Gelfand–Tsetlin Bases for Classical Lie Algebras

Bases for infinite dimensional simple osp(1|2n)-modules respecting the branching osp(1|2n)⊃gl(n) ⋮ Signature characters of highest-weight representations of \(U_q(\mathfrak {gl}_n)\) ⋮ On the \(\mathrm{SO}(n+3)\) to \(\mathrm{SO}(n)\) branching multiplicity space ⋮ Products of longitudinal pseudodifferential operators on flag varieties ⋮ Fibers of characters in Gelfand-Tsetlin categories ⋮ Pieri and Littlewood-Richardson rules for two rows and cluster algebra structure ⋮ Polynomial relations between operators on chains of representation rings ⋮ Finite gauge theory on fuzzy \(\mathbb CP^2\) ⋮ Complete orthogonal Appell systems for spherical monogenics ⋮ New singular Gelfand-Tsetlin \(\mathfrak{gl}(n)\)-modules of index 2 ⋮ The quantum toroidal algebra \(\widehat{\widehat{\mathfrak{gl}_1}}\): calculation of characters of some representations as generating functions of plane partitions ⋮ Super tableaux and a branching rule for the general linear Lie superalgebra ⋮ R-matrix and Mickelsson algebras for orthosymplectic quantum groups ⋮ Gelfand-Tsetlin-type weight bases for all special linear Lie algebra representations corresponding to skew Schur functions ⋮ The Bernstein-Gelfand-Gelfand complex and Kasparov theory for \(SL(3,\mathbb C)\) ⋮ Matrix elements of SO(3) in sl3 representations as bispectral multivariate functions ⋮ PBW filtration and monomial bases for Demazure modules in types A and C ⋮ Shapovalov elements of classical and quantum groups ⋮ Hodge dual operators and model algebras for rational representations of the general linear group ⋮ Gelfand-Tsetlin algebras and cohomology rings of Laumon spaces ⋮ Gelfand-Tsetlin modules of quantum \(\mathfrak{gl}_n\) defined by admissible sets of relations ⋮ Singular Gelfand-Tsetlin modules of \(\mathfrak{gl}(n)\) ⋮ Gelfand-Tsetlin theory for rational Galois algebras ⋮ Regularization of Mickelsson generators for nonexceptional quantum groups ⋮ Combinatorial construction of Gelfand-Tsetlin modules for \(\mathfrak{gl}_n\) ⋮ Separated variables and wave functions for rational gl(N) spin chains in the companion twist frame ⋮ Torsion theories induced from commutative subalgebras. ⋮ Theq-difference Noether problem for complex reflection groups and quantum OGZ algebras ⋮ Diagonal reduction algebra for $\mathfrak{osp}(1|2)$ ⋮ Characters of representations of the quantum toroidal algebra \(\widehat{\widehat{\mathfrak{gl}}}_1\): plane partitions with ``stands ⋮ Orthogonal basis for spherical monogenics by step two branching ⋮ From BaxterQ-operators to local charges ⋮ Monomial bases and branching rules ⋮ The “odd” Gelfand-Zetlin basis for representations of general linear Lie superalgebras ⋮ The \(R\)-matrix presentation for the Yangian of a simple Lie algebra ⋮ Irreducible subquotients of generic Gelfand-Tsetlin modules over \(U_q(\mathfrak{gl}_n)\) ⋮ Explicit construction of irreducible modules for \(U_q(\mathfrak{gl}_n)\) ⋮ Hibi algebras and representation theory ⋮ Embedding factors for branching in Hermitian Clifford analysis ⋮ Yangians and cohomology rings of Laumon spaces ⋮ Representations of the Lie superalgebra \(\mathfrak{osp}(1|2n)\) with polynomial bases ⋮ Generating functions for spherical harmonics and spherical monogenics ⋮ Twisted Yangians of small rank ⋮ A relationship between Gelfand-Tsetlin bases and Chari-Loktev bases for irreducible finite dimensional representations of special linear Lie algebras ⋮ Generalized Taylor series in hermitian Clifford analysis ⋮ R-matrix and inverse Shapovalov form ⋮ Gelfand-Tsetlin degeneration of shift of argument subalgebras in types B, C and D ⋮ Newton-Okounkov polytopes of flag varieties for classical groups ⋮ Construction of the Gelfand-Tsetlin basis for unitary principal series representations of the algebra \(sl_n(\mathbb{C})\) ⋮ Equivariant vector bundles over quantum projective spaces ⋮ Orthogonal basis for the Shapovalov form on $U_q(\mathfrak{sl}(n + 1))$ ⋮ Schubert calculus on Newton-Okounkov polytopes ⋮ Membership in Moment Polytopes is in NP and coNP

