<div dir="ltr"><br><div class="gmail_quote">Prezados colegas,
<div dir="ltr"><div class="gmail_quote"><div dir="ltr"><p class="MsoNormal" style="margin:0cm 0cm 10pt;line-height:115%;font-size:11pt;font-family:"Calibri","sans-serif"">O COLMEA, Colóquio Interinstitucional Modelos Estocásticos e
Aplicações, terá mais um encontro no próximo dia 11 de julho (uma quinta-feira).
Será no Instituto de Matemática da UFRJ. Na ocasião teremos palestras de Celina
M. H. de Figueiredo (COPPE/UFRJ) e Leonardo T. Rolla (U. Buenos Aires e NYU
Shanghai). </p>
<p class="MsoNormal" style="margin:0cm 0cm 10pt;line-height:115%;font-size:11pt;font-family:"Calibri","sans-serif""><b>Programa: <span></span></b></p>
<p class="MsoNormal" style="margin:0cm 0cm 10pt;line-height:115%;font-size:11pt;font-family:"Calibri","sans-serif"">14:00h - 15:20h:<span style="font-size:13.5pt;line-height:115%;font-family:"Arial","sans-serif";color:black"> </span><b>Celina M. H. de Figueiredo (COPPE/UFRJ)<span></span></b></p>
<p class="MsoNormal" style="margin:0cm 0cm 10pt;line-height:115%;font-size:11pt;font-family:"Calibri","sans-serif"">"Resolver ou verificar?"</p>
<p class="MsoNormal" style="margin:0cm 0cm 10pt;line-height:115%;font-size:11pt;font-family:"Calibri","sans-serif"">15:40h - 17:00h: <b>Leonardo
T. Rolla (University of Buenos Aires and NYU Shanghai)<span></span></b></p>
<p class="MsoNormal" style="margin:0cm 0cm 10pt;line-height:115%;font-size:11pt;font-family:"Calibri","sans-serif""><span lang="EN-US">"</span><span style="font-size:12pt;line-height:115%;color:black" lang="EN-US">Local and global behavior of the subcritical
contact process"</span><i><span lang="EN-US"><span></span></span></i></p>
<p class="MsoNormal" style="margin:0cm 0cm 10pt;line-height:115%;font-size:11pt;font-family:"Calibri","sans-serif"">17:00h: Discussão e lanche </p>
<p class="MsoNormal" style="margin:0cm 0cm 10pt;line-height:115%;font-size:11pt;font-family:"Calibri","sans-serif"">Local: <span> </span>Instituto de Matemática
-UFRJ </p>
<p class="MsoNormal" style="margin:0cm 0cm 10pt;line-height:115%;font-size:11pt;font-family:"Calibri","sans-serif"">Sala C-116 - Bloco C</p>
<p class="MsoNormal" style="margin:0cm 0cm 10pt;line-height:115%;font-size:11pt;font-family:"Calibri","sans-serif"">Ilha do Fundão</p>
<p class="MsoNormal" style="margin:0cm 0cm 10pt;line-height:115%;font-size:11pt;font-family:"Calibri","sans-serif""><span>Um cartaz para
divulgação encontra-se aqui: <br>
<a href="http://www.im.ufrj.br/~coloquiomea/cartaz/2019_07.pdf" target="_blank">http://www.im.ufrj.br/~coloquiomea/cartaz/2019_07.pdf</a><br>
<br>
Informações mais completas sobre o COLMEA podem ser encontradas aqui: <br>
</span><a href="http://www.im.ufrj.br/~coloquiomea/" style="color:blue;text-decoration:underline" target="_blank"><span>http://www.im.ufrj.br/~coloquiomea/</span></a><span> <br>
<br>
Todos são muito bem vindos. Agradecemos também pela divulgação em suas <br>
instituições. <br>
<br>
Atenciosamente, <br>
o comitê organizador: <span> </span>Americo Cunha
(UERJ), Augusto Q. Teixeira (IMPA), Evaldo M.F. Curado (CBPF), Leandro P.
