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1.
本文证明了具有某种尺寸条件的L^q1到L^q2有界的分数次次线性算子是Kq1^a,p(ω1,ω2^q1)(或Kq1^q,p)(ω1,ω2^q1)到Kq2^a,p(ω1,ω2^q2)(或Kq2^a,p(ω1,ω2^q2)有界的以及HKq1^ap(ω1,ω2^q1)(或HKq1^ap(ω1,ω2^q1)到Kq2^ap(ω1,ω2^q2)(或Kq2^ap(ω1,ω2^q2)有界的。 相似文献
2.
有限域上的仿射辛空间及其应用 总被引:4,自引:0,他引:4
本文中,首先给出了有限域Fq上的2v维仿射辛空间ASG(2v,Fq)和2v次仿射辛群ASp2v(Fq)的概念,然后讨论ASp2v(Fq)作用在ASG(2v,Fq)上的可迁性及一些相关的计数定理,最后给出应用仿射辛空间构作结合方案和认证码的例子。 相似文献
3.
将全模型y=Xβ+ε中的设计矩阵X写成分块形式(Xq:X1),相应地将β分块为β′=,称y=Xqβq+ε为选模型,[1][2]研究了在条件Cov()≥βt)下,在均方误差和预测均方误差意义下,在选模型下βq的LS估计βq优于在全模型下的LS估计βq,以及选模型下因变量y的预测值y优于全模型下的预测值y,本文在另外一个条件下,得到了上述结论。 相似文献
4.
本文首先将文[1]中的BLD映射推广为弱(L1,L2)-BLD映射,并证明了如下正则性结果:存在两个可积指数 P1=P1(n,L1,L2)<n<q1=q1(n,L1,L2),使得对任意弱(L1,L2)-BLD映射f∈(Ω,Rn),都有f∈(Ω,Rn),即f为(L1,L2)-BLD映射. 相似文献
5.
本文利用类张量的方法和广义q拉卡分解引理,计算了SUq(4)包含SUq(2)⊙Suq(2)的约化系数,并得到了递推公式,一些约化标量因子的数值在表中列出。 相似文献
6.
[题目] 在等比数列{an}中,已知首项a1和公比q,求前n项和Sn.[方法1]——先让学生演算S1,S2,S3,S4,然后启发学生猜想结论,让学生在探索过程中发现公式,培养学生的探索精神.当q≠1时,S1=a1=a1(1-q)1-qS2=a1+a1q=a1(1-q)1-q(1+q)=a1(1-q2)1-qS3=a1+a1q+a1q2=a1(1-q2)1-q+a1q2(1-q)1-q=a1(1-q3)1-qS4=a1+a1q+a1q2+a1q3=a1(1-q3)1-q+a1q3(1-q)1-q=… 相似文献
7.
王殿军 《数学年刊A辑(中文版)》1995,(1)
设G是有限群,πs(G)为G的极大子群阶之集.本文证明了若q=pn>2,p素,则G≌L2(q)当且仅当πs(G)=πs(L2(q)).对一些其它的单群也证明了同样的结论. 相似文献
8.
Wan Zhaoze 《东北数学》1998,(3)
On(4p2q2b,2p2q2b-pqb,p2q2b-pqb)MenonDiferenceSetsWanZhaoze(万兆泽)(ColegeofMathematicScience,PekingUniversity,Beijing,100871)Abs... 相似文献
9.
本文讨论了如下奇异积分算子:Tf(x)=P.V.∫R^nf(x-P(y))L(y)dy,其中P(y)=(p1(y),p2(y),…,pn(y)),K(y)=Ω(y)/‖y‖^n,∫S^n-1Ω(y)dσ(y)=0。对满足一定条件的P和Ω∈L^q(S^n-1)(q〉1),我们证明了T及其相应的极大奇异积分算子T^*都是L^p(R^n)上的有界算子。 相似文献
10.
§1. IntroductionLet:H:Rn×Rn→RbeasmoothHamiltonfunction(q,p)→H(q,p)G:Rn×Rn→R2nbesmoothoperator(q,p)→G(q,p)=(g1(q,p),…,g2n(q,p)). Wedefinetwospaces:L=span{gi,{H,gi},{H,{H,gi}},…,i=1,2,…,2n}dL(z)={df(z)|f∈L} z∈Rn×Rn.Here{,}ispoissonbracket.Throughoutth… 相似文献
11.
V. P. Burichenko 《Algebra and Logic》2008,47(6):384-394
Let G = SL(n, q), where q is odd, V be a natural module over G, and L = S2(V) be its symmetric square. We construct a 2-cohomology group H2(G, L). The group is one-dimensional over F
q if n = 2 and q ≠ 3, and also if (n, q) = (4, 3). In all other cases H2(G, L) = 0. Previously, such groups H2(G, L) were known for the cases where n = 2 or q = p is prime. We state that H2(G, L) are trivial for n ⩾ 3 and q = pm, m ⩾ 2. In proofs, use is made of rather elementary (noncohomological) methods.