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• Yangians and universal enveloping algebras
• A remark on the Gelfand-Tsetlin patterns for symplectic groups
• A ribbon Hopf algebra approach to the irreducible representations of centralizer algebras: The Brauer, Birman-Wenzl, and type A Iwahori-Hecke algebras
• A new approach to representation theory of symmetric groups
• Irreducible unitary representations of the groups \(U(p,q)\) admitting passage to the limit as \(q\to \infty\)
• Irreducible weighted sl(3)-modules
• Special bases for \(S_n\) and \(\text{GL}(n)\)
• Yangians and R-matrices
• Solution of a Sperner conjecture of Stanley with a construction of Gelfand
• The Capelli identity, the double commutant theorem, and multiplicity-free actions
• The symplectic geometry of the Gel'fand-Cetlin-Molev basis for representations of \(\text{Sp}(2n,\mathbb C)\)
• Good bases for G-modules
• The Gel'fand-Tsetlin basis for irreducible unitarizable representations of u(p,q) with a highest weight
• Essentially typical representations of Lie superalgebras \({\mathfrak gl}(n| m)\) in the Gel'fand-Tsetlin basis
• The Gelfand-Cetlin system and quantization of the complex flag manifolds
• Models of representations of classical groups and their hidden symmetries
• A q-difference analogue of \(U({\mathfrak g})\) and the Yang-Baxter equation
• Quantum R matrix for the generalized Toda system
• Odd symplectic groups
• Young-diagrammatic methods for the representation theory of the classical groups of type \(B_ n\), \(C_ n\), \(D_ n\)
• A new interpretation of Gelfand-Tsetlin bases
• Cones, crystals, and patterns
• Description of a class of projection operators for semisimple complex Lie algebras
• Description of unitary representations with highest weight for groups U(p,q)
• \(q\)-deformed orthogonal and pseudo-orthogonal algebras and their representations
• Finite-dimensional irreducible representations of the quantum superalgebra \(U_ q[gl(n/1)\)]
• Special bases of irreducible modules of the quantized universal enveloping algebra \(U_ v(gl(n))\)
• On the structure of the irreducible representation basis for the exceptional group \(G_2\)
• A basis for representations of symplectic Lie algebras
• Gelfand-Tsetlin basis for representations of Yangians
• Young tableaux, Gelfand patterns, and branching rules for classical groups
• On minuscule representations, plane partitions and involutions in complex Lie groups
• Yangians and Gelfand-Zetlin bases
• Finite-dimensional representations of the quantum superalgebra \(U_ q[gl(n/m)\) and related \(q\)-identities]
• Yangians and transvector algebras
• An algorithm to compute bases and representation matrices for \(\text{SL}_{n+1}\)-representations
• A combinatorial construction for simply-laced Lie algebras
• Minuscule posets from neighbourly graph sequences
• Extremal properties of bases for representations of semisimple Lie algebras
• Noncommutative symmetric functions
• Symplectic analogs of the distributive lattices \(L(m,n)\)
• Gelfand-Zetlin basis for \(U_ q(\mathfrak{gl}(\text{\textbf{N}}+\text{\textbf{1}}))\) modules.
• Step algebras of semi-simple subalgebras of Lie algebras
• Irreducibility criterion for tensor products of Yangian evaluation modules.
• An algorithm for computing the global basis of an irreducible \(U_q(sp_{2n})\)-module
• Constructions of representations of \(\text{o}(2n+1,{\mathbb C})\) that imply Molev and Reiner-Stanton lattices are strongly Sperner
• New approach in theory of Clebsch-Gordan coefficients for \(u(n)\) and \(U_q(u(n))\).
