Approximating the Conformal Maps of Elongated Quadrilaterals by Domain Decomposition

Let Q:={ Ω;z ₁ ,z ₂ ,z ₃ ,z ₄ } be a quadrilateral consisting of a Jordan domain Ω and four points z ₁ , z ₂ , z ₃ , z ₄ , in counterclockwise order on \partial Ω and let m(Q) be the conformal module of Q . Then Q is conformally equivalent to the rectangular quadrilateral {R _m(Q) ;0,1,1+\mathop \it im (Q),\mathop \it im (Q)}, where R _m(Q) := {(ξ,η): 0<ξ<1, 0 <η<m(Q)}, in the sense that there exists a unique conformal map f: Ω \rightarrow R _m(Q) that takes the four points z ₁ , z ₂ , z ₃ , z ₄ , respectively, onto the four vertices 0 , 1 , 1+\mathop \it im (Q) , \mathop \it im (Q) of R _m(Q) . In this paper we consider the use of a domain decomposition method (DDM) for computing approximations to the conformal map f , in cases where the quadrilateral Q is ``long.' The method has been studied already but, mainly, in connection with the computation of m(Q) . Here we consider certain recent results of Laugesen \cite{La}, for the DDM approximation of the conformal map f: Ω \rightarrow R _m(Q) associated with a special class of quadrilaterals (viz., quadrilaterals whose two opposite boundary segments (z ₂ , z ₃ ) and (z ₄ , z ₁ ) are parallel straight lines), and seek to extend these results to more general quadrilaterals. By making use of the available DDM theory for conformal modules, we show that the corresponding theory for f can, indeed, be extended to a much wider class of quadrilaterals than those considered by Laugesen. June 1, 2000. Date accepted: September 6, 2000.     

A Class of Operators Similar to the Shift on H 2(G)

For a compact subset K in the complex plane, let A(K) denote the algebra of all functions continuous on K and analytic on K° and let R(K) denote the uniform closure of the rational functions with poles off K. Let G is a bounded open subset whose complement in the plane has a finite number of components. Suppose that and every function in H^∞(G) is the pointwise limit of a bounded sequence of functions in . The purpose of this paper is to characterize all subnormal operators similar to M_z, the operator of multiplication by the independent variable z on the Hardy space H²(G). We also characterize all bounded linear operators that are unitarily equivalent to M_z in the case when each of the components of G is simply connected. In particular, our similarity result extends a well-known result of W. Clary on the unit disk to multiply connected domains.     

Uniform estimates for polynomial approximation in domains with corners

Let be a domain with a Jordan boundary ∂G, consisting of l smooth curves Γ_j, such that {z_j}Γ_j-1∩Γ_j≠, j=1,…,l, where Γ₀Γ_l. Denote by α_jπ, 0<α_j2, the angles at z_j's between the curves Γ_j-1 and Γ_j, exterior with respect to G. Let Φ be a conformal mapping of the exterior of onto the exterior of the unit disk, normed by Φ^′(∞)>0. We assume that there is a neighborhood U of , such that , where

z≠z_j if α_j1. Set g_Gsup{|g(z)|:zG}. Then we prove Theorem. Let and 0βr. If a function f is analytic in G and f^(r)β_G<+∞, then for each nlr there is an algebraic polynomial P_n of degree <n, such that

     

On the continuation of solutions for elliptic equations in two variables

We consider nonlinear elliptic differential equations of second order in two variables

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. Supposing analyticity of F, we prove analyticity of the real solution z=z(x,y) in the open set Ω. Furthermore, we show that z may be continued as a real analytic solution for F=0 across the real analytic boundary arc Γ∂Ω, if z satisfies one of the boundary conditions z= or z_n=ψ(x,y,z,z_t) on Γ with real analytic functions and ψ, respectively (z_n denotes the derivative of z w.r.t. the outer normal n on Γ and z_t its derivative w.r.t. the tangent). The proof is based on ideas of H. Lewy combined with a uniformization method. Studying quasilinear equations, we get somewhat better results concerning the initial regularity of the given solution and a little more insight.     

Asymptotic cone of semisimple orbits for symmetric pairs

Let G be a reductive algebraic group over C and denote its Lie algebra by g. Let Oh be a closed G-orbit through a semisimple element h∈g. By a result of Borho and Kraft (1979) [4], it is known that the asymptotic cone of the orbit Oh is the closure of a Richardson nilpotent orbit corresponding to a parabolic subgroup whose Levi component is the centralizer ZG(h) in G. In this paper, we prove an analogue on a semisimple orbit for a symmetric pair.More precisely, let θ be an involution of G, and K=Gθ a fixed point subgroup of θ. Then we have a Cartan decomposition g=k+s of the Lie algebra g=Lie(G) which is the eigenspace decomposition of θ on g. Let {x,h,y} be a normal sl₂ triple, where x,y∈s are nilpotent, and h∈k semisimple. In addition, we assume , where denotes the complex conjugation which commutes with θ. Then is a semisimple element in s, and we can consider a semisimple orbit Ad(K)a in s, which is closed. Our main result asserts that the asymptotic cone of Ad(K)a in s coincides with , if x is even nilpotent.     

