moddifica cartel de registro cerrado, se quita la noticia de inscripciones abiertas, cambios en sesion 24 cambia de dia Gardella por Ara
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Germán Correa
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- titulo: Inscripciones:
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- titulo: 'Inscripciones:'
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descripcion: Ya están abiertas. Evento de participación gratuita y con inscripción obligatoria.
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descripcion: Ya están abiertas. Evento de participación gratuita y con inscripción obligatoria.
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imagen: img/register-icon.jpg
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imagen: img/register-icon.jpg
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activa: true
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activa: false
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link: '#aviso'
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link: '#aviso'
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- titulo: Apoyo Económico para participar en el CLAM2020
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- titulo: Apoyo Económico para participar en el CLAM2020
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descripcion: Llamado extraoridinario del Programa de Ayuda Económica orientado específicamente a apoyar a los participantes del CLAM2020
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descripcion: Llamado extraoridinario del Programa de Ayuda Económica orientado específicamente a apoyar a los participantes del CLAM2020
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end: 2021-09-15T17:30
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end: 2021-09-15T17:30
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speaker: Santiago Simanca (the results of this talk were obtained during his stay at Courant Institute of Mathematical Sciences until 2020)
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speaker: Santiago Simanca (the results of this talk were obtained during his stay at Courant Institute of Mathematical Sciences until 2020)
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- sesion: Geometría, Mecánica, Control y sus interconexiones
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- sesion: Geometría, Mecánica, Control y sus interconexiones
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zoom:
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zoom: https://us02web.zoom.us/j/83633086019
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organizadores:
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organizadores:
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- nombre: Viviana Alejandra Díaz
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- nombre: Viviana Alejandra Díaz
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mail: viviana.diaz@uns.edu.ar
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mail: viviana.diaz@uns.edu.ar
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end: 2021-09-13T17:30
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end: 2021-09-13T17:30
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speaker: Cintya Wink de Oliveira Benedito (Universidade Estadual Paulista, Brasil)
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speaker: Cintya Wink de Oliveira Benedito (Universidade Estadual Paulista, Brasil)
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- sesion: Análisis no lineal en espacios de Banach
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- sesion: Análisis no lineal en espacios de Banach
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zoom:
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zoom: https://us02web.zoom.us/j/81106679177
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organizadores:
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organizadores:
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- nombre: Gerardo Botelho
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- nombre: Gerardo Botelho
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mail: botelho@ufu.br
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mail: botelho@ufu.br
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- titulo: Leavitt path algebras and graph C*-algebras associated to separated graphs
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- titulo: Leavitt path algebras and graph C*-algebras associated to separated graphs
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abstract: |
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abstract: |
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<p>A separated graph is a pair \((E,C)\), where \(E\) is a directed graph, \(C=\bigsqcup _{v\in E^ 0} C_v\), and \(C_v\) is a partition of \(r^{-1}(v)\) (into pairwise disjoint nonempty subsets) for every vertex \(v\). In recent years, separated graphs have been used to provide combinatorial models of several structures, often related to dynamical systems. This can be understood as a generalization of the common use of usual directed graphs in symbolic dynamics. I will survey some of these developments, including the failure of Tarski's dichotomy in the setting of topological actions, the construction of a family of ample groupoids with prescribed type semigroup, and the modeling of actions on the Cantor set.</p>
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<p>A separated graph is a pair \((E,C)\), where \(E\) is a directed graph, \(C=\bigsqcup _{v\in E^ 0} C_v\), and \(C_v\) is a partition of \(r^{-1}(v)\) (into pairwise disjoint nonempty subsets) for every vertex \(v\). In recent years, separated graphs have been used to provide combinatorial models of several structures, often related to dynamical systems. This can be understood as a generalization of the common use of usual directed graphs in symbolic dynamics. I will survey some of these developments, including the failure of Tarski's dichotomy in the setting of topological actions, the construction of a family of ample groupoids with prescribed type semigroup, and the modeling of actions on the Cantor set.</p>
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start: 2021-09-16T15:00
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start: 2021-09-17T15:00
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end: 2021-09-16T15:45
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end: 2021-09-17T15:45
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speaker: Pere Ara (Universitat Autònoma de Barcelona, España)
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speaker: Pere Ara (Universitat Autònoma de Barcelona, España)
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- titulo: A non-commutative topological dimension
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- titulo: A non-commutative topological dimension
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abstract: |
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abstract: |
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<p>Let \(A\) and \(B\) be \(C^*\)-algebras, \(A\) separable and \(I\) an ideal in \(B\). We show that for any completely positive contractive linear map \(\psi\colon A\to B/I\) there is a continuous family \(\Theta_t\colon A\to B\), for \(t\in [1,\infty)\), of lifts of \(\psi\) that are asymptotically linear, asymptotically completely positive and asymptotically contractive. If \(A\) and \(B\) carry continuous actions of a second countable locally compact group \(G\) such that \(I\) is \(G\)-invariant and \(\psi\) is equivariant, then the family \(\Theta_t\) can be chosen to be asymptotically equivariant.</p>
