CHEBYSHEV POLYNOMIALS, ZOLOTAREV POLYNOMIALS, AND PLANE TREES

摘要

A polynomial with exactly two critical values is called a generalized Chebyshev polynomial (or Shabat polynomial). A polynomial with exactly three critical values is called a Zolotarev polynomial. Two Chebyshev polynomials f and g are called Z-homotopic if there exists a family p_α, α ∈ [0,1], where p_0 = f, p_1 = g, and p_α is a Zolotarev polynomial if α ∈ (0,1). As each Chebyshev polynomial defines a plane tree (and vice versa), Z-homotopy can be denned for plane trees. In this work, we prove some necessary geometric conditions for the existence of Z-homotopy of plane trees, describe Z-homotopy for trees with five and six edges, and study one interesting example in the class of trees with seven edges.