__________
Translated from Algebra i Logika, Vol. 47, No. 6, pp. 687–704, November–December, 2008. 相似文献
12.
Jürgen Wolfart 《manuscripta mathematica》1975,17(4):339-362
If the modular group Γ=SL(2,?) operates in the usual way on complex vector spaces generated by suitably chosen theta constants of level q (i.e. modular forms for the congruence subgroup Γ(q) of Γ), then this operation defines a representation of the group SL(2,?/q?). Using this method, we construct all Weil representations of these groups for any prime-power q. It is shown how they depend on the underlying quadratic form of the theta constants and how theta relations can be used to find invariant subspaces. 相似文献
13.
《中国科学:数学》2021,(3):I0001-I0004
Hybrid subconvexity bounds for twisted L-functions on GL(3)Bingrong Huang Abstract Let q be a large prime,andχthe quadratic character modulo q.Letφbe a self-dual Hecke-Maass cusp form for SL(3,Z),and uj a Hecke-Maass cusp form forΓ0(q)СSL(2,Z) with spectral parameter tj. 相似文献
14.
In this paper we prove that the groupws SL(n,q), q=pm, are factors of the modular groups PSL(2,Z) When n=5,6,7 and P≠2, q≠9 相似文献
15.
《代数通讯》2013,41(6):1663-1691
ABSTRACT The main result of this paper is a graph-theoretic necessary and sufficient condition, for a given set of transvections in SL(n, K) (n > 2 and K a finite field of characteristic not 2 or 3), to generate a group isomorphic to SL (m, L), for some m and some subfield L of K. 相似文献
16.
Thomas Geisser 《K-Theory》1997,12(3):193-226
We prove that for W2
the Witt vectors of length two over the finite field
, we have
in characteristic at least 5 and
for (3,f) = 1. The result is proved by using the identity
and calculating the right term with a group homology spectral sequence. Some information on the spectral sequence is achieved by using the action of the outer automorphism of SL on the homology groups and recent results on K-groups of local rings and the ring of dual numbers over finite fields. 相似文献
17.
The authors show that linear simple groups L_2(q) with q ∈ {17, 27, 29} can be uniquely determined by nse(L_2(q)), which is the set of numbers of elements with the same order. 相似文献
18.
在《数学学报》2013年第56卷第4期中,"Suzuki-Ree群的自同构群的一个新刻画"一文证明了Aut(~2F_4(q)),q=2~f和Aut(~2G_2(q)),q=3~f,可由其阶分量刻画,其中f=3~s,s为正整数.本文证明了Aut(~2B_2(q)),q=2~f和Aut(2G2(q)),q=3~f,也可由其阶分量刻画,其中f为奇素数.结合二者得到结论:Suzuki-Ree单群的所有的素图不连通的自同构群皆可由其阶分量刻画. 相似文献
19.
In TheE(2,A) sections of SL(2,A) (Ann. of Math. 134 (1991), 159–188), we locate the E(A) normalized subgroups of SL(2,A) in central sections of SL(2,A) for all subrings of Q and all commutative rings satisfying SR
2
In solving this problem we introduced the notion of radix (see (1.1)) and the group C(Px) = [E(2,A),E(2,A;Px)] = [SL(2,A), SL(2,A;Px)] for the rings considered here.The purpose of this paper is to determine SL(2,A;PxC(Px) for SR
2 rings and number rings with infinitely many units.In Section 2, Mennicke symbols for Jordan ideals are defined. They are determined for number rings and shown to be connected to power residue symbols in a delicate way. This extends the work of Bass, Milnor and Serre.In Section 3, an explicit homomorphism from E(2,Al;Px) into an additive section of A is given for all commutative rings A. If A satisfiesSR
2 the kernel of this map is C(Px.The main problem for number rings is solved by giving an explicit homomorphism on SL(2,A;Px) whose kernel is C(Px). 相似文献
20.
SL(n, q) is the group of n×n matrices, over the Galois field GF(q), of determinate 1. PSL(n, q) is SL(n, q) modulo the scalar n×n matrices of determinate 1. PSL(n, q) acts on the Desarguesian projective space PG(n−1, q). Sp(4, q) is the group of 4 × 4 matrices of determinate 1 which preserve the symplectic bilinear form on the 4 × 1 matrices over GF(q). PSp(4, q) is Sp(4, q) modulo Z = {1,−1}. PSp(4, q) acts on the symplectic generalized quadrangle W(3, q), a subspace of the projective space PG(3, q), as a group of automorphisms. In this paper, bounds are given for the genus of these groups. 相似文献