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257 results on '"Baklouti, Ali"'

1. Visible actions and criteria for multiplicity-freeness of representations of Heisenberg groups

Author

Baklouti, Ali and Sasaki, Atsumu

Subjects
Mathematics - Representation Theory, 22E25, 22E27
Abstract

A visible action on a complex manifold is a holomorphic action that admits a $J$-transversal totally real submanifold $S$. It is said to be strongly visible if there exists an orbit-preserving anti-holomorphic diffeomorphism $\sigma $ such that $\sigma |_S = \operatorname{id}_S$. Let $G$ be the Heisenberg group and $H$ a non-trivial connected closed subgroup of $G$. We prove that any complex homogeneous space $D = G^{\mathbb{C}}/H^{\mathbb{C}}$ admits a strongly visible $L$-action, where $L$ stands for a connected closed subgroup of $G$ explicitly constructed through a co-exponential basis of $H$ in $G$. This leads in turn that $G$ itself acts strongly visibly on $D$. The proof is carried out by finding explicitly an orbit-preserving anti-holomorphic diffeomorphism and a totally real submanifold $S$, for which the dimension depends upon the dimensions of $G$ and $H$. As a direct application, our geometric results provide a proof of various multiplicity-free theorems on continuous representations on the space of holomorphic sections on $D$. Moreover, we also generate as a consequence, a geometric criterion for a quasi-regular representation of $G$ to be multiplicity-free., Comment: 36 pages

Published
2019

3. Intertwining Operators of Induced Representations and Restrictions of Representations of Exponential Solvable Lie Groups

Author

Baklouti, Ali, Fujiwara, Hidenori, Ludwig, Jean, Kim, Minhyong, Editor-in-Chief, Wendland, Katrin, Editor-in-Chief, Axler, Sheldon, Series Editor, Braverman, Mark, Series Editor, Chudnovsky, Maria, Series Editor, Funaki, Tadahisa, Series Editor, Gallagher, Isabelle, Series Editor, Güntürk, Sinan, Series Editor, Le Bris, Claude, Series Editor, Massart, Pascal, Series Editor, Pinto, Alberto A., Series Editor, Pinzari, Gabriella, Series Editor, Ribet, Ken, Series Editor, Schilling, René, Series Editor, Souganidis, Panagiotis, Series Editor, Süli, Endre, Series Editor, Weinberger, Shmuel, Series Editor, Zilber, Boris, Series Editor, Baklouti, Ali, Fujiwara, Hidenori, and Ludwig, Jean

Published
2021
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4. Variants of Plancherel Formulas for Monomial Representations of Exponential Solvable Lie Groups

Author

Baklouti, Ali, Fujiwara, Hidenori, Ludwig, Jean, Kim, Minhyong, Editor-in-Chief, Wendland, Katrin, Editor-in-Chief, Axler, Sheldon, Series Editor, Braverman, Mark, Series Editor, Chudnovsky, Maria, Series Editor, Funaki, Tadahisa, Series Editor, Gallagher, Isabelle, Series Editor, Güntürk, Sinan, Series Editor, Le Bris, Claude, Series Editor, Massart, Pascal, Series Editor, Pinto, Alberto A., Series Editor, Pinzari, Gabriella, Series Editor, Ribet, Ken, Series Editor, Schilling, René, Series Editor, Souganidis, Panagiotis, Series Editor, Süli, Endre, Series Editor, Weinberger, Shmuel, Series Editor, Zilber, Boris, Series Editor, Baklouti, Ali, Fujiwara, Hidenori, and Ludwig, Jean

Published
2021
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5. Branching Laws and the Multiplicity Function of Unitary Representations of Exponential Solvable Lie Groups

Author

Baklouti, Ali, Fujiwara, Hidenori, Ludwig, Jean, Kim, Minhyong, Editor-in-Chief, Wendland, Katrin, Editor-in-Chief, Axler, Sheldon, Series Editor, Braverman, Mark, Series Editor, Chudnovsky, Maria, Series Editor, Funaki, Tadahisa, Series Editor, Gallagher, Isabelle, Series Editor, Güntürk, Sinan, Series Editor, Le Bris, Claude, Series Editor, Massart, Pascal, Series Editor, Pinto, Alberto A., Series Editor, Pinzari, Gabriella, Series Editor, Ribet, Ken, Series Editor, Schilling, René, Series Editor, Souganidis, Panagiotis, Series Editor, Süli, Endre, Series Editor, Weinberger, Shmuel, Series Editor, Zilber, Boris, Series Editor, Baklouti, Ali, Fujiwara, Hidenori, and Ludwig, Jean

Published
2021
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6. Monomial Representations of Discrete Type of Exponential Solvable Lie Groups

