A function f, analytic in the unit disc Δ, is said to be a Bloch function if supz∈Δ(1 − [mid ]z[mid ]2)[mid ]f′(z)[mid ] < ∞. In this paper we study the zero sequences of non-trivial Bloch functions. Among other results we prove that if f is a Bloch function with f(0) ≠ 0 and {zk} is the sequence of ordered zeros of f. then

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and

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We will also prove that (ii) is best possible even for the little Bloch space [Bscr ]0. To this end we construct a function f ∈ [Bscr ]0 whose zero sequence {zk} satisfies

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We also consider analogous problems for some other related spaces of analytic functions.