Polynomials Least Deviating from Zero on a Square of the Complex Plane

The Chebyshev problem on the square Π = {z = x + iy ∈ ℂ: max{∣x∣, ∣y∣} ≤ 1} of the complex plane ℂ is studied. Let \(p_{n} \in \mathfrak{P}_{n}\) be the set of algebraic polynomials of a given degree n with the unit leading coefficient. The problem is to find the smallest value τ_n(Π) of the uniform norm ∥p_n∥_C(π) of polynomials \(\mathfrak{P}_{n}\) on the square Π and a polynomial with the smallest norm, which is called a Chebyshev polynomial (for the square). The Chebyshev constant \(\tau \left( Q \right) = {\lim _{n \to \infty }}\root n \of {{\tau _n}\left( Q \right)} \) for the square is found. Thus, the logarithmic asymptotics of the least deviation τ_n(Π) with respect to the degree of a polynomial is found. The problem is solved exactly for polynomials of degrees from 1 to 7. The class of polynomials in the problem is restricted; more exactly, it is proved that, for n = 4m + s, 0 ≤ s ≤ 3, it is sufficient to solve the problem on the set of polynomials z^sq_m(z), \(q_{n} \in \mathfrak{P}_{m}\). Effective two-sided estimates for the value of the least deviation τ_n (Π) with respect to n are obtained.