Pages that link to "Item:Q2335704"

The following pages link to Solutions of Diophantine equations as periodic points of \(p\)-adic algebraic functions. II: The Rogers-Ramanujan continued fraction (Q2335704):

Displaying 6 items.

• Solutions of Diophantine equations as periodic points of \(p\)-adic algebraic functions. I. (Q739872) (← links)
• On the Hasse invariants of the Tate normal forms \(E_5\) and \(E_7\) (Q2004942) (← links)
• The Hasse invariant of the Tate normal form \(E_5\) and the class number of \(\mathbb{Q}(\sqrt{-5l})\) (Q2039511) (← links)
• Solutions of Diophantine equations as periodic points of \(p\)-adic algebraic functions. III (Q2045870) (← links)
• Supersingular conjectures for the Fricke group (Q5881025) (← links)
• The Hasse invariant of the Tate normal form \(E_7\) and the supersingular polynomial for the Fricke group \(\Gamma_0^*(7)\) (Q6185048) (← links)