分数阶Schrodinger—Kirchhoff方程无穷多高能量解的存在性

本文研究如下带有变号势函数的分数阶Schrodinger Kirchhoff方程(a+b∫∫R^N|u(x)-u(y)|^p/|x-y|^N+p^sdxdy)^p-1(-△)p^su+λV(x)|u|^p-2u=f(x,u)-μg(x)|u|^q-2u,x∈R^N.其中s∈(0,1),p∈[2,∞),q∈(l,p),a,b>0,λ,μ>0均为正常数,在V,f,g等函数合适的条件下,运用喷泉定理获得该系统无穷多高能量解的存在性.     

PHASE RETRIEVAL OF TIME-LIMITED SIGNALS

The problem of reconstructing a signal ψ(x) from its magnitude |ψ(x)| is of considerable interest to engineers and physicists.This article concerns the problem of determining a time-limited signal f with period 2π when |f(eix)| is known for x ∈ [-π,π].It is shown that the conditions |g(eix)| = |f(eix)| and |g(ei(x+b))-g(eix)| = |f(ei(x+b))-f(eix)|,b = 2π,together imply that either g = wf or g = vf,where both w and v have period b.Furthermore,if 2bπ is irrational then the functions w and v reduce to some constants c1 and c2,respectively;if 2bπ is rational then w takes the form w=eiαB1(eix)B2(eix) and v takes the form ei(x2πN/b+α)B1(eix)B2(eix),where B1 and B2 are Blaschke products.     

A Dominated Theorem on 5L(2, R) and Its Application

In this paper, we give the following dominated theorem: Let φ(g) ∈ L1(G//K),φε(t)=ε> 0, and the least radical decreasing dominatedfunction φ(t) = sup |φ(y)| ∈L1(G//K). If shtφ(t) is monotonically decreasingon (0, ∞), then for any f∈L1loc(G//K) , the following inequality holds:sup |φε * f(x)| ≤ Cmf(x),where mf(x) is the Hardy-Littlewood maximal function of f, and C = ||φ||1.An application of this dominated theorem is also given.     

WEAK TRAVELLING WAVE FRONT SOLUTIONS OF GENERALIZED DIFFUSION EQUATIONS WITH REACTION

The author demonstrate that the two-point boundary value problem {p′(s)=f′(s)-λp^β(s)for s∈(0,1);β∈(0,1),p(0)=p(1)=0,p(s)>0 if s∈(0,1),has a solution(λ^-，p^-（s）),where |λ^-| is the smallest parameter,under the minimal stringent restrictions on f(s), by applying the shooting and regularization methods. In a classic paper, Kohmogorov et.al.studied in 1937 a problem which can be converted into a special case of the above problem. The author also use the solution(λ^-,p^-(s)) to construct a weak travelling wave front solution u(x,t)=y(ξ),ξ=x-Ct,C=λ^-N/(N+1),of the generalized diffusion equation with reaction δ/δx（k（u）|δu/δx|^n-1 δu/δx)-δu/δt=g（u），where N>0,k(s)>0 a.e.on(0,1),and f(a):=n+1/N∫0ag(t)k^1/N(t)dt is absolutely continuous ou[0,1],while y(ξ) is increasing and absolutely continuous on (-∞,+∞) and (k(y(ξ))|y′(ξ)|^N)′=g(y(ξ))-Cy′(ξ)a.e.on(-∞，+∞）,y(-∞)=0,y(+∞)=1.     

Existence of multiple solutions for a fractional p-Laplacian system with concave-convex term

In this article, we study the existence of multiple solutions for the following system driven by a nonlocal integro-differential operator with zero Dirichlet boundary conditions{(-?)_p~su = a(x)|u|~(q-2) u +2α/α + βc(x)|u|~(α-2) u|v|~β, in ?,(-?)_p~sv = b(x)|v|~(q-2) v +2β/α + βc(x)|u|α|v|~(β-2) v, in ?,u = v = 0, in Rn\?,(0.1) where Ω is a smooth bounded domain in Rn, n ps with s ∈(0,1) fixed, a(x), b(x), c(x) ≥ 0 and a(x),b(x),c(x) ∈L∞(Ω), 1 q p and α,β 1 satisfy pα + βp*,p* =np/n-ps.By Nehari manifold and fibering maps with proper conditions, we obtain the multiplicity of solutions to problem(0.1).?????     