R. Pimentel (UFRJ), Maria Eulalia Vares (UFRJ), Nuno Crokidakis (UFF), Simon
Griffiths (PUC-Rio)<br>
<br>
</span></p>
<p class="MsoNormal" style="margin:0cm 0cm 10pt;line-height:115%;font-size:11pt;font-family:"Calibri","sans-serif"">==========</p>
<p class="MsoNormal" style="margin:0cm 0cm 10pt;line-height:115%;font-size:11pt;font-family:"Calibri","sans-serif""><b><span style="font-size:12pt;line-height:115%">Resumos das palestras:<span></span></span></b></p>
<p class="MsoNormal" style="margin:0cm 0cm 10pt;line-height:115%;font-size:11pt;font-family:"Calibri","sans-serif""><b><span style="font-size:12pt;line-height:115%;color:black">Resolver ou verificar? </span></b><span style="font-size:12pt;line-height:115%;color:black"></span><br style="font-variant-ligatures:normal;font-variant-caps:normal;text-align:start;text-decoration-style:initial;text-decoration-color:initial;word-spacing:0px">
<span style="font-variant-ligatures:normal;font-variant-caps:normal;text-align:start;text-decoration-style:initial;text-decoration-color:initial;float:none;word-spacing:0px"><span style="font-variant-ligatures:normal;font-variant-caps:normal;text-align:start;text-decoration-style:initial;text-decoration-color:initial;float:none;word-spacing:0px">Celina M. H. de Figueiredo (COPPE/UFRJ) </span><br style="font-variant-ligatures:normal;font-variant-caps:normal;text-align:start;text-decoration-style:initial;text-decoration-color:initial;word-spacing:0px">
<br style="font-variant-ligatures:normal;font-variant-caps:normal;text-align:start;text-decoration-style:initial;text-decoration-color:initial;word-spacing:0px">
<span style="font-variant-ligatures:normal;font-variant-caps:normal;text-align:start;text-decoration-style:initial;text-decoration-color:initial;float:none;word-spacing:0px">Resolver ou verificar? é uma pergunta que vale um milhão de
dólares. No ano 2000, o Instituto Clay para Matemática distinguiu sete
problemas considerados centrais para o progresso da matemática, chamando-os de
Os Problemas do Milênio. A solução de cada problema corresponde a um prêmio de
um milhão de dólares. Um dos sete problemas selecionados é um problema de
teoria da computação: existe pergunta cuja resposta pode ser verificada rapidamente
mas cuja resposta requer muito tempo para ser encontrada? Esse problema do
milênio, conhecido como P versus NP, é o problema central na área de
complexidade computacional, onde tentamos classificar a dificuldade dos
problemas de acordo com a eficiência das possíveis soluções através de
algoritmos computacionais. </span><span></span></span></p>
<p class="MsoNormal" style="margin:0cm 0cm 10pt;line-height:115%;font-size:11pt;font-family:"Calibri","sans-serif""><span style="font-size:12pt;line-height:115%;color:black"><span> </span></span></p>
<p class="MsoNormal" style="margin:0cm 0cm 10pt;line-height:115%;font-size:11pt;font-family:"Calibri","sans-serif""><b><span style="font-size:12pt;line-height:115%;color:black" lang="EN-US">Local and global behavior of the
subcritical contact process </span></b><span style="font-size:12pt;line-height:115%;color:black" lang="EN-US"></span><br style="font-variant-ligatures:normal;font-variant-caps:normal;text-align:start;text-decoration-style:initial;text-decoration-color:initial;word-spacing:0px">
<span style="font-variant-ligatures:normal;font-variant-caps:normal;text-align:start;text-decoration-style:initial;text-decoration-color:initial;float:none;word-spacing:0px"><span style="font-variant-ligatures:normal;font-variant-caps:normal;text-align:start;text-decoration-style:initial;text-decoration-color:initial;float:none;word-spacing:0px">Leonardo T. Rolla (University of Buenos Aires and
NYU-Shanghai) </span><br style="font-variant-ligatures:normal;font-variant-caps:normal;text-align:start;text-decoration-style:initial;text-decoration-color:initial;word-spacing:0px">
<br style="font-variant-ligatures:normal;font-variant-caps:normal;text-align:start;text-decoration-style:initial;text-decoration-color:initial;word-spacing:0px">
<span style="font-variant-ligatures:normal;font-variant-caps:normal;text-align:start;text-decoration-style:initial;text-decoration-color:initial;float:none;word-spacing:0px">In this talk we will describe three fundamental objects assuming
only elementary mathematical knowledge: 1) Contact process - a stochastic
process that serves as a generic model for the propagation of a certain
infection or rumor among a certain population (one of the simplest systems that
exhibit a phase transition); 2) Marked Poisson point process - a random process
consisting of a set of points on the space where each point carries extra
information, for instance a color or perhaps something richer such as another
random process; and 3) Quasi-stationary distribution - for a stochastic
evolution that is doomed to become extinct, a QSD is a probability distribution
which, although does not give a steady state for the process, is a steady state
when conditioning on non-extinction. We will then describe the scaling limit of
the subcritical contact process in terms of a marked Poisson point process and
a quasi-stationary distribution, and discuss the question of uniqueness of the
QSD in this and other contexts. Based on joint works with E. Andjel, F. Ezanno
and P. Groisman, with Aurelia Deshayes, and with F. Arrejoría and P. Groisman. </span></span><span style="font-size:12pt;line-height:115%" lang="EN-US"><span></span></span></p>
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