Rings of invariants for three dimensional modular representations

Abstract

Let p>3 be a prime number. We compute the rings of invariants of the elementary abelian p-group ( Z/p Z)r for 3-dimensional generic representations. Furthermore we show that these rings of invariants are complete intersections rings with embedding dimension r/2 +3. This proves a conjecture of Campbell, Shank and Wehlau in [CSW], which they proved for r=3, and later Pierron and Shank proved it for r=4.

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