The Pólya–Chebotarev problem and inverse polynomial images
Copyright policy )The Pólya–Chebotarev problem and inverse polynomial images
Consider the problem, usually called the P��lya-Chebotarev problem, of finding a continuum in the complex plane including some given points such that the logarithmic capacity of this continuum is minimal. We prove that each connected inverse image $\T_n^{-1}([-1,1])$ of a polynomial $\T_n$ is always the solution of a certain P��lya-Chebotarev problem. By solving a nonlinear system of equations for the zeros of $\T_n^2-1$, we are able to construct polynomials $\T_n$ with a connected inverse image.
analytic Jordan arc, inverse polynomial image, Mathematics - Complex Variables, Polynomials and rational functions of one complex variable, the Green's function, FOS: Mathematics, Pólya-Chebotarev problem, Complex Variables (math.CV), Padé approximation, logarithmic capacity
analytic Jordan arc, inverse polynomial image, Mathematics - Complex Variables, Polynomials and rational functions of one complex variable, the Green's function, FOS: Mathematics, Pólya-Chebotarev problem, Complex Variables (math.CV), Padé approximation, logarithmic capacity
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