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<p>Let \(A\) and \(B\) be \(C^*\)-algebras, \(A\) separable and \(I\) an ideal in \(B\). We show that for any completely positive contractive linear map \(\psi\colon A\to B/I\) there is a continuous family \(\Theta_t\colon A\to B\), for \(t\in [1,\infty)\), of lifts of \(\psi\) that are asymptotically linear, asymptotically completely positive and asymptotically contractive. If \(A\) and \(B\) carry continuous actions of a second countable locally compact group \(G\) such that \(I\) is \(G\)-invariant and \(\psi\) is equivariant, then the family \(\Theta_t\) can be chosen to be asymptotically equivariant.</p>
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<p>If a linear completely positive lift for \(\psi\) exists, then we can arrange that \(\Theta_t\) is linear and completely positive for all \(t\in [1,\infty)\); this yields an equivariant version of the Choi-Effros lifting theorem. In the equivariant setting, if \(A\), \(B\) and \(\psi\) are unital, the existence of asymptotically linear unital lifts are only guaranteed if \(G\) is amenable. This leads to a new characterization of amenability in terms of the existence of asymptotically equivariant unital sections for quotient maps.</p>
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<p>If a linear completely positive lift for \(\psi\) exists, then we can arrange that \(\Theta_t\) is linear and completely positive for all \(t\in [1,\infty)\); this yields an equivariant version of the Choi-Effros lifting theorem. In the equivariant setting, if \(A\), \(B\) and \(\psi\) are unital, the existence of asymptotically linear unital lifts are only guaranteed if \(G\) is amenable. This leads to a new characterization of amenability in terms of the existence of asymptotically equivariant unital sections for quotient maps.</p>
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<p>This talk is based on joint work with Marzieh Forough and Klaus Thomsen.</p>
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<p>This talk is based on joint work with Marzieh Forough and Klaus Thomsen.</p>
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start: 2021-09-17T15:00
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start: 2021-09-16T15:00
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end: 2021-09-17T15:45
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end: 2021-09-16T15:45
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speaker: Eusebio Gardella (Universidad de Münster, Alemania)
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speaker: Eusebio Gardella (Universidad de Münster, Alemania)
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- titulo: Continuous orbit equivalence and full groups of ultragraph C*-algebras
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- titulo: Continuous orbit equivalence and full groups of ultragraph C*-algebras
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abstract: |
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abstract: |
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end: 2021-09-17T17:30
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end: 2021-09-17T17:30
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speaker: Román Sasyk (Universidad de Buenos Aires, Argentina)
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speaker: Román Sasyk (Universidad de Buenos Aires, Argentina)
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- sesion: Teoría de Números
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- sesion: Teoría de Números
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zoom:
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zoom: https://us02web.zoom.us/j/88466883296
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organizadores:
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organizadores:
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- nombre: María de los Ángeles Chara
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- nombre: María de los Ángeles Chara
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mail: charamaria@gmail.com
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mail: charamaria@gmail.com
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{% if closed %}
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{% if closed %}
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{% set disabled="disabled" %}
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{% set disabled="disabled" %}
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<div class="alert alert-danger">
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<div class="alert alert-danger">
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<strong>Registration has been closed!</strong><br/>
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<strong>Inscripciones cerradas!</strong><br/>
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For any further questions, please contact: <a class="alert-link" href="mailto:clam2021@fing.edu.uy">clam2021@fing.edu.uy</a>
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Por cualquier otra consulta dirijase: <a class="alert-link" href="mailto:clam2021@fing.edu.uy">clam2021@fing.edu.uy</a>
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</div>
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</div>
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{% endif %}
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{% endif %}
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<div class="row">
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<div class="row">
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<i class="glyphicon glyphicon-info-sign"></i> <strong>Inscripciones abiertas desde el domingo 20 de Junio al miércoles 8 de Septiembre. </strong><br />
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<i class="glyphicon glyphicon-info-sign"></i> <strong>Inscripciones abiertas desde el domingo 20 de Junio al miércoles 8 de Septiembre. </strong><br />
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</div>
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</div>
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<div class="alert alert-info">
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<!-- <div class="alert alert-info">
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<i class="glyphicon glyphicon-info-sign"></i> <strong>Al momento de la inscripción el participante deberá registrar el e-mail de su cuenta Zoom.</strong><br />
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<i class="glyphicon glyphicon-info-sign"></i> <strong>Al momento de la inscripción el participante deberá registrar el e-mail de su cuenta Zoom.</strong><br />
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</div>
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</div>-->
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<hr class="separador"/>
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<hr class="separador"/>
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</div>
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</div>
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</div>
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</div>
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