On real and complex-valued bivariate Chebyshev polynomials

In this paper, we are concerned with bivariate di erentiable models for joint extremes for dependent data sets. This question is often raised in hydrology and economics when the risk driven by two (or more) factors has to be quantiÿed. Here we give a full characterization of polynomial models by mea

In contrast to the complex case, the best Chebyshev approximation with respect to a finite-dimensional Haar subspace \(V \subset C(Q)\) ( \(Q\) compact) is always strongly unique if all functions are real valued. However, strong uniqueness still holds for complex valued functions \(f\) with a so-cal

We consider complex Zolotarev polynomials of degree \(n\) on \([-1,1]\), i.e., monic polynomials of degree \(n\) with the second coefficient assigned to a given complex number \(\rho\), that have minimum Chebyshev norm on \([-1,1]\). They can be characterized either by \(n\) or by \(n+1\) extremal p