Author

Baklouti, Ali, Fujiwara, Hidenori, Ludwig, Jean, Kim, Minhyong, Editor-in-Chief, Wendland, Katrin, Editor-in-Chief, Axler, Sheldon, Series Editor, Braverman, Mark, Series Editor, Chudnovsky, Maria, Series Editor, Funaki, Tadahisa, Series Editor, Gallagher, Isabelle, Series Editor, Güntürk, Sinan, Series Editor, Le Bris, Claude, Series Editor, Massart, Pascal, Series Editor, Pinto, Alberto A., Series Editor, Pinzari, Gabriella, Series Editor, Ribet, Ken, Series Editor, Schilling, René, Series Editor, Souganidis, Panagiotis, Series Editor, Süli, Endre, Series Editor, Weinberger, Shmuel, Series Editor, Zilber, Boris, Series Editor, Baklouti, Ali, Fujiwara, Hidenori, and Ludwig, Jean

Published
2021
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7. Bounded Irreducible Representations

Author

Baklouti, Ali, Fujiwara, Hidenori, Ludwig, Jean, Kim, Minhyong, Editor-in-Chief, Wendland, Katrin, Editor-in-Chief, Axler, Sheldon, Series Editor, Braverman, Mark, Series Editor, Chudnovsky, Maria, Series Editor, Funaki, Tadahisa, Series Editor, Gallagher, Isabelle, Series Editor, Güntürk, Sinan, Series Editor, Le Bris, Claude, Series Editor, Massart, Pascal, Series Editor, Pinto, Alberto A., Series Editor, Pinzari, Gabriella, Series Editor, Ribet, Ken, Series Editor, Schilling, René, Series Editor, Souganidis, Panagiotis, Series Editor, Süli, Endre, Series Editor, Weinberger, Shmuel, Series Editor, Zilber, Boris, Series Editor, Baklouti, Ali, Fujiwara, Hidenori, and Ludwig, Jean

Published
2021
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8. Holomorphically Induced Representations of Solvable Lie Groups

Author

Baklouti, Ali, Fujiwara, Hidenori, Ludwig, Jean, Kim, Minhyong, Editor-in-Chief, Wendland, Katrin, Editor-in-Chief, Axler, Sheldon, Series Editor, Braverman, Mark, Series Editor, Chudnovsky, Maria, Series Editor, Funaki, Tadahisa, Series Editor, Gallagher, Isabelle, Series Editor, Güntürk, Sinan, Series Editor, Le Bris, Claude, Series Editor, Massart, Pascal, Series Editor, Pinto, Alberto A., Series Editor, Pinzari, Gabriella, Series Editor, Ribet, Ken, Series Editor, Schilling, René, Series Editor, Souganidis, Panagiotis, Series Editor, Süli, Endre, Series Editor, Weinberger, Shmuel, Series Editor, Zilber, Boris, Series Editor, Baklouti, Ali, Fujiwara, Hidenori, and Ludwig, Jean

Published
2021
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9. Polynomial Conjectures

Author

Baklouti, Ali, Fujiwara, Hidenori, Ludwig, Jean, Kim, Minhyong, Editor-in-Chief, Wendland, Katrin, Editor-in-Chief, Axler, Sheldon, Series Editor, Braverman, Mark, Series Editor, Chudnovsky, Maria, Series Editor, Funaki, Tadahisa, Series Editor, Gallagher, Isabelle, Series Editor, Güntürk, Sinan, Series Editor, Le Bris, Claude, Series Editor, Massart, Pascal, Series Editor, Pinto, Alberto A., Series Editor, Pinzari, Gabriella, Series Editor, Ribet, Ken, Series Editor, Schilling, René, Series Editor, Souganidis, Panagiotis, Series Editor, Süli, Endre, Series Editor, Weinberger, Shmuel, Series Editor, Zilber, Boris, Series Editor, Baklouti, Ali, Fujiwara, Hidenori, and Ludwig, Jean

Published
2021
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10. Intertwining Operators for Irreducible Representations of an Exponential Solvable Lie Group

Author

Baklouti, Ali, Fujiwara, Hidenori, Ludwig, Jean, Kim, Minhyong, Editor-in-Chief, Wendland, Katrin, Editor-in-Chief, Axler, Sheldon, Series Editor, Braverman, Mark, Series Editor, Chudnovsky, Maria, Series Editor, Funaki, Tadahisa, Series Editor, Gallagher, Isabelle, Series Editor, Güntürk, Sinan, Series Editor, Le Bris, Claude, Series Editor, Massart, Pascal, Series Editor, Pinto, Alberto A., Series Editor, Pinzari, Gabriella, Series Editor, Ribet, Ken, Series Editor, Schilling, René, Series Editor, Souganidis, Panagiotis, Series Editor, Süli, Endre, Series Editor, Weinberger, Shmuel, Series Editor, Zilber, Boris, Series Editor, Baklouti, Ali, Fujiwara, Hidenori, and Ludwig, Jean

Published
2021
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14. Open orbits and primitive zero ideals for solvable Lie algebras.