Orlicz空间内第一类不适定积分方程的解

讨论由L~2[a,b]到Orlicz空间L_M~*[a,b]内第一类积分方程 integral from n=a to b(K(x,y)g(y)dy=f(x)) (1)f∈L_M~*[a,b]。这里K(x,y)满足 integral from n=a to b integral from n=a to b(|K(x,y)|~2dxdy〈∞) L_M~*[a,b]为N函数M(u)生成的Orlicz空间,并赋以Orlicz范数||·||_M;L_(N)~*[a,b]为M(u)的余N函数N(v)生成的Orlicz空间,赋以Luxemburg范数。     

对一类函数不等式的讨论

一、问题的来源例 :已知 :当 |x|≤ 1时 ,有 |ax2 +bx +c|≤ 1 .证明 :当 |x|≤ 1时 ,有 |2ax +b|≤ 4 .以上为一匈牙利奥数竞赛题 ,综观各类文献 ,其典型的证法有以下两种 :证法一 :记f(x) =ax2 +bx+c,g(x) =2ax+b.因函数 g(x)在 [- 1 ,1 ]上单调 ,故只要证明在已知条件下有 |g(1 ) |=|2a+b|≤4且|g(- 1 ) |=|- 2a+b|≤ 4即可 .易知2a+b=32 (a +b +c) +12 (a -b +c) - 2c=32 f(1 ) +12 f(- 1 ) - 2f(0 ) .于是由 |f(- 1 ) |≤ 1 ,|f(0 ) |≤ 1及|f(1 ) |≤ 1 ,知 |2a +b|≤ 32 |f(1 ) |+12 |f(- 1 ) |+2 |f(0 ) |≤32 +12 +2 =4,即 |2a +b|…     

一类奇异拟线性椭圆方程正解的多重性

研究奇异拟线性椭圆型方程{-div(|x|~(-ap)|▽u|~(p-2)▽u) + f(x)|u|~(p-2) = g(x)\u|~(q-2)u + λh(x)|u|~(r-2),x R~N,u(x) 0,x∈ R~N,其中λ0是参数,1pN(N3),1rpgp*=0a(N—p)/p,p*=Np/{N~pd),aa+l,d=a+l-60,权函数f(x),g(x),h(x)满足一定的条件.利用山路引理和Ekeland变分原理证明了问题至少有两个非平凡的弱解.     

Use Cesro Means To Describe Two Classes of Functions

Let H(D)be the collection of functions which are analytic in the unitdisc D.we call B_0={f∈H(D),(?)(1-|z|~2)|f’(z)|=0}litlle Bloch space.Letf∈H(D),0相似文献   

INTERPOLATION WITH RESTRICTED ARC LENGTH

AbstractFor given data (t_i,y_i),i=0, 1,…,n,0=t_0相似文献   

Degree of L~P Approximation by Operators of Kantorovi(?) Type Satisfying Micchelli Conditions

§1 We see symbols in article, L~∞[a,b]C[a,b], let f(t) be absolute continuous over [a,b], we denote by f∈AC[a,b], L_k~p[a,b]{f:f~(k-1)∈AC[a,b] and f~(k)(t)∈L~p[a,b]}.C_k[a,b]L_k~∞[a,b], W~kL{f:f∈L_k~p[a,b] and ‖f~(k)‖_p≤1}. Let H_n.be set of algebraic polynomials of degree≤n. Let B_n(F) be Bernstein polynomials,P_n(f) be Kantorovi polynomials. We generalize p_n(f). Let T be linear operator C[a,b]AC[a,b],for g(u)∈C[a,b] we have T(g(u),a)=g(a), T(g(u),b)=g(b), let f(t)∈L[a,b], F(u) =integral from n=0 to u(f(t)dt),     

Lp[0,1](1《p《∞)空间正系数多项式的倒数逼近的Jackson型估计

本文讨论了Lp[0,1](1相似文献   

R~N上临界增长p-Kirchhoff型方程的非平凡解的存在性

本文主要研究以下具临界增长的非线性p-Kirchhoff型方程的非平凡解的存在性:{-(a+b∫_(R~N)|▽u|~p)?_pu=|u|~(p*-2)u+μf (x)|u|~(q-2)u, x∈R~N,(0.1) u∈D~(1,p)(R~N),其中a≥0,b0,1pN,1qp,p*=N_p/(N-p),μ≥0,?_pu=div(|▽u|~(p-2)▽u)表示p-Laplace算子对函数u的作用, f∈L(p*/(p*-q))(R~N)\{0}且f是非负的.本文利用Ekeland变分原理和山路定理证明方程(0.1)在适当条件下至少存在两个非平凡解.     

