Jyotirmoy Ganguly, Steven Spallone
Published 2019-06-18Version 1
A real representation $\pi$ of a finite group may be regarded as a homomorphism to an orthogonal group $\Or(V)$. For symmetric groups $S_n$, alternating groups $A_n$, and products $S_n \times S_{n'}$ of symmetric groups, we give criteria for whether $\pi$ lifts to the double cover $\Pin(V)$ of $\Or(V)$, in terms of character values. From these criteria, we compute the second Stiefel-Whitney classes of these representations.
On a relation between certain character values of symmetric groups and its connection with creation operators of symmetric functions
Certain Applications of the Burnside Rings and Ghost Rings in the Representation Theory of Finite Groups (II)
On a perfect isometry between principal $p$-blocks of finite groups with cyclic $p$-hyperfocal subgroups
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