Author

Baklouti, Ali and Ishi, Hideyuki

Subjects
*ORBITS (Astronomy), *FROBENIUS algebras, *LIE algebras, *ALGEBRA
Abstract

The aim of the paper is to provide a characterization criterion of exponential solvable Frobenius Lie algebras (having open coadjoint orbits), in terms of primitive ideals of the associated enveloping algebra. In the case of complex solvable Lie algebras, we also show that an algebraic adjoint orbit is open if and only if the associated primitive ideal through the Dixmier map is trivial. [ABSTRACT FROM AUTHOR]

Published
2024
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20. Orbites coadjointes et vari\'et\'es caract\'eristiques

Author

Baklouti, Ali, Dhieb, Sami, and Manchon, Dominique

Subjects
Mathematics - Representation Theory, Mathematics - Quantum Algebra, 16S30, 16S80, 16G30, 22E30
Abstract

The purpose of the present work is to describe a dequantization procedure for topological modules over a deformed algebra. We define the characteristic variety of a topological module as the common zeroes of the annihilator of the representation obtained by setting the deformation parameter to zero. On the other hand, the Poisson characteristic variety is defined as the common zeroes of the ideal obtained by considering the annihilator of the deformed representation, and only then setting the deformation parameter to zero. Using Gabber's theorem, we show the involutivity of the characteristic variety. The Poisson characteristic variety is indeed a Poisson subvariety of the underlying Poisson manifold. We compute explicitly the characteristic variety in several examples in the Poisson-linear case, including the dual of any exponential solvable Lie algebra. In the nilpotent case, we show that any coadjoint orbit appears as the Poisson characteristic variety of a well chosen topological module., Comment: Important corrections and improvements. In French, plain TeX, 41 pages. Submitted

Published
2003
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25. A proof of the polynomial conjecture for nilpotent Lie groups monomial representations.

Author

Baklouti, Ali, Fujiwara, Hidenori, and Ludwig, Jean

Subjects
*NILPOTENT Lie groups, *POLYNOMIALS, *GROUP algebras, *DIFFERENTIAL operators, *LIE algebras, *DIFFERENTIAL algebra
Abstract

Let G = \operatorname {exp}(\mathfrak {g}) be a connected and simply connected real nilpotent Lie group with Lie algebra \mathfrak g, H = \operatorname {exp}(\mathfrak {h}) an analytic subgroup of G with Lie algebra \mathfrak h, \chi a unitary character of H and \tau = \text {ind}_H^G \chi the monomial representation of G induced by \chi. Let D_{\tau }(G/H) be the algebra of the G-invariant differential operators on the fiber bundle over the base space G/H associated to the data (H,\chi). We prove the polynomial conjecture due to Corwin-Greenleaf stating that if \tau is of finite multiplicities, the algebra D_{\tau }(G/H) is isomorphic to the algebra {{\mathbb C}[{\Gamma }_{\tau }]}^H of the H-invariant polynomial functions on the affine subspace {\Gamma }_{\tau } = \{\ell \in {\mathfrak g}^*; {\ell }|_{\mathfrak h} = -\sqrt {-1}d\chi \} of {\mathfrak g}^*. In this case, we show that any non-zero element of D_{\tau }(G/H) admits a fundamental tempered solution. [ABSTRACT FROM AUTHOR]

Published
2023
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30. A proof of the polynomial conjecture for restrictions of nilpotent Lie groups representations

Author

Ludwig, Jean, Baklouti, Ali, Fujiwara, Hidenori, Institut Élie Cartan de Lorraine (IECL), Université de Lorraine (UL)-Centre National de la Recherche Scientifique (CNRS), Laboratoire de Mathématiques et leurs Applications de Valenciennes - EA 4015 (LAMAV), Centre National de la Recherche Scientifique (CNRS)-Université Polytechnique Hauts-de-France (UPHF)-INSA Institut National des Sciences Appliquées Hauts-de-France (INSA Hauts-De-France), Nara Institute of Science and Technology - Graduate School of Information Science (NAIST), Nara Institute of Science and Technology, and Ludwig, Jean

Subjects
Mathematics (miscellaneous), [MATH] Mathematics [math], [MATH]Mathematics [math]
Abstract

