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pro vyhledávání: '"Gerber, Thomas"'
We study generalised core partitions arising from affine Grassmannian elements in arbitrary Dynkin type. The corresponding notion of size is given by the atomic length in the sense of [CLG22]. In this paper, we first develop the theory for extended a
Externí odkaz:
http://arxiv.org/abs/2403.11191
We define a new statistic on Weyl groups called the atomic length and investigate its combinatorial and representation-theoretic properties. In finite types, we show a number of properties of the atomic length which are reminiscent of the properties
Externí odkaz:
http://arxiv.org/abs/2211.12359
We study the symplectic Howe duality using two new and independent combinatorial methods: via determinantal formulae on the one hand, and via (bi)crystals on the other hand. The first approach allows us to establish a generalised version where weight
Externí odkaz:
http://arxiv.org/abs/2110.04029
Autor:
Kemper, Johann, Kohaupt, Lena, Witzler, Jette, Tuzhikov, Michael, Roth, Sebastian, Stroda, Alexandra, M’Pembele, René, Tenge, Theresa, Schultze, Cornelia, Verbarg, Nele, Gehrke, Christian, Klemann, Anna Katharina, Hagebölling, Friederike, Albrecht, Svenja, Stroeder, Jakob, Schubert, Ann-Kristin, Espeter, Florian, Russe, Benedikt, Weigand, Markus A., Bergmann, Lars, Unterberg, Matthias, Bischoff, Petra, Pirzer, Raphael, Rach, Patric Rene, Ott, Klaus, Zarbock, Alexander, Kowark, Ana, Neumann, Claudia, Marchand, Bahareh, Sponholz, Christoph, Rueffert, Henrik, Kramer, Mira, Zacharowski, Kai, Meybohm, Patrick, Lindau, Simone, Carollo, Melissa, Novazzi, Cecilia, Toso, Fiorenza, Bacuzzi, Alessandro, Ragazzi, Riccardo, Volta, Carlo Alberto, De Giorgi, Francesco, Bacer, Barbara, Federico, Antonio, Chiumello, Davide, Vetrugno, Luigi, Castella, Alberto, Tesoro, Simonetta, Cotoia, Antonella, Bignami, Elena, Bellissima, Agrippino, Cortegiani, Andrea, Crisman, Marco, Toninelli, Arturo, Piazza, Ornella, Mirabella, Lucia, Bossolasco, Matteo, Bona, Francesco, Perdomo, Juan Manuel, Coca-Martinez, Miquel, Carramiñana, Albert, Servén, Marta Giné, González, Astrid Batalla, Gil Sánchez, José Maria, Becerra-Bolaños, Ángel, Rodríguez-Pérez, Aurelio, Soler, Anna Artigas, Basso, Morena, Font, Anna Peig, Vernetta, Diana, Santos, Julia Hernando, Muñoz, Enrique Alday, Olivares, Mercedes Cabellos, Marco, Gregorio, Lopez, Maria Bermudez, Barrio, Javier, Forés, María Isabel, Boix, Estefanía, Ayuso, Mercedes, Petre, Bogdan Sorel, Oprea, Ioana Sorina, Latiș, Mihai Dan, Margarit, Simona, Vasian, Horatiu, Tomescu, Dana, Cîndea, Iulia, Dirzu, Dan Sebastian, Copotoiu, Sanda-Maria, Moise, Alida, Bubenek-Turconi, Serban, Valeanu, Liana, Wanner, Patrick Mark, Djurdjevic, Mirjana, Nuth, Sandra, Seeberger, Esther, Goettel, Nicolai, Kamber, Firmin, Ganter, Michael Thomas, Gerber, Thomas Jan, Schneebeli, Daniela, Pregernig, Andreas, Grape, Sina, Tomala, Simon, Pinto, Bernardo Bollen, Żukowski, Maciej, Zegan-Barańska, Małgorzata, Karolak, Igor, Krzych, Lukasz, Czajka, Szymon, Studzińska, Dorota, Kluzik, Anna, Koszel, Tomasz, Pabjańczyk, Izabela, Gajdosz, Anna, Erkoc, Suheyla Karadag, Meco, Basak Ceyda, Koltka, Ahmet Kemalettin, Dincer, Muserref Beril, Ekmekçi, Perihan, Saracoglu, Kemal Tolga, Solmaz, Filiz Alkaya, Ozcelik, Menekse, Arun, Oguzhan, Dilmen, Ozlem Korkmaz, Preckel, Benedikt, Hollmann, Markus W., Hazen, Yannick, Donald de Boer, Hans, Epema, Anne, Koopman, Seppe, Van