简介:研究了随机半闭1-集压缩算子和随机凝聚算子的随机不动点指数问题,推广了郭大钧文中的几个定理.
简介:(满分100分,90分钟完成)(A)基础知识达标检测一、选择题(每小题4分,共40分)1.一1{的倒数是().(A)詈(引专(c)一了8(D)一i52.如果la1=一a,那么a的取值范围是().(A)a<0(B)a≤0(C)a>0(D)a≥03.化简√(I.4l一/2)j的结果是().(A)l(B)0(c)1.4l一√2(D)j!一1.414.汁算一2x·』!的结果是().(舢一』。(引一2x’(c)一4x!(D)2x。5.下列因式分解正确的是().(A)x!一5J+6=(_+I)(Y一6)-(B)x!)一”!+Ⅵ=U(1一J)(C)1一(“+6):=(1+n+b)(1n
简介:在文[1]的基础上,得到了二维广义的Ginzburg-Landau方程的指数吸引子的存在性。
简介:EfronandAmaripresentedaRiemanniangeometricframeworkforqurvedexponentialfamiliesandstudiedtheinformationlossandthevarianceoftheestimateusingthisframilies.InthispapproposearelativelyrumplegeometricframeworkinEuclideanspace.Basedonthisnewframework,westudyeonfidenceregiodsforcurvedexponentialfamilieswhichhavenotbeenstudiedbyEfronandAmari.TheresultsobtainedbyHamiltonetal.areextendedtocurvedexponentialfamilies.
简介:AKekuléanbenzenoidsystemisonewithKekuléstructures.Afixeddouble(single)bondofaKekuléanbenzenoidsystemHisanedgebelongingtoall(none)oftheKekuléstructuresofH.EssentiallydisconnectedsystemsareKekuléanpericondensedbenzenoidsystemswithsomefixeddoubleorsinglebonds.InthispaperanecessaryandsufficientconditionforaKekuléanbenzenoidsystemtobeanessentiallydisconnectedbenzenoidsystemwithfixeddoublebondsisgivenandrigorouslyproved.
简介:运用变分方法研究了下面问题-Δpu=μupx(s)s-2u+f(x,u),x∈Ω,u=0,x∈Ω,多重解的存在性,其中Ω是一个具有光滑边界的有界区域.