含参二次绝对值函数题的解法探究

<正>一、试题呈现已知函数f(x)=x²+ax+b(a,b∈R).记函数g(x)=|f(x)|在区间[0,4]上的最大值为M(a,b).求证:当-8≤a≤0时,有M(a,b)≥1/8a2+ax+b(a,b∈R).记函数g(x)=|f(x)|在区间[0,4]上的最大值为M(a,b).求证:当-8≤a≤0时,有M(a,b)≥1/8a².二、解题探究解法一(1)当a=0时,f(x)=x2.二、解题探究解法一(1)当a=0时,f(x)=x²+b在区间[0,4]上为增函数,则M(a,b)=max{|f(0)|,|f(4)|}     

Boundedness of Marcinkiewicz integral related to multilinear commutators with variable kernels on Hardy spaces

Let→b=(b1,b2,…,bm),bi∈∧βi(Rn),1≤I≤m,βi＞0,m∑I=1βi=β,0＜β＜1,μΩ→b(f)(x)=(∫∞0|F→b,t(f)(x)|2dt/t3)1/2,F→b,t(f)(x)=∫|x-y|≤t Ω(x,x-y)/|x-y|n-1 mΠi=1[bi(x)-bi(y)dy.We consider the boundedness of μΩ,→b on Hardy type space Hp→b(Rn).     

Multiple solutions for weighted nonlinear elliptic system involving critical exponents

In this paper,by using the idea of category,we investigate how the shape of the graph of h(x)affects the number of positive solutions to the following weighted nonlinear elliptic system:-div(|x|-2au)-μu|x|2(a+1)=αα+βh(x)|u|α-2|v|βu|x|b2*(a,b)+λK1(x)|u|q-2u,in,-div(|x|-2av)-μv|x|2(a+1)=βα+βh(x)|u|α|v|β-2v|x|b2*(a,b)+σK2(x)|v|q-2v,in,u=v=0,on,where 0∈is a smooth bounded domain in RN(N 3),λ,σ0 are parameters,0μμa(N-2-2a2)2;h(x),K1(x)and K2(x)are positive continuous functions in,1 q2,α,β1 andα+β=2*(a,b)(2*(a,b)2N N-2(1+a-b),is critical Sobolev-Hardy exponent).We prove that the system has at least k nontrivial nonnegative solutions when the pair of the parameters(λ,σ)belongs to a certain subset of R2.     

三次样条插值的收敛性

设f(x)∈C_[a,b],△_n是区间[a,b]的分划 △_n:a=x_0相似文献   

综合题新编选登

题 73　 双曲线 x2a2- y2b2 =1(a >0 ,b >0 )的左、右焦点分别为F1,F2 ,点P(x0 ,y0 )是双曲线右支上一点 ,且x0 >2a .I为△PF1F2 的内心 ,直线PI交x轴于Q点 ,若 |F1Q| =|PF2 | ,当a ,b变化时 ,求I分PQ的比λ的取值范围 (见图 1) .解　设双曲线半焦距为c ,则c =a2 +b2 .∵I为PQ的内分点 ,则λ =PIIQ=|PI||IQ| .由内角平分线定理知|PI||IQ| =|PF1||F1Q| =|PF2 ||F2 Q| .又∵ |F1Q| =|PF2 | .∴|PI||IQ| =|PF1||PF2 | ,可得|PI| - |IQ||IQ| =|PF1| - |PF2 ||PF2 | =2a|PF2 | ,|PI||IQ| =|F1Q||F2 Q| ,可得|PI| …     

联合最佳一致逼近

1.引言 设X为[a,b]中至少含有n 1个点的紧集,其中n为一个固定的自然数.在实连续函数空间C(X)中定义一致范数||f||=max[f(x)|。M是C[a,b]中的n维Haar子空间,h_1(x),…,h_n(x)是它的一个基底.     

一类Kirchhoff方程Neumann边值问题解的存在性

考虑如下一类Kirchhoff方程Neumann边值问题:{-(a+b∫Ω(|↓△u|²+|u|²dx)(△u-u)+=c(x)|u|^q-2u+f(x,u)■u/■v=0,其中Ω■R^N是光滑有界域,c(x)可能是变号函数,a≥0,b>0且a+b>0,1相似文献