Let G be a finite abelian group and its Sylow p-subgroup a direct product of copies of a cyclic group of order p r , i.e., a finite homocyclic abelian group. Let Δ n (G) denote the n-th power of the augmentation ide...Let G be a finite abelian group and its Sylow p-subgroup a direct product of copies of a cyclic group of order p r , i.e., a finite homocyclic abelian group. Let Δ n (G) denote the n-th power of the augmentation ideal Δ(G) of the integral group ring ?G. The paper gives an explicit structure of the consecutive quotient group Q n (G) = Δ n (G)/Δ n+1(G) for any natural number n and as a consequence settles a problem of Karpilovsky for this particular class of finite abelian groups.展开更多
Denote by Dm the dihedral group of order 2m. Let R(Dm) be its complex representation ring, and let △(Dm) be its augmentation ideal. In this paper, we determine the isomorphism class of the n-th augmentation quoti...Denote by Dm the dihedral group of order 2m. Let R(Dm) be its complex representation ring, and let △(Dm) be its augmentation ideal. In this paper, we determine the isomorphism class of the n-th augmentation quotient △^n(Dm)/△^n+1(Dm) for each positive integer n.展开更多
In this paper, we study the basis of augmentation ideals and the quotient groups of finite non-abelian p-group which has a cyclic subgroup of index p, where p is an odd prime, and k is greater than or equal to 3. A co...In this paper, we study the basis of augmentation ideals and the quotient groups of finite non-abelian p-group which has a cyclic subgroup of index p, where p is an odd prime, and k is greater than or equal to 3. A concrete basis for the augmentation ideal is obtained and then the structure of its quotient groups can be determined.展开更多
Two fundamental problems on the invariant holomorphic extensions have been posed, which are naturally arose from our solution of the extended future tube conjecture and closely and deeply related to the general theory...Two fundamental problems on the invariant holomorphic extensions have been posed, which are naturally arose from our solution of the extended future tube conjecture and closely and deeply related to the general theory of Stein manifolds due to Cartan-Serre. In this paper, the relationship is presented between the two problems, the motivation of considering the problems, and the methods to approach the problems. We have also posed some questions and conjectures related to this two problems.展开更多
For a square-free integer d other than 0 and 1, let K = Q(√d), where Q is the set of rational numbers. Then K is called a quadratic field and it has degree 2 over Q. For several quadratic fields K = Q(√d), the r...For a square-free integer d other than 0 and 1, let K = Q(√d), where Q is the set of rational numbers. Then K is called a quadratic field and it has degree 2 over Q. For several quadratic fields K = Q(√d), the ring Rd of integers of K is not a unique-factorization domain. For d 〈 0, there exist only a finite number of complex quadratic fields, whose ring Rd of integers, called complex quadratic ring, is a unique-factorization domain, i.e., d = -1,-2,-3,-7,-11,-19,-43,-67,-163. Let Q denote a prime element of Rd, and let n be an arbitrary positive integer. The unit groups of Rd/(Q^n) was determined by Cross in 1983 for the case d = -1. This paper completely determined the unit groups of Rd/(Q^n) for the cases d = -2, -3.展开更多
In this paper, we present a complete classification for locally-primitive arctransitive graphs which have square-free order and valency 10. The classification involves nine graphs and three infinite families of graphs.
基金This work was supported by the National Natural Science Foundation of China (Grant No.10271094)"Hundred Talent"Program of the Chinese Academy of Sciences
文摘Let G be a finite abelian group and its Sylow p-subgroup a direct product of copies of a cyclic group of order p r , i.e., a finite homocyclic abelian group. Let Δ n (G) denote the n-th power of the augmentation ideal Δ(G) of the integral group ring ?G. The paper gives an explicit structure of the consecutive quotient group Q n (G) = Δ n (G)/Δ n+1(G) for any natural number n and as a consequence settles a problem of Karpilovsky for this particular class of finite abelian groups.
文摘Denote by Dm the dihedral group of order 2m. Let R(Dm) be its complex representation ring, and let △(Dm) be its augmentation ideal. In this paper, we determine the isomorphism class of the n-th augmentation quotient △^n(Dm)/△^n+1(Dm) for each positive integer n.
文摘In this paper, we study the basis of augmentation ideals and the quotient groups of finite non-abelian p-group which has a cyclic subgroup of index p, where p is an odd prime, and k is greater than or equal to 3. A concrete basis for the augmentation ideal is obtained and then the structure of its quotient groups can be determined.
文摘Two fundamental problems on the invariant holomorphic extensions have been posed, which are naturally arose from our solution of the extended future tube conjecture and closely and deeply related to the general theory of Stein manifolds due to Cartan-Serre. In this paper, the relationship is presented between the two problems, the motivation of considering the problems, and the methods to approach the problems. We have also posed some questions and conjectures related to this two problems.
基金This work was supported by the National Natural Science Foundation of China (Grant Nos. 11461010, 11161006), the Guangxi Natural Science Foundation (2014GXNSFAAll8005, 2015GXNSFAA139009), the Guangxi Science Research and Technology Development Project (1599005-2-13), and the Science Research Fund of Guangxi Education Department (KY2015ZD075).
文摘For a square-free integer d other than 0 and 1, let K = Q(√d), where Q is the set of rational numbers. Then K is called a quadratic field and it has degree 2 over Q. For several quadratic fields K = Q(√d), the ring Rd of integers of K is not a unique-factorization domain. For d 〈 0, there exist only a finite number of complex quadratic fields, whose ring Rd of integers, called complex quadratic ring, is a unique-factorization domain, i.e., d = -1,-2,-3,-7,-11,-19,-43,-67,-163. Let Q denote a prime element of Rd, and let n be an arbitrary positive integer. The unit groups of Rd/(Q^n) was determined by Cross in 1983 for the case d = -1. This paper completely determined the unit groups of Rd/(Q^n) for the cases d = -2, -3.
基金Supported by the National Natural Science Foundation of China(1146101011661013+1 种基金11661014)the Guangxi Science Research and Technology Development Project(1599005-2-13)
基金This work was supported by the National Natural Science Foundation of China (grants 11371204, 11731002).
文摘In this paper, we present a complete classification for locally-primitive arctransitive graphs which have square-free order and valency 10. The classification involves nine graphs and three infinite families of graphs.
