Löwner expansions

A fundamental problem is to estimate the logarithmic coefficients of a power series with constant coefficient zero which represents a function which has distinct values at distinct points of the unit disk. A source of estimates is an expansion theorem for the Löwner equations which is obtained from a study of contractive substitutions in Hilbert spaces of analytic functions. The methods are an outgrowth of the theory of square summable power series [1]. Assume that σ_n is a given function of nonnegative integers n, with nonnegative values, such that σ₀ = 0 and such that σ_{n ? 1} ? σ_n when n is positive. Infinite values are allowed. The underlying Hilbert space is the set $\text{G}$_σ(0) of equivalence classes of power series f(z) = ∑ a_nzⁿ with constant coefficient zero such that f(z)²_{$\text{G}$σ⁽⁰⁾} = ∑(n/σ_n)|a_n|² is finite. Equivalence of power series f(z) and g(z) means that the coefficient of zⁿ in f(z) is equal to the coefficient of zⁿ in g(z) when σ_n is finite.