Interpolation of Besov B pτ σq and Lizorkin-Triebel F pτ σq spaces

An interpolation method is introduced for anisotropic spaces which generalizes the method by D. L. Fernandez [4]. By means of this method, interpolation properties of Besov B _pτ ^σq and Lizorkin-Triebel F _pτ ^σq spaces are investigated. Among others, the completeness of the scale of these spaces is proved with respect to the considered interpolation method.     

不等式a~(p q) b~(p q)≥a~pb~q a~qb~p的应用

不等式ａｐ＋ｑ＋ｂｐ＋ｑ≥ａｐｂｑ＋ａｑｂｐ的应用钟成圣（安徽省合肥市中国科大附中２３００２６）定理若ａ，ｂ，ｐ，ｑ∈Ｒ＋，则ａｐ＋ｑ＋ｂｐ＋ｑ≥ａｐｂｑ＋ａｑｂｐ①当且仅当ａ＝ｂ时等号成立．证∵ｐ，ｑ∈Ｒ＋，∴幂函数ｙ＝ｘｐ和ｙ＝ｘｑ在（０，＋∞）...     

(p,q)-John椭球

本文主要研究(p,q)-John椭球.经典的John椭球和L_p John椭球均是(p,q)-John椭球的特殊情形.首先讨论(p,q)-John椭球的充分必要条件和连续性.得到了关于(p,q)-John椭球的不等式和包含关系,所得到的不等式和包含关系分别类似于Ball体积比不等式和John包含关系.     

"若p则q"的否定是"若p则非q"吗

文 [1 ]认为 :“若ｐ则ｑ”的否定是“若ｐ则非ｑ” .文 [2 ]也说 :“应该明确 ,命题的非只否定结论” .而文 [3 ]则运用这样的方法 ,作出了命题 :ｐ :可以被 5整除的整数 ,末位是 0 .非ｐ :可以被 5整除的整数 ,末位不是 0 .并以这一对命题同为假命题作为反例 ,对新教材非ｐ的真值表提出质疑 .“若ｐ则ｑ”的否定果真是“若ｐ则非ｑ”么 ?否 !逻辑学告诉我们「 (ｐｑ) 「 (「ｐ∨ｑ)　　蕴涵等值式 「 (「ｐ) ∧ (「ｑ)　ＤｅＭｏｒｇａｎ律 ｐ∧ (「ｑ)　　　双重否定律也就是说“若ｐ则ｑ”的否定已不再是一个条件命题 (或蕴涵命题[4 …     

Two-weight Lp- Lq Bounds for Positive Dyadic Operators: Unified Approach to p ≤ q and p > q

We characterize the bounded and compact generalized Volterra companion integral operators acting between the standard Fock spaces. We also obtain asymptotic estimates for the norm of these operators in terms of certain Berezin type integral transforms which involve some function theoretic properties of symbols inducing the operators. As a special case, we prove that there exist no nontrivial compact Volterra companion integral and multiplication operators on Fock spaces.     

简易逻辑中的“p或q”

在高一数学新教材中引进了简易逻辑这一节,许多同学对“p或q”这张真值表提出了质疑. 质疑1 p:1是有理数;q;1是无理数.这里p真q假,按照真值表:“p或q”为真,可“p或q;1是有理数或1是无理数”是真命题确实让人费解. 质疑2 p:同一平面内不重合的两直线平行;q:同一平面内不重合的两直线相交.这里p假q假,按照真值表:“p或q”为假,可“p或q:同一平面内不重合的两直线平行或相交”     

(U(p, q), U(p − 1, q)) is a generalized Gelfand pair

Denote by G = U(p, q) the orthogonal group of the sesqui-linear quadratic form on and let H ₁ = U(p − 1, q) be the stabilizer of the first unit vector e ₁. Let H ₀ = U(1) and set H = H ₀ × H ₁. Define the character χ _l of H by where . Define the anti-involution σ on G by . In this note we show that any distribution T on G satisfying T(h ₁ gh ₂) = χ _l (h ₁ h ₂) T(g) (g ∈ G; h ₁, h ₂ ∈ H) is invariant under the anti-involution σ. This result implies that (G,  H ₁) is a generalized Gelfand pair.      

Lp + Lq and Lp ∩ Lq are not isomorphic for all 1 ≤ p,q ≤ ∞, p ≠ q

We prove that if $1\le p,q\le \infty$, then the spaces $L_p+L_q$ and $L_p\cap L_q$ are isomorphic if and only if $p=q$. In particular, $L_2+L_{\infty }$ and $L_2\cap L_{\infty }$ are not isomorphic, which is an answer to a question formulated in [2].     

