Pages that link to "Item:Q663593"

The following pages link to The simple Ree groups \(^2F_4(q^2)\) are determined by the set of their character degrees. (Q663593):

Displaying 10 items.

• A conjecture of Abe-Iiyori and the Ree groups \(^2F_4(q)\). II. (Q867772) (← links)
• Simple classical groups of Lie type are determined by their character degrees. (Q1758420) (← links)
• On Huppert's conjecture for \(G_2(q)\), \(q\geq 7\). (Q1940205) (← links)
• PROJECTIVE SPECIAL LINEAR GROUPS <font>PSL</font>₄(q) ARE DETERMINED BY THE SET OF THEIR CHARACTER DEGREES (Q3144374) (← links)
• A CHARACTERIZATION OF PSL(4,p) BY SOME CHARACTER DEGREE (Q3388610) (← links)
• Mathieu groups and its degree prime-power graphs (Q5227693) (← links)
• Groups with the same character degrees as sporadic quasisimple groups (Q5858454) (← links)
• A characterization of the simple Ree groups \(^2 F_4( q^2)\) by their character codegrees (Q6146262) (← links)
• On groups with the same character degrees as almost simple groups with socle small Ree groups (Q6164568) (← links)
• Huppert's conjecture for finite simple exceptional groups of Lie type (Q6667401) (← links)