Errata for ``Dynamics in One Complex Variable'', first edition. (Corrected in the second edition.) Most of the following are very minor typos. HOWEVER THE STARRED CORRECTIONS MAY CAUSE CONFUSION. The notations \C , \D stand for the `blackboard bold' font. I am indebted to Theodor Broeker in Regensburg for most of the following corrections. ---------------------- Page, Line (+ from above, - from below) vi, +9, Change `survey' to: surveys. 7, -1, Change `then' to: that. * 34, -16, Change `of maps' to: of holomorphic maps. 34, -19, delete the last bracket in the line (over the \square). * 66, Problem 6-c, insert `non-linear' before `holomorphic'. * 97, +19, Change `for $c$' to: for $g$. 99, -4, Change `vector' to: vectors. 105, +8, Change `If $v$ be' to: If $v$ is. 113, -4, Change `Compare 4.12' to: 4.13. 119, -17, Place absolute value signs around: \sin(\pi(q\xi-p)) 137, +10, Change `simply fixed' to: simple fixed. 140, Theorem 13.1. Change \C to \hat\C twice. 141, -10, Change `alomg' to: along. 144, +3, Change `a attractive' to: an attractive. * 152, -8, Change `$t_n\in I_n$' to: $t_n\in I_{b_n}$. 167, -15, Change ` D ' to: \D 168, +5, Change `by a fundamental' to: by fundamental 168, -4,5, add `to study' after `important'. 169, +8, Change `consisting' to: consists. * 173, +11, Replace `... all simply connected. The ...' by `... all simply connected (compare Problem 15-a or the proof of 9.4), and the ...' 182, +15, Change `bijectively onto' to `injectively into'. +19, Change `$x\not\equiv x_0(\mod\Z)$' to: $x\not\equiv t_0 (\mod\Z). ** 183, -2 through 184, 5: Add period after `... z_k = 0' , and replace what follows by: To describe a basic neighborhood of such a point $\bf z$ we choose a neighborhood $U_i$ of each $z_i$ so that, for $i$ sufficiently large, $U_i$ is a neighborhood of zero and is independent of $i$, and let $N(U_0\,,\,U_1\,,\,\ldots)$ be the set of all $(z'_0\,,\,z'_1\,,\,\ldots)$ in $E$ with $z'_i\in U_i$ for all $i$. Evidently the projection $ \pi_k(z_0\,,\,z_1\,,\,z_2\,,\,\ldots)~=~z_k$ from $E$ to $\C\ssm\{0\}$ is continuous. In fact, since $f$ has no critical points near $0$, each connected component of $E$ can be given the structure of a Riemann surface, so that each $\pi_k$ will be a local conformal isomorphism near $\bf z$ for $k$ sufficiently large. 192, +11, Delete: ``nested''. [They are not nested in the usual sense of sets.] 244, -11, Change `$D$' to: $\D$. 253, -10, Should be: \"Uber die Randwerte einer analytischen Funktion.