关于"若p则q"的否定

贵刊 2 0 0 1年第 7期《对“集合与简易逻辑”的教材分析与建议》一文在谈到否命题与命题的否定的区别时有下面这样一段话 :如果原命题是“若 p则 q”,那么这个原命题的否定是“若 p则非 q”,即只否定结论 ;而原命题的否命题是“若非 p则非 q”,即既否定条件又否定结论 .因此笔者认为 ,上面那一段话中将命题“若 p则 q”的否定说成是“若 p则非 q”是一种错误说法 .为清楚起见 ,列出真值表如下 :p q非 q若 p则 q若 p则非 q假假真真真假真假真真真假真假真真真假真假由上面的真值表可以看出 ,命题“若 p则非 q”与“若 p则 q”的真假性并不是…     

The Central Limit Theorem on SO0(p, q)/SO(p)×SO(q)

We obtain a central limit theorem for the space SO ₀(p, q)/SO(p)×SO(q). To achieve this, we derive a Taylor expansion of the spherical function on the group SO ₀(p, q).     

从β0到E(p,q)和E0(p,q)空间的复合算子

设ψ是单位园盘D到自身的解析映射,X是D上解析函数的Banach空间,对f∈X,定义复合算子Cψ:Cψ(f)=foψ.我们利用从β0到E(p,q)和E0(p,q)空间的复合算子研究了空间E(p,q)和E0(p,q),给出了-个新的特征.     

Compact Ceshro Operators from Spaces H（p,q,u） to H（p, q, v）

Abstract Let μ and ν be normal functions and let T _g be the extended Cesàso operator in terms of the symbol g. In this paper, we will characterize those g so that T _g is bounded (or compact) from mixed norm spaces H(p, q, μ) to H(p, q, ν) in the unit ball of C ⁿ . Furthermore, as applications, some analogous results are also given on weighted Bergman spaces and Dirichlet type spaces. Supported by the National Natural Science Foundation of China (No.10571049, 10471039), the Natural Science Foundation of Zhejiang Province (No. M103085).     

Decomposition Numbers and Cartan Invariants of S p(4,q), q = 2 n,for p = 2*

Let G be the 4-dimensional sympletic group on a finite field of q elements, q a power of 2. We find all the decomposition numbers of G in characteristic 2, corresponding to the unipotent characters of G. We also find some of the Cartan invariants of G for p = 2.     

映入E(q,p)的复合算子

§ 1 .　Introduction　　LetD ={z:｜z｜ <1}betheunitdiskofcomplexplane,H(D)bethespaceofallana lysticfunctionsonD ,denoteLebesguemeasureonDbydm ,normalizedsothatm(D) =1.Fora ∈D ,σa(z) =a-z1- az istheMobiustransformationofDtoitselfandg(z,a) =log｜1- aza-z｜istheGreenfunctionofDwithsingularityata.Everyanalyticself mapφ :D →DoftheunitdiskinducesthroughcompositionalinearcompositionoperatorCφfromH(D)toitself.Itisawell knownconsequenceofLittlewood’ssubordinationprinciple( [1],[2 ])that…     

Regularity for minimizers of functionals with p – q growth

We prove higher integrability for the gradient of vector-valued minimizers of some integral functionals with p – q growth. Received February 9, 1998     

Cn中空间F(p,q,s)到βq+n+1/p的复合算子

对一切P＞0,s≥0和q＞q＞max{-n-1,-s-1},给出了单位球上一般函数空间F(p,q,s)到Bloch型空间βq+n+1/p之复合算子Cψ有界和紧的充要条件,并给出了几个推论.     

命题"若p则q"的实质——也谈"若p则q"的否定是什么?

《中学数学》2007第2期刊出了黄祥宏先生的“集合与简易逻辑中的几个疑点”(以下简称文[1])一文,《中学数学》2007年第10期刊出了孟祥礼、孟祥东先生的“若p则q”的否定是“若p则q吗?”(以下简称文[2])一文.笔者发现,文[1]、文[2]均有严重的概念错误或逻辑错误.为便于说明,现将文[1]的疑点1及其解析和文[2]的主要观点摘录如下:文[1]疑点1命题p:“菱形的对角线相等”的否定是什么,p的真假也令人费解.解如果一个四边形是菱形,那么它的对角线存在相等,或不相等两种情况,所以命题p为假,命题的否定是“菱形的对角线不相等”,所以p也为假.此外,命…     

Regularity for minimizers of functionals with p – q growth

We prove higher integrability for the gradient of vector-valued minimizers of some integral functionals with p – q growth. Received February 9, 1998