Lier, Felix, Pinto, Rita, Carrão, André, Ribeiro, Daniel, Mourão, Joana, Coelho, Miguel, Losa, Nuno, Santos, Nuno, Cabral, Luis, Afonso, Diana, Zenha, Sérgio, Ramos, Cristina, Hipólito, Carla, Vasilaki, Maria, Andreeva, Antonia, Zaimi, Donika, Chalkias, Athanasios, Spyraki, Maria, Rekatsina, Martina, Tsaousi, Georgia, Short, Anthony, Meier, Sonja, Madhuri, Thumuluru Kavitha, Latham, Scott, Knock, James, Drummond, Andrew, Ramsden, Fiona, Kubisz-Pudelko, Agnieszka, Walker, James, Moppett, Iain, White, Louise, Jackson, Matthew, Reschreiter, Henrik, Innes, Richard, Chew, Michelle, Kalman, Sigridur, Wallden, Jakob, Schening, Anna, Jonikaite, Lina, Enlund, Anna, De Baerdemaeker, Luc, Morrison, Stuart, Rex, Steffen, Alexis, Alexandros, Khoronenko, Viktoria E., Ovezov, Alexey, Belskii, Vladislav, Kaznacheeva, Kseniya, Gritsan, Alexey, Kuzmanovska, Biljana, Malinovska-Nikolovska, Liljana, Barisin, Stjepan, Poredos, Peter, Arabadzhieva, Daniela, Unic-Stojanovic, Dragana, Golubović, Mladjan, Fleischmann, Edith, Kotzinger, Oskar, Des Deserts, Marc Danguy, Ducrocq, Nicolas, Buggy, Donal J., Bonnet, Jean François, Cusack, Barbara, Calleja, Paul, Hasani, Antigona, Nallbani, Rajmonda, Mauermann, Eckhard, Ionescu, Daniela, Szczeklik, Wojciech, De Hert, Stefan, Filipovic, Miodrag, Beck Schimmer, Beatrice, Spadaro, Savino, Matute, Purificación, Ganter, Michael T., Turhan, Sanem C., van Waes, Judith, Lagarto, Filipa, Theodoraki, Kassiani, Gupta, Anil, Gillmann, Hans-Jörg, Guzzetti, Luca, Kotfis, Katarzyna, Larmann, Jan, Corneci, Dan, Howell, Simon J., Lurati Buse, Giovanna
Publikováno v:
In British Journal of Anaesthesia April 2024 132(4):675-684
Autor:
Gerber, Thomas, Lecouvey, Cédric
The set of finite binary matrices of a given size is known to carry a finite type A bicrystal structure. We first review this classical construction, explain how it yields a short proof of the equality between Kostka polynomials and one-dimensional s
Externí odkaz:
http://arxiv.org/abs/2009.10397
Publikováno v:
J. Algebra, 560, 1253-1296, 2020
We prove a conjecture of Lecouvey, which proposes a closed, positive combinatorial formula for symplectic Kostka-Foulkes polynomials, in the case of rows of arbitrary weight. To show this, we construct a new algorithm for computing cocyclage in terms
Externí odkaz:
http://arxiv.org/abs/1911.06732
Autor:
Lurati, Giovanna, Spadaro, Savino, Matute, Purificación, Ionescu, Daniela, Bolliger, Daniel, Szczeklik, Wojciech, Turhan, Sanem Cakar, van Waes, Judith, Lagarto, Filipa, Theodoraki, Kassiani, Howell, Simon J., Gupta, Anil, De Hert, Stefan, Ovezov, Alexey, Tollinche, Luis E., Kuzmanovska, Biljana, Barisin, Stjepan, Poredos, Peter, Arabadzhieva, Daniela, Unic-Stojanovic, Dragana, Fleischmann, Edith, Meistelman, Claude, Buggy, Donal J., Calleja, Paul, Hasani, Antigona, Kemper, Johann, Kohaupt, Lena, Witzler, Jette, Tuzhikov, Michael, Roth, Sebastian, Stroda, Alexandra, Schultze, Cornelia, Verbarg, Nele, Gehrke, Christian, Klemann, Anna Katharina, Hagebölling, Friederike, Albrecht, Svenja, Stroeder, Jakob, Schubert, Ann-Kristin, Espeter, Florian, Russe, Benedikt, Weigand, Markus A., Bergmann, Lars, Unterberg, Matthias, Bischoff, Petra, Pirzer, Raphael, Rach, Patric Rene, Ott, Klaus, Zarbock, Alexander, Kowark, Ana, Neumann, Claudia, Marchand, Bahareh, Sponholz, Christoph, Rueffert, Henrik, Kramer, Mira, Piekarski, Florian, Carollo, Melissa, Novazzi, Cecilia, Toso, Fiorenza, Bacuzzi, Alessandro, Ragazzi, Riccardo, Volta, Carlo Alberto, De Giorgi, Francesco, Bacer, Barbara, Federico, Antonio, Chiumello, Davide, Vetrugno, Luigi, Castella, Alberto, Tesoro, Simonetta, Cotoia, Antonella, Bignami, Elena, Bellissima, Agrippino, Cortegiani, Andrea, Crisman, Marco, Toninelli, Arturo, Piazza, Ornella, Mirabella, Lucia, Bossolasco, Matteo, Bona, Francesco, Perdomo, Juan