Cauchy核奇异积分方程关于积分曲线的稳定性

当Ｅ为复平面上的有界连通区域,所有已知函数在Ｅ上满足Ｈｏｌｄｅｒ条件,光滑封闭曲线Г■Ｅ时,借助广义逆,讨论了正则型Ｃａｕｃｈｙ核奇异积分方程在Г发生某种光滑扰动时的稳定性问题,给出了相应的误差估计,并建立了收敛性定理     

一类奇异积分和Cauchy型积分关于积分曲线的稳定性

本文讨论了当任意给定的f（τ,t）在某个区域E内属于H类时,奇异积分在封闭或开口光滑曲线E发生光滑扰动时的稳定性,并给出了相应的误差估计．作为应用,我们还讨论了当（t）在E内属于H类时,Cauchy型积分,在封闭光滑曲线E发生光滑扰动时的稳定性及误差估计．     

开口弧段上的奇异积分方程关于积分曲线的稳定性

设E是复平面上的有界单连通区域 ,Γ =ab是E中的一条Lyapunov开口弧段 ,当a(z) ,b(z)∈Hv(E) (0 相似文献   

一类具一阶奇性核的奇异积分方程

当(?)是复平面C上的光滑封闭曲线,k（z）是在(?)所围成的有界闭区域上连续.在其内部解析的函数时.借助于奇异积分算子的广义逆.讨论了具一阶奇性核的正则型奇异积分方程:　在H类中的求解问题.作为应用,作者给出了当k（z）是一类有理函数时的具体解法,从而统一并推广了 Cauchy核和Hilbert核奇异积分方程的经典结果.     

奇异积分方程解的一种稳定性

本文讨论了区间[-1,1]上带Cauchy核的奇异积分方程解的稳定性,给出了这类方程的一种稳定性条件,获得了扰动方程解的估计,证明了方程解对于已知函数的连续依赖性。     

具有超解析Cauchy核的奇异积分方程

We investigate the solvability and the solving methods of singular integral equation with hyperanalytic Cauchy kernel(?) where α,k are hypercomplex functions in the sense of A. Douglis, φ is the unknown function. We prove that the equation Kφ=f , under certain conditions, is Noetherian. And a direct method to solve Kφ = f whenα and k are the boun dary values of hyperanalytic functions is given.     

带Hilbert核的奇异积分方程的数值解法

作者在[1—4]中巳经系统讨论了带Cauchy核的奇异积分方程的数值解法.本文考虑带Hilbert核的奇异积分方程     

封闭曲线上的奇异积分方程的样条间接逼近解法

利用复插值样条函数，给出了定义于光滑封闭曲线上一般的正则型奇异积分方程的样条间接逼近解法，证明了一致收敛性．对于其中的一类奇异积分方程，还给出了近似解和误差估计．     

双周期核奇异积分方程数值解法注记

本文提出了在现代工程，如岩石力学、混凝土力学及固体力学中需要解决但未解决的问题，即如下的双周期核及双准周期核奇异积分方程：(?)的数值解法。希望看到许多好的结果。     

Singular Integral Operators with a Generalized Cauchy Kernel

Doklady Mathematics - Singular integral operators with piecewise continuous matrix coefficients are considered on a piecewise smooth curve in weighted Lebesgue spaces. In contrast to the classical...     

Singular Integral Operators with Cauchy Kernel in Fractional Spaces

We single out the Besov spaces that embed into the class of continuous functions and enjoy the Fredholm theory of linear singular integral equations with Cauchy kernel. We give basic results of this theory in the class of continuous (rather than Holder continuous) functions in terms of Besov spaces. Alongside elliptic operators we consider violations of ellipticity: the degeneration of the symbol of an operator at finitely many points.     

Normal Singular Integral Operators with Cauchy Kernel on L 2

Let α and β be functions in ${L^\infty(\mathbb{T})}$ , where ${\mathbb{T}}$ is the unit circle. Let P denote the orthogonal projection from ${L^2(\mathbb{T})}$ onto the Hardy space ${H^2(\mathbb{T})}$ , and Q = I ? P, where I is the identity operator on ${L^2(\mathbb{T})}$ . This paper is concerned with the singular integral operators S _α,β on ${L^2(\mathbb{T})}$ of the form S _α,β f = αPf + βQf, for ${f \in L^2(\mathbb{T})}$ . In this paper, we study the normality of S _α,β which is related to the Brown–Halmos theorem for the normal Toeplitz operator on ${H^2(\mathbb{T})}$ .     

Hermite-Type Method for Volterra Integral Equation with Certain Weakly Singular Kernel

1.IntroductionThispaPerconsidersthenumericalsolutionofthesecondkindVolterraintegralequationy(t)+(Ky)(t)=g(t),(1.1)wherey(t)istheunknownsolution,g(t)isagivenfUnctionandKistheintegraJoperatorforsomegivenkernelfunctionK,(Ky)(t)=l'K(f)y(8)ids.(1.2)Suchequationsarisefromcertaindiffusionproblems.BecauseKisnotcompact,sothestandaxdstabilityproofSfornumericaJmethodsdonotfit.ManypeoplehaveworkedonHermite-typecollocationmethodsforsecond-kindVolterraintegralequationswithsmoothkernels[3,4,5'6],butver…     

On Singular Integral Operators with Rough Kernel Along Surface

In this note we give a simple method to transfer the effect of the surface to the radial function in the kernel of singular integral along surface. Using this idea, we give some continuity of the singular integrals along surface with Hardy space function kernels on some function spaces, such as L^p(\mathbb Rⁿ),L^p(\mathbb Rⁿ,w){L^p({\mathbb R}^n),L^p({\mathbb R}^n,\omega)}, Triebel–Lizorkin spaces [(F)\dot]_p^s,q(\mathbb Rⁿ){{\dot F}_{p}^{s,q}({\mathbb R}^n)}, Besov spaces [(B)\dot]_p^s,q(\mathbb Rⁿ){{\dot B}_{p}^{s,q}({\mathbb R}^n)}, generalized Morrey spaces L^p,f(\mathbb Rⁿ){L^{p,\phi}({\mathbb R}^n)} and Herz spaces [(K)\dot]_p^{a, q}(\mathbb Rⁿ){\dot K_p^{\alpha, q}({\mathbb R}^n)}. Our results improve and extend substantially some known results on the singular integral operators along surface.     

Norms and Essential Norms of the Singular Integral Operator with Cauchy Kernel on Weighted Lebesgue Spaces

Let ?? and ?? be bounded measurable functions on the unit circle ${\mathbb{T}}$ , and let L ²(W) be a weighted L ² space on ${\mathbb{T}}$ . The singular integral operator S _??,?? is defined by ${S_{\alpha, \beta}f = \alpha Pf + \beta Qf~ (f \in L^2(W))}$ where P is an analytic projection and Q = I ? P is a co-analytic projection. In the previous paper, the essential norm of S _??,?? are calculated in the case when W is a constant function. In this paper, the essential norm of S _??,?? are estimated in the case when W is an A ₂-weight.