English

Degenerating behavior of Green's function

Complex Variables 2010-01-05 v1

Abstract

Let the unions of real intervals I=j=1l[a2j1,a2j],I = \cup_{j = 1}^l [a_{2 j -1},a_{2j}], a1<...<a2l,a_1 < ... < a_{2 l}, and In=k=1m[Bk,n,Ck,n]I_n = \cup_{k = 1}^m [B_{k,n}, C_{k,n}] be such that k=1[Bk,n,Ck,n]={ck}\cap_{k = 1}^{\infty} [B_{k,n},C_{k,n}] = \{c_k \} for k=1,...,mk = 1,...,m and dist(E,In)const>0.{\rm dist}(E,I_n) \geq const > 0. We show how to express asymptotically the Green's function ϕ(z,,EIn)\phi(z,\infty,E \cup I_n) of EInE \cup I_n at z=z = \infty in terms of the Green's function ϕ(z,,E)\phi(z,\infty,E) and ϕ(z,ck,E).\phi(z,c_k,E). The formula yields immediately asymptotics for ϕn(z,,EIn)\phi^n(z,\infty,E \cup I_n) with respect to nn which are important in many problems of approximation theory. Another consequence is an asymptotic representation of cap(EIn)cap(E \cup I_n) in terms of cap(E)cap(E) and ϕ(z,ck,E)\phi(z,c_k,E) and of the harmonic measure ω(,Ej,EIn).\omega(\infty, E_j,E \cup I_n).

Cite

@article{arxiv.1001.0485,
  title  = {Degenerating behavior of Green's function},
  author = {Franz Peherstorfer},
  journal= {arXiv preprint arXiv:1001.0485},
  year   = {2010}
}

Comments

The manuscript was prepared by the author in the two months preceding his passing away in November 2009. The manuscript remained unsubmitted and is not published elsewhere

R2 v1 2026-06-21T14:30:36.869Z