On the Comparison of Two Numerical Methods for Conformal Mapping

Let G be a simply connected domain in the t plane (t = x + iy),bounded by the three straight lines x = 0, y = 0, x = 1 anda Jordan arc with cartesian equation y = (x). Also, let g bethe function which maps conformally a rectangle R onto G, sothat the four corners of R are mapped onto those of G. In thispaper we show that the method considered in 1982 by Challis& Burley for determining approximations to g is equivalentto a special case of the well-known method of Garrick for themapping of doubly connected domains. Hence, by using resultsalready available in the literature, we provide some theoreticaljustification for the method of Challis & Burley.     

A domain decomposition method for approximating the conformal modules of long quadrilaterals

Summary This paper is concerned with the study of a domain decomposition method for approximating the conformal modules of long quadrilaterals. The method has been studied already by us and also by D. Gaier and W.K. Hayman, but only in connection with a special class of quadrilaterals, viz. quadrilaterals where: (a) the defining domain is bounded by two parallel straight lines and two Jordan arcs, and (b) the four specified boundary points are the four corners where the arcs meet the straight lines.Our main purpose here is to explain how the method may be extended to a wider class of quadrilaterals than that indicated above.     

Sur l'équivalence de certaines mesures produit

Sommaire SoitG={g _k ,kN} une suite de variables aléatoires gaussiennes centrées réduites et indépendantes; soit de plusY={y _k ,kN} une suite indépendante deG de variables aléatoires indépendantes. On étudie à quelles conditions la loi deG+Y est équivalente à celle deG. On utilise pour cela les lois zéro-un vérifiées parG en analysant leurs effets, maximaux sur la loi deY.

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Summary LetG={g _k ,kN} be a sequence of independent Gaussian centred reduced random variables; let moreoverY={y _k ,kN} be a sequence independent ofG of independent random variables: For obtaining conditions characterizing the equivalence of the distributions ofG andG+Y, we use the zero-one laws verified byG, first for the convergence of the series _k g _k or _k (g _k ² –a _k ), secundly for the asymptotic behavior of the sequence {g _k ,kN} and we analyze their maximal effects on the distribution ofY.

     

Radical Classes of Lattice-Ordered Groups vs. Classes of Compact Spaces

For a given class T of compact Hausdorff spaces, let Y(T) denote the class of -groups G such that for each gG, the Yosida space Y(g) of g belongs to T. Conversely, if R is a class of ;-groups, then T(R) stands for the class of all spaces which are homeomorphic to a Y(g) for some gGR. The correspondences TY(T) and RT(R) are examined with regard to several closure properties of classes. Several sections are devoted to radical classes of -groups whose Yosida spaces are zero-dimensional. There is a thorough discussion of hyper-projectable -groups, followed by presentations on Y(e.d.), where e.d. denotes the class of compact extremally disconnected spaces, and, for each regular uncountable cardinal , the class Y(disc), where disc stands for the class of all compact -disconnected spaces. Sample results follow. Every strongly projectable -group lies in Y(e.d.). The -group G lies in Y(e.d.) if and only if for each gG Y(g) is zero-dimensional and the Boolean algebra of components of g, comp(g), is complete. Corresponding results hold for Y(disc). Finally, there is a discussion of Y(F), with F standing for the class of compact F-spaces. It is shown that an Archimedean -group G is in Y(F) if and only if, for each pair of disjoint countably generated polars P and Q, G=P +Q .     

A normal criterion about two families of meromorphic functions concerning shared values

In this paper, we mainly discuss the normality of two families of functions concerning shared values and proved: Let F and G be two families of functions meromorphic on a domain D■C,a1, a2, a3, a4 be four distinct finite complex numbers. If G is normal, and for every f ∈ F , there exists g ∈ G such that f(z) and g(z) share the values a1, a2, a3, a4, then F is normal on D.     

Punishing Factors for Finitely Connected Domains

Let Ω and Π be two finitely connected hyperbolic domains in the complex plane and let R(z, Ω) denote the hyperbolic radius of Ω at z and R(w, Π) the hyperbolic radius of Π at w. We consider functions f that are analytic in Ω and such that all values f(z) lie in the domain Π. This set of analytic functions is denoted by A(Ω, Π). We prove among other things that the quantities are finite for all if and only if ∂Ω and ∂Π do not contain isolated points. This work was supported by a grant of the Deutsche Forschungsgemeinschaft for F. G. Avkhadiev.     

A generalization of Brauer''s map of decomposition

We first reformulate Quillen's localization theorem forG-theory in complicial bi-Waldhausen category setting. Secondly, because of this reformulation, we are able to generalize Brauer's decomposition mapd ₀:G ₀(KG)G ₀(kG) to higherG-theory leveld _n :G _n (KG)G _n (kG),n=0, 1 ..., whereG is a finite group,R a Dedekind domain,m a maximal ideal ofR,K=quotient field ofR andk=R/m.     

