(\mathbb{Q}(\sqrt{m_1D})\) and \(\mathbb{Q}(\sqrt{m_2D})\) whose class numbers are both divisible by 3 or both indivisible by 3 (Q372732):

Displaying 7 items.

• An infinite family of pairs of imaginary quadratic fields with both class numbers divisible by five (Q518089) (← links)
• On the \(3\)-divisibility of class numbers of pairs of quadratic fields with splitting conditions (Q2631751) (← links)
• Simultaneous indivisibility of class numbers of pairs of real quadratic fields (Q2673048) (← links)
• Indivisibility of class numbers and Iwasawa \(\lambda\)-invariants of real quadratic fields (Q2731688) (← links)
• An infinite family of pairs of imaginary quadratic fields with ideal classes of a given order (Q2965765) (← links)
• On Simultaneous Divisibility of the Class Numbers of Imaginary Quadratic Fields (Q3298281) (← links)
• A family of infinite pairs of quadratic fields Q (\sqrtD) and Q (\sqrt-D) whose class numbers are both divisible by 3 (Q4522896) (← links)