Manuel, Coca-Martinez, Miquel, Carramiñana, Albert, Servén, Marta Giné, González, Astrid Batalla, Gil Sánchez, José Maria, Becerra-Bolaños, Ángel, Rodríguez-Pérez, Aurelio, Soler, Anna Artigas, Basso, Morena, Font, Anna Peig, Vernetta, Diana, Santos, Julia Hernando, Muñoz, Enrique Alday, Olivares, Mercedes Cabellos, Marco, Gregorio, Lopez, Maria Bermudez, Barrio, Javier, Forés, María Isabel, Boix, Estefanía, Ayuso, Mercedes, Petre, Bogdan Sorel, Oprea, Ioana Sorina, Latiș, Mihai Dan, Margarit, Simona, Vasian, Horatiu, Tomescu, Dana, Cîndea, Iulia, Dirzu, Dan Sebastian, Copotoiu, Sanda-Maria, Moise, Alida, Bubenek-Turconi, Serban, Valeanu, Liana, Wanner, Patrick Mark, Djurdjevic, Mirjana, Nuth, Sandra, Seeberger, Esther, Goettel, Nicolai, Kamber, Firmin, Ganter, Michael Thomas, Gerber, Thomas Jan, Schneebeli, Daniela, Pregernig, Andreas, Grape, Sina, Tomala, Simon, Pinto, Bernardo Bollen, Żukowski, Maciej, Zegan-Barańska, Małgorzata, Karolak, Igor, Krzych, Lukasz, Czajka, Szymon, Studzińska, Dorota, Kluzik, Anna, Koszel, Tomasz, Pabjańczyk, Izabela, Gajdosz, Anna, Erkoc, Suheyla Karadag, Meco, Basak Ceyda, Koltka, Ahmet Kemalettin, Dincer, Muserref Beril, Ekmekçi, Perihan, Saracoglu, Kemal Tolga, Solmaz, Filiz Alkaya, Ozcelik, Menekse, Arun, Oguzhan, Dilmen, Ozlem Korkmaz, Preckel, Benedikt, Hollmann, Markus W., Hazen, Yannick, Donald de Boer, Hans, Epema, Anne, Koopman, Seppe, Van Lier, Felix, Pinto, Rita, Carrão, André, Ribeiro, Daniel, Mourão, Joana, Coelho, Miguel, Losa, Nuno, Santos, Nuno, Cabral, Luis, Afonso, Diana, Zenha, Sérgio, Ramos, Cristina, Hipólito, Carla, Vasilaki, Maria, Andreeva, Antonia, Zaimi, Donika, Chalkias, Athanasios, Spyraki, Maria, Rekatsina, Martina, Tsaousi, Georgia, Short, Anthony, Meier, Sonja, Madhuri, Thumuluru Kavitha, Latham, Scott, Knock, James, Drummond, Andrew, Ramsden, Fiona, Kubisz-Pudelko, Agnieszka, Walker, James, Moppett, Iain, White, Louise, Jackson, Matthew, Reschreiter, Henrik, Innes, Richard, Chew, Michelle, Kalman, Sigridur, Wallden, Jakob, Schening, Anna, Jonikaite, Lina, Enlund, Anna, De Baerdemaeker, Luc, Morrison, Stuart, Rex, Steffen, Alexis, Alexandros, Khoronenko, Viktoria E., Belskii, Vladislav, Kaznacheeva, Kseniya, Gritsan, Alexey, Yeoh, Cindy B., Malinovska-Nikolovska, Liljana, Golubović, Mladjan, Kotzinger, Oskar, Des Deserts, Marc Danguy, Ducrocq, Nicolas, Bonnet, Jean François, Cusack, Barbara, Nallbani, Rajmonda, Daamen, Sylvia, Plichon, Benoit, Harlet, Pierre, Farsi, Slama, Sepehr, Saman Homayun, Espinosa, David, Lurati Buse, Giovanna A., Mauermann, Eckhard, Filipovic, Miodrag, Beck-Schimmer, Beatrice, Gillmann, Hans-Jörg, Guzzetti, Luca, Kotfis, Katarzyna, Wulf, Hinnerk, Larmann, Jan, Corneci, Dan, Chammartin-Basnet, Frederique
Publikováno v:
In British Journal of Anaesthesia June 2023 130(6):655-665
Akademický článek
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Autor:
Gerber, Thomas
We show that a multipartition is cylindric if and only if its level rank-dual is a source in the corresponding affine type $A$ crystal. This provides an algebraic interpretation of cylindricity, and completes a similar result for FLOTW multipartition
Externí odkaz:
http://arxiv.org/abs/1809.09519
Publikováno v:
Pacific J. Math. 306 (2020) 487-517
We define a generalization of the Mullineux involution on multipartitions using the theory of crystals for higher level Fock spaces. Our generalized Mullineux involution turns up in representation theory via two important derived functors on cyclotom
Externí odkaz:
http://arxiv.org/abs/1808.06087