Add to ORKGLet G be a finite group and p be a prime. We investigate isomorphism invariants of [G]-lattices whose extension of scalars to is self-dual, called regulator constants. These were originally introduced by Dokchitser–Dokchitser in the context of elliptic curves. Regulator constants canonically yield a pairing between the space of Brauer relations for G and the subspace of the representation ring for which regulator constants are defined. For all G, we show that this pairing is never identically zero. For formal reasons, this pairing will, in general, have non-trivial kernel. But, if G has cyclic Sylow p-subgroups and we restrict to considering permutation lattices, then we show that the pairing is non-degenerate modulo the formal kernel. Us...
Let G be a group and let ρ: G → Sym(V ) be a permutation representation of G on a set V . We prove t...
I have studied representation theory of finite groups, in particular of the symmetric group over fie...
Restrictions imposed on the topology of a space X by the action of a group G are investigated via an...
We provide a formal framework for the theory of representations of finite groups, as modules over th...
We compare two approaches to the study of Galois module structures: on the one hand, factor equivale...
If GG is a non-cyclic finite group, non-isomorphic GG-sets X,YX,Y may give rise to isomorphic permut...
Abstract. The Weyl group of a compact connected Lie group is a reflec-tion group. If such Lie groups...
Abstract. Let X denote an irreducible smooth projective variety over a finite field, which supports ...
Let $G$ be a finite group acting freely on a smooth projective scheme $X$ over a locally compact fie...
Representations of finite groups are much simpler than those of larger ones, but they offer a model ...
The U 2 norm gives a useful measure of quasirandomness for realor complex-valued functions defined o...
If GG is a non-cyclic finite group, non-isomorphic GG-sets X,YX,Y may give rise to isomorphic permut...
AbstractFor a faithful linear representation of a finite group G over a field of characteristic p, w...
AbstractLet D(G) and D(G˜) be the rings of monomial representations of finite groups G and G˜ of odd...
We construct analogues of FI-modules where the role of the symmetric group is played by the general ...
Let G be a group and let ρ: G → Sym(V ) be a permutation representation of G on a set V . We prove t...
I have studied representation theory of finite groups, in particular of the symmetric group over fie...
Restrictions imposed on the topology of a space X by the action of a group G are investigated via an...
We provide a formal framework for the theory of representations of finite groups, as modules over th...
We compare two approaches to the study of Galois module structures: on the one hand, factor equivale...
If GG is a non-cyclic finite group, non-isomorphic GG-sets X,YX,Y may give rise to isomorphic permut...
Abstract. The Weyl group of a compact connected Lie group is a reflec-tion group. If such Lie groups...
Abstract. Let X denote an irreducible smooth projective variety over a finite field, which supports ...
Let $G$ be a finite group acting freely on a smooth projective scheme $X$ over a locally compact fie...
Representations of finite groups are much simpler than those of larger ones, but they offer a model ...
The U 2 norm gives a useful measure of quasirandomness for realor complex-valued functions defined o...
If GG is a non-cyclic finite group, non-isomorphic GG-sets X,YX,Y may give rise to isomorphic permut...
AbstractFor a faithful linear representation of a finite group G over a field of characteristic p, w...
AbstractLet D(G) and D(G˜) be the rings of monomial representations of finite groups G and G˜ of odd...
We construct analogues of FI-modules where the role of the symmetric group is played by the general ...
Let G be a group and let ρ: G → Sym(V ) be a permutation representation of G on a set V . We prove t...
I have studied representation theory of finite groups, in particular of the symmetric group over fie...
Restrictions imposed on the topology of a space X by the action of a group G are investigated via an...