On the Top Degree of Coinvariants
Abstract
For a finite group G acting faithfully on a finite dimensional F-vector space V, we show that in the modular case, the top degree of the vector coinvariants grows unboundedly: m∞ F[Vm]G=∞. In contrast, in the non-modular case we identify a situation where the top degree of the vector coinvariants remains constant. Furthermore, we present a more elementary proof of Steinberg's theorem which says that the group order is a lower bound for the dimension of the coinvariants which is sharp if and only if the invariant ring is polynomial.
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