Let G G be a connected and simply connected nilpotent Lie group, K K an analytic subgroup of G G and π \pi an irreducible unitary representation of G G whose coadjoint orbit of G G is denoted by Ω ( π ) \Omega (\pi ) . Let U ( g ) \mathscr U(\mathfrak g) be the enveloping algebra of g C {\mathfrak g}_{\mathbb C} , g \mathfrak g designating the Lie algebra of G G . We consider the algebra D π ( G ) K ≃ ( U ( g ) / ker ⁡ ( π ) ) K D_{\pi }(G)^K \simeq \left (\mathscr U(\mathfrak g)/\operatorname {ker}(\pi )\right )^K of the K K -invariant elements of U ( g ) / ker ⁡ ( π ) \mathscr U(\mathfrak g)/\operatorname {ker}(\pi ) . It turns out that this algebra is commutative if and only if the restriction π | K \pi |_K of π \pi to K K has finite multiplicities (cf. Baklouti and Fujiwara [J. Math. Pures Appl. (9) 83 (2004), pp. 137-161]). In this article we suppose this eventuality and we provide a proof of the polynomial conjecture asserting that D π ( G ) K D_{\pi }(G)^K is isomorphic to the algebra C [ Ω ( π ) ] K \mathbb C[\Omega (\pi )]^K of K K -invariant polynomial functions on Ω ( π ) \Omega (\pi ) . The conjecture was partially solved in our previous works (Baklouti, Fujiwara, and Ludwig [Bull. Sci. Math. 129 (2005), pp. 187-209]; J. Lie Theory 29 (2019), pp. 311-341).

Published
2021

31. A proof of the polynomial conjecture for induction

Author

Ludwig, Jean, Baklouti, Ali, Fujiwara, Hidenori, Institut Élie Cartan de Lorraine (IECL), Université de Lorraine (UL)-Centre National de la Recherche Scientifique (CNRS), Laboratoire de Mathématiques et leurs Applications de Valenciennes - EA 4015 (LAMAV), Centre National de la Recherche Scientifique (CNRS)-Université Polytechnique Hauts-de-France (UPHF)-INSA Institut National des Sciences Appliquées Hauts-de-France (INSA Hauts-De-France), Nara Institute of Science and Technology - Graduate School of Information Science (NAIST), Nara Institute of Science and Technology, and Ludwig, Jean

Subjects
[MATH] Mathematics [math], [MATH]Mathematics [math]
Published
2021

42. The polynomial conjecture for restrictions of some nilpotent Lie groups representations

Author

Baklouti, Ali, Fujiwara, Hidenori, Ludwig, Jean, Faculté des Sciences de Sfax, Université de Sfax - University of Sfax, Nara Institute of Science and Technology - Graduate School of Information Science (NAIST), Nara Institute of Science and Technology, Institut Élie Cartan de Lorraine (IECL), Université de Lorraine (UL)-Centre National de la Recherche Scientifique (CNRS), and Ludwig, Jean

Subjects
Orbit method, Plancherel formula, Penney distribution, differential operator, irreducible representations, [MATH] Mathematics [math], [MATH]Mathematics [math], Mathematics::Representation Theory
Abstract

International audience; Let $G$ be a connected and simply connected nilpotent Lie group, $K$ an analytic subgroup of $G$ and $\pi$ an irreducible unitary representation of $G$ whose coadjoint orbit of $G$ is denoted by $\Omega(\pi)$. Let $\mathcal U(\mathfrak g)$ be the enveloping algebra of ${\mathfrak g}_{\mathbb C}$, $\mathfrak g$ designating the Lie algebra of $G$. We consider the algebra $\left(\mathcal U(\mathfrak g)/\ker \pi\right)^K$ of the $K$-invariant elements of $\mathcal U(\mathfrak g)/\ker \pi$. It turns out that this algebra is commutative if and only if the restriction $\pi|_K$ of $\pi$ to $K$ has finite multiplicities (cf.\,A.\,Baklouti and H.\,Fujiwara, {\em Commutativit\'{e} des op\'{e}rateurs diff\'{e}rentiels sur l'espace des repr\'{e}sentations restreintes d'un groupe de Lie nilpotent}, J.\,Math.\,Pures\,Appl.\,83 (2004) 137--161). In this article we suppose this eventuality and we study the polynomial conjecture asserting that our algebra is isomorphic to the algebra $\mathbb C[\Omega(\pi)]^K$ of the $K$-invariant polynomial functions on $\Omega(\pi)$. We give a proof of the conjecture in the case where $\Omega(\pi)$ admits a normal polarization of $G$ and in the case where $K$ is abelian. This problem was partially tackled previously by A.\,Baklouti, H.\,Fujiwara, J.\,Ludwig, {\em Analysis of restrictions of unitary representations of a nilpotent Lie group}, Bull. Sci. Math. 129 (2005) 187--209.

Published
2019

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