Quotient Hopf algebras of the free bialgebra with PBW bases and GK-dimensions

Abstract

Let K be a field. We study the free bialgebra T generated by the coalgebra C=K g K h and its quotient bialgebras (or Hopf algebras) over K. We show that the free noncommutative Fa\`a di Bruno bialgebra is a sub-bialgebra of T, and the quotient bialgebra T:=T/(Eα|~α(g) 2) is an Ore extension of the well-known Fa\`a di Bruno bialgebra. The image of the free noncommutative Fa\`a di Bruno bialgebra in the quotient T gives a more reasonable non-commutative version of the commutative Fa\`a di Bruno bialgebra from the PBW basis point view. If char K=p>0, we obtain a chain of quotient Hopf algebras of T: T Tn Tn'(p) Tn(p) Tn(p;d1) … Tn(p;dj,dj-1,…,d1) … Tn(p;dp-2,dp-3,…,d1) with finite GK-dimensions. Furthermore, we study the homological properties and the coradical filtrations of those quotient Hopf algebras.