On a conjecture about dominant dimensions of algebras
Abstract
For every n ≥ 1, we present examples of algebras A having dominant dimension n, such that the algebra B=EndA(I0 -n(A)) has dominant dimension different from n, where I0 is the injective hull of A. This gives a counterexample to conjecture 2 of Chen and Xi. While the conjecture is false in general, we show that a large class of algebras containing higher Auslander algebras satisfies the property in the conjecture.
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