Is it possible to classify Hopf algebras $H$ which admit a unique (up to isomorphism) irreducible comodule $V$, namely the trivial comodule $1$-dim comodule $$ V \to V \otimes H, ~~ v \mapsto v \otimes 1_H. $$
Classifying Hopf algebras that admit a singe irreducible comodule
Spyros Olympopolous
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