A Generalization of Orthogonal Factorizations in Graphs

Let G be a graph with vertex set V(G) and edge set E(G) and let g and f be two integer-valuated functions defined on V(G) such that g(x) ≤f(x) for all x∈V(G). Then a (g, f)-factor of G is a spanning subgraph H of G such that g(x) ≤d _H (x) ≤f(x) for all x∈V(G). A (g, f)-factorization of G is a partition of E(G) into edge-disjoint (g, f)-factors. Let = {F ₁, F ₂, ..., F _m } be a factorization of G and H be a subgraph of G with mr edges. If F _i , 1 ≤i≤m, has exactly r edges in common with H, then is said to be r-orthogonal to H. In this paper it is proved that every (mg + kr, mf−kr)-graph, where m, k and r are positive integers with k < m and g≥r, contains a subgraph R such that R has a (g, f)-factorization which is r-orthogonal to a given subgraph H with kr edges. This research is supported by the National Natural Science Foundation of China (19831080) and RSDP of China     

A Remark on the Linearized Stability of Positive Solutions for Systems Involving the p-Laplacian

The aim of this paper is to prove some stability result for nonlinear elliptic systems of the form where Δ_p denotes the p-Laplacian operator defined by Δ_pz = div(|∇ z|^p-2∇ z); p > 2, Ω is a bounded domain in R^N (N > 1) with smooth boundary where with h = 1 when α = 1, λ is a positive parameter and f,g are C² functin on [0,∞) × [0,∞). We prove stability and instability results of positive stationary solutions under various choices of f and g.     

Schwarz operators of minimal surfaces spanning polygonal boundary curves

This paper examines the Schwarz operator A and its relatives Ȧ, Ā and Ǡ that are assigned to a minimal surface X which maps consequtive arcs of the boundary of its parameter domain onto the straight lines which are determined by pairs P _j , P _j+1 of two adjacent vertices of some simple closed polygon . In this case X possesses singularities in those boundary points which are mapped onto the vertices of the polygon Γ. Nevertheless it is shown that A and its closure Ā have essentially the same properties as the Schwarz operator assigned to a minimal surface which spans a smooth boundary contour. This result is used by the author to prove in [Jakob, Finiteness of the set of solutions of Plateau’s problem for polygonal boundary curves. I.H.P. Analyse Non-lineaire (in press)] the finiteness of the number of immersed stable minimal surfaces which span an extreme simple closed polygon Γ, and in [Jakob, Local boundedness of the set of solutions of Plateau’s problem for polygonal boundary curves (in press)] even the local boundedness of this number under sufficiently small perturbations of Γ.     

The Action of the Mapping Class Group on Maximal Representations

Let Γ _g be the fundamental group of a closed oriented Riemann surface Σ _g , g ≥ 2, and let G be a simple Lie group of Hermitian type. The Toledo invariant defines the subset of maximal representations Rep_max(Γ _g , G) in the representation variety Rep(Γ _g , G). Rep_max(Γ _g , G) is a union of connected components with similar properties as Teichmüller space . We prove that the mapping class group acts properly on Rep_max(Γ _g , G) when , SU(n,n), SO*(4n), Spin(2,n).     

Algebraic series and valuation rings over nonclosed fields

Suppose that k is an arbitrary field. Let k[[x₁,…,x_n]] be the ring of formal power series in n variables with coefficients in k. Let be the algebraic closure of k and . We give a simple necessary and sufficient condition for σ to be algebraic over the quotient field of k[[x₁,…,x_n]]. We also characterize valuation rings V dominating an excellent Noetherian local domain R of dimension 2, and such that the rank increases after passing to the completion of a birational extension of R. This is a generalization of the characterization given by M. Spivakovsky [Valuations in function fields of surfaces, Amer. J. Math. 112 (1990) 107–156] in the case when the residue field of R is algebraically closed.     

Uniform boundary Harnack principle and generalized triangle property

Let D be a bounded open subset in R^d, d?2, and let G denote the Green function for D with respect to (-Δ)^α/2, 0<α?2, α<d. If α<2, assume that D satisfies the interior corkscrew condition; if α=2, i.e., if G is the classical Green function on D, assume—more restrictively—that D is a uniform domain. Let g=G(·,y₀)∧1 for some y₀∈D. Based on the uniform boundary Harnack principle, it is shown that G has the generalized triangle property which states that when d(z,x)?d(z,y). An intermediate step is the approximation G(x,y)≈|x-y|^α-dg(x)g(y)/g(A)², where A is an arbitrary point in a certain set B(x,y).This is discussed in a general setting where D is a dense open subset of a compact metric space satisfying the interior corkscrew condition and G is a quasi-symmetric positive numerical function on D×D which has locally polynomial decay and satisfies Harnack's inequality. Under these assumptions, the uniform boundary Harnack principle, the approximation for G, and the generalized triangle property turn out to be equivalent.