简介:Let0<p≤1andwintheMuckenhouptclassA1.Recently,byusingtheweightedatomicdecompositionandmolecularcharacterization,Lee,LinandYang[11]es-tablishedthattheRiesztransformsRj,j=1,2,···,n,areboundedonHwp(Rn).InthisnoteweextendthistothegeneralcaseofweightwintheMuckenhouptclassA∞throughmolec-ularcharacterization.Onedifficulty,whichhasnotbeentakencarein[11],consistsinpassingfromatomstoallfunctionsinHwp(Rn).Furthermore,theHwp-boundednessofθ-Calderón-Zygmundoperatorsarealsogiventhroughmolecularcharacterizationandatomicdecomposition.
简介:研究了—(p,q)-Laplacian拟线性椭圆方程组.当连续函数V和W在两种情形下,利用Moser迭代技巧和Ljusternik-Schnirelmann畴数理论,建立了方程组正解的存在性和多重性结果.
简介:SupposethatCisthecomplexplaneandkisanon-negativeinteger.DefinefunctionsNk-(x)=|x|kifkisevenandNk(x)=x|x|k-1ifkisodd.SomeapproximationpropertiesofNk-(x)’sisdiscussedandanewexampleofaTchebycheffsystemisgivenout.
简介:引进分次Armendariz环的概念,讨论了分次环R=n∈ZRn及由它导出的非分次环R,R0,及R[x]之间关于Armendariz环性质的关系,并推广了[8]的结论,得到在R=n∈ZRn是Z-型正分次环的前提下,若R是分次Armendariz,分次正规环,则R是P.P.环(Baer环)当且仅当R是分次P.P.环(分次Baer环).
简介:本文利用等价方程组,友矩阵与Jordan标准型,研究了n阶常系数线性非齐次常微分方程P(D)x=acose^t+bsine^t其中P(D)=D^n+a1D^n-1+…+an,D=1/dt,a1,a2,…a,a,b为任意实常数,在友矩阵具有n个不同的特征根的条件下,给出了求上述方程的特解的方法,最后给出一个详细的实例。
简介:SomecharacterizationsoftheconditionalexpectationoperatorsonLebesgue-BochnerspacesL_p(μ,X)aregiven,where1≤p<∞,p≠2.AlsoanexampleisgiventoshowthatthecharacterizationsoftheconditionalexpectationoperatorsonL_p(μ,X)aredifferentfromthatonL_p(μ)_zFinally,arepresentationoftheconstant-preservingcontractiveprojectiononspacesL_p(μ,X)isgotwhen0<p<1.
简介:Wegiveaconstructionofthemaximum,andtheminimumofthesetofnondecreasmgapproxmantsinthediscretecase,whereisapositiveconoexfunction.Acharacterizationofthatsetisalsoobtained.
简介:<正>LetD={z∈:|z|<1}andφbeanormalfunctionon[0,1).Forp∈(0,1)suchafunctionφisusedtodefineaBergmanspaceA~p(φ)onDwithweightφ~p(|·|)/(1-|·|~2).Inthispaper,thedualspaceofA~p(φ)isgiven,fourcharacteristicsofCarlesonmeasureonA~p(φ)areobtained.Moreover,asanapplication,threesequenceinterpolationtheoremsinA~p(φ)arederived.