Title Lyapounov exponents and meromorphic maps (ComplexDynamics and Related Topics)
Author(s) Thelin, Henry de
Citation 数理解析研究所講究録 (2008), 1586: 1-17
Issue Date 2008-04
URL http://hdl.handle.net/2433/81538
Right
Type Departmental Bulletin Paper
Textversion publisher
Kyoto University
Lyapounov exponents and meromorphic maps
Henry de Th\’elinUniversit\’e de Paris-Sud
Complex Dynamics and Related Topics
Research Institute for Mathematical Sciences, Kyoto University
September 3-6, 2007
数理解析研究所講究録1586巻 2008年 1-17
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4
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6
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7
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.
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.
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.
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8
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.
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9
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:
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10
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11
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$A_{t}\approx \mathfrak{t}^{\ell d_{l^{u}}}l\cdot.,$
$4d_{f\triangleleft}\sim$
箇$d_{S}>_{ds*\}}a...\underline{>}d_{b}$
$\alpha uaS.t0(.$$|.\eta_{W’/\infty}-\vdash l\prime s^{04c}$
.
$\alpha i\triangleright h$$fl^{d^{(}\alpha_{\iota}R|}\epsilon\angle^{4}(\mu|$
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$.Ah_{:}-$.
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$0\geq\cross\sigma\sim Iarrow...\wedge\sim\sim*\geq\cdots\vee\sim’\eta$
$b4CwfP$
$p_{3}od_{S\sim 1}\angle A_{r^{1\oint]}}$$<-$
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12
$O||$
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$g_{\}t^{g_{t\iota}}.\sigma.\{$
13
$Ot_{2}$
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.$\overline{\uparrow\alpha,-}$ 4
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$\underline{\backslash }Q^{-l^{\phi_{3^{\cap}}}}a\prime e_{\theta}$
$\epsilon_{0}\alpha_{l}1,\cdot:e$$\xi b_{a}\mathfrak{t}$
$l$
$\Psi$
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撒$\text{為}I.it$
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1
14
$\Re$ $sb_{\ovalbox{\tt\small REJECT}\beta}.f\theta 3^{\alpha n}bk_{\ell\int}.P^{rouSS}$
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$\sigma \text{ト_{}\Phi}6l_{f}$
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$k-\cdot e$$\underline{\backslash }e$ $-zk^{*},$. $\cap$
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$b\triangleright\ell$ aceq $\neg\sim$
$Q$ $ct\S]$
15
$*l$ $u\#$
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$\mu$
$\mathfrak{g}_{v\approx t\iota}.\int\mu oa$ bo.Se
$d_{\cap}\mathfrak{c}_{\mathfrak{h}^{i}\downarrow}9_{l}^{-1}\geq s_{1z}$
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$..:\cdot.’.M$ $\ ^{:}\mathfrak{g}_{t_{1}}x_{J:}fr\mathfrak{H}$$.f3e\epsilon\epsilon\iota a_{k}n$
.$\triangleleft\ovalbox{\tt\small REJECT}$
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.$\cdot’.\cdot$
16
$015$
$A^{\prime ad*}$
$\oint^{\ell}(02^{5}\iota\alpha_{1}\downarrow[6$ $\xi^{f}[\text{果}$
$\sim\vee$ A $(q^{\ell} \iota_{y’\backslash }\int\ell^{p}\{b_{J}$
.$)| \geq^{S}\int z$ .
$ffi_{!}$,,$f^{\kappa\varphi V\prime d}$
$g^{b\beta S^{1\{\hslash}}.’‘.rightarrow$
$\sim$冫箇$\underline{l}$ $\bigcap_{O}a.\prime f^{*f_{d}}\prime n\bullet 1C^{ar}al^{\rho}\cdot s|.gpf^{ra}ln_{\delta}|,\sim\vdash$
$\sigma_{t}\vdash$
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$\vdash k_{\delta\cap}\int or$
$h_{b\ell’}fffi^{s!^{\tau}:}...i_{t_{S}}.\mathfrak{R}_{l}^{r_{q*}}$
.
$(b/\cdot\wedge^{k_{\sim}}J_{t}^{\cdot}b_{0^{\hslash}}\mathfrak{y})$
禾 $L$
17