In this paper,we study the structures of monomial Hopf algebras over a field of positive characteristic.A necessary and sufficient condition for the monomial coalgebra Cd(n)to admit Hopf structures is given here,and i...In this paper,we study the structures of monomial Hopf algebras over a field of positive characteristic.A necessary and sufficient condition for the monomial coalgebra Cd(n)to admit Hopf structures is given here,and if it is the case,all graded Hopf structures on Cd(n)are completely classified.Moreover,we construct a Hopf algebras filtration on Cd(n)which will help us to discuss a conjecture posed by Andruskiewitsch and Schneider.Finally combined with a theorem by Montgomery,we give the structure theorem for all monomial Hopf algebras.展开更多
Let A be a monomial quasi-hereditary algebra with a pure strong exact Borel subalgebra B.It is proved that the category of induced good modules over B is contained in the category of good modules over A;that the chara...Let A be a monomial quasi-hereditary algebra with a pure strong exact Borel subalgebra B.It is proved that the category of induced good modules over B is contained in the category of good modules over A;that the characteristic module of A is an induced module of that of B via the exact functor-(?)_B A if and only if the induced A-module of an injective B-module remains injective as a B-module.Moreover,it is shown that an exact Borel subalgebra of a basic quasi-hereditary serial algebra is right serial and that the characteristic module of a basic quasi-hereditary serial algebra is exactly the induced module of that of its exact Borel subalgebra.展开更多
Let K〈X〉 = K(X1,..., Xn) be the free K-algebra on X = {X1,..., Xn} over a field K, which is equipped with a weight N-gradation (i.e., each Xi is assigned a positive degree), and let G be a finite homogeneous GrS...Let K〈X〉 = K(X1,..., Xn) be the free K-algebra on X = {X1,..., Xn} over a field K, which is equipped with a weight N-gradation (i.e., each Xi is assigned a positive degree), and let G be a finite homogeneous GrSbner basis for the ideal I = (G) of K(X) with respect to some monomial ordering 〈 on K(X). It is shown that if the monomial algebra K(X)/(LM(6)) is semiprime, where LM(6) is the set of leading monomials of 6 with respect to 〈, then the N-graded algebra A : K(X)/I is semiprimitive in the sense of Jacobson. In the case that G is a finite nonhomogeneous Gr6bner basis with respect to a graded monomial ordering 〈gr, and the N-filtration FA of the algebra A = K(X)/I induced by the N-grading filtration FK(X) of K(X) is considered, if the monomial algebra K(X)/(LM(6)) is semiprime, then it is shown that the associated N-graded algebra G(A) and the Rees algebra A of A determined by FA are all semiprimitive.展开更多
基金Supported by the National Natural Science Foundation of China(Grant No.11301144,11771122,11801141).
文摘We give a complete description of the Batalin-Vilkovisky algebra structure on Hochschild cohomology of the self-injective quadratic monomial algebras.
基金supported by the Program for New Century Excellent Talents in University(Grant No.04-0522)the second author was supported by the National Natural Science Foundation of China(Grant Nos.10271113&10501041)the Doctoral Foundation of the Chinese Education Ministry.
文摘In this paper,we study the structures of monomial Hopf algebras over a field of positive characteristic.A necessary and sufficient condition for the monomial coalgebra Cd(n)to admit Hopf structures is given here,and if it is the case,all graded Hopf structures on Cd(n)are completely classified.Moreover,we construct a Hopf algebras filtration on Cd(n)which will help us to discuss a conjecture posed by Andruskiewitsch and Schneider.Finally combined with a theorem by Montgomery,we give the structure theorem for all monomial Hopf algebras.
基金National Natural Science Foundation of China(Grant No.10601036)
文摘Let A be a monomial quasi-hereditary algebra with a pure strong exact Borel subalgebra B.It is proved that the category of induced good modules over B is contained in the category of good modules over A;that the characteristic module of A is an induced module of that of B via the exact functor-(?)_B A if and only if the induced A-module of an injective B-module remains injective as a B-module.Moreover,it is shown that an exact Borel subalgebra of a basic quasi-hereditary serial algebra is right serial and that the characteristic module of a basic quasi-hereditary serial algebra is exactly the induced module of that of its exact Borel subalgebra.
基金Project supported by the National Natural Science Foundation of China (10971044).
文摘Let K〈X〉 = K(X1,..., Xn) be the free K-algebra on X = {X1,..., Xn} over a field K, which is equipped with a weight N-gradation (i.e., each Xi is assigned a positive degree), and let G be a finite homogeneous GrSbner basis for the ideal I = (G) of K(X) with respect to some monomial ordering 〈 on K(X). It is shown that if the monomial algebra K(X)/(LM(6)) is semiprime, where LM(6) is the set of leading monomials of 6 with respect to 〈, then the N-graded algebra A : K(X)/I is semiprimitive in the sense of Jacobson. In the case that G is a finite nonhomogeneous Gr6bner basis with respect to a graded monomial ordering 〈gr, and the N-filtration FA of the algebra A = K(X)/I induced by the N-grading filtration FK(X) of K(X) is considered, if the monomial algebra K(X)/(LM(6)) is semiprime, then it is shown that the associated N-graded algebra G(A) and the Rees algebra A of A determined by FA are all semiprimitive.