• Representations of twisted Yangians associated with skew Young diagrams
• On quantum methods in the representation theory of reductive Lie algebras
• Characters of algebras containing a Jones basic construction: The Temperley-Lieb, Okada, Brauer, and Birman-Wenzl algebras
• Projection operators for simple Lie groups. II: General scheme for constructing lowering operators. The groups \(\mathrm{SU}(n)\)
• Bruhat lattices, plane partition generating functions, and minuscule representations
• A classification of the unitary irreducible representations of \(SO_ 0 (N,1)\)
• A classification of the unitary irreducible representations of \(\mathrm{SU}(N,1)\)
• Lowering operators and the symplectic group
• Lowering operators for the reduction U(\(n\)) \(\downarrow\) SO (\(n\))
• Crystalizing the q-analogue of universal enveloping algebras
• Normalized Uq(sl(3)) Gel’fand–(Weyl)–Zetlin basis and new summation formulas for q-hypergeometric functions
• Formal analytic continuation of Gel’fand’s finite dimensional representations of gl(n,C)
• An Algorithm for Computing the Global Basis of a Finite Dimensional IrreducibleU_q(so_2n+1) orU_q(so_2n)-Module
• Canonical Bases Arising from Quantized Enveloping Algebras
• Highest weight irreducible unitary representations of Lie algebras of infinite matrices. I. The algebra gl(∞)
• Highest weight irreducible unitarizable representations of Lie algebras of infinite matrices. The algebra A∞
• Standard Young tableaux and weight multiplicities of the classical Lie groups
• A projection-based solution to the SP(2N) state labeling problem
• Extremal projections for reductive classical Lie superalgebras with a non-degenerate generalized Killing form
• Construction of Sp-modules by tableaux
• EXTREMAL PROJECTORS AND GENERALIZED MICKELSSON ALGEBRAS OVER REDUCTIVE LIE ALGEBRAS
• Representation theory of the symplectic groups. I
• Irreducible finite-dimensional representations of the Lie superalgebra gl(n/1) in a Gel’fand–Zetlin basis
• INTERMEDIATE LIE ALGEBRAS AND THEIR FINITE-DIMENSIONAL REPRESENTATIONS
• On an infinitesimal approach to semisimple Lie groups and raising and lowering operators of O(n) and U(n)
• The most degenerate irreducible representations of the symplectic group
• General U(N) raising and lowering operators
• Missing label operators in the reduction Sp(2n) ↓Sp(2n−2)
• Representations of $\mathfrak{sl}( 2,\mathbb{C} )$ on Posets and the Sperner Property
• Twisted yangians and infinite-dimensional classical Lie algebras
• Canonical Bases for Irreducible Representations of Quantum Gl _N
• The pattern calculus for tensor operators in quantum groups
• Construction of orthogonal group modules using tableaux
• The characteristic identities and reduced matrix elements of the unitary and orthogonal groups
• Extremal projections for contragredient Lie algebras and superalgebras of finite growth
• Highest weight representations of the quantum algebraU(gl
• Finite-dimensional representations of the special linear Lie superalgebra sl(1,n). II. Nontypical representations
• Yangians and classical Lie algebras
• Irregular Uq (sl(3)) representations at roots of unity via Gel’fand–(Weyl)–Zetlin basis
• Seminormal Representations of Weyl Groups and Iwahori-Hecke Algebras
• Polynomial realization of the Uq(sl(3)) Gel’fand–(Weyl)–Zetlin basis
• Representations of Yangians with GelfandZetlin bases
• Weight bases of Gelfand-Tsetlin type for representations of classical Lie algebras
• Finite-dimensional irreducible representations of twisted Yangians
• Highest weight irreducible representations of the quantum algebra Uh(A∞)
• Highest weight irreducible representations of the Lie superalgebra gl(1|∞)
• Wigner coefficients for a semisimple Lie group and the matrix elements of the O(n) generators
• On the matrix elements of the U(n) generators
• Mickelsson lowering operators for the symplectic group
• A SIMPLE ALGORITHM FOR COMPUTING THE GLOBAL CRYSTAL BASIS OF AN IRREDUCIBLE U_q(sl_n)-MODULE
• Canonical Bases for Irreducible Representations of Quantum GL _n , II
• Operators that Lower or Raise the Irreducible Vector Spaces of U n−1 Contained in an Irreducible Vector Space of Un
• On the Representations of the Semisimple Lie Groups. II
• THE CLASSICAL GROUPS. SPECTRAL ANALYSIS OF THEIR FINITE-DIMENSIONAL REPRESENTATIONS
• Representations of the Orthogonal Group. I. Lowering and Raising Operators of the Orthogonal Group and Matrix Elements of the Generators
• Lowering and Raising Operators for the Orthogonal Group in the Chain O(n) ⊃ O(n − 1) ⊃ … , and their Graphs
• Branching Theorem for the Symplectic Groups
• Projection operators for simple lie groups
• Characteristic Identities for Generators of GL(n), O(n) and Sp(n)
• Introduction to Lie Algebras and Representation Theory
• Explicit constructions of the fundamental representations of the symplectic Lie algebras
• Centralizer construction for twisted Yangians
• On Gelfand-Zetlin modules over \(U_q(gl_n)\)