DOI10.1090/S0273-0979-1979-14631-7zbMath0466.14020WikidataQ60308774 ScholiaQ60308774MaRDI QIDQ3918232
C. Musili, Venkatramani Lakshmibai, Conjeevaram Srirangachari Seshadri
Publication date: 1979
Published in: Bulletin of the American Mathematical Society (Search for Journal in Brave)
Weyl Groups, the Hard Lefschetz Theorem, and the Sperner Property,
Standard monomial theory for \(G_ 2\),
A characterization of Kempf varieties by means of standard monomials and the geometric consequences,
Cohomology of G/B in characteristic p,
Geometry of G/P. VI: Bases for fundamental represenations of classical groups. Geometry of G/P. VII: The symplectic group and the involution \(\sigma\) . Geometry of G/P. VIII: The group \(SO(2n+1)\) and the involution \(\sigma\),
A computer oriented algorithm for the determination of the dimension and character of a modular irreducible SL(n,K)-module,
Symplectic PBW degenerate flag varieties; PBW tableaux and defining equations,
Singular loci of Schubert varieties for classical groups,
Sheaf cohomology on G/B and tensor products of Weyl modules,
Algebraic and geometric properties of flag Bott-Samelson varieties and applications to representations,
Standard monomial theory for flag algebras of GL\((n)\)and Sp\((2n)\),
Invariant forms on irreducible modules of simple algebraic groups,
Plücker relations and spherical varieties: application to model varieties,
Supersymmetry, transfinite neural networks, hyperbolic manifolds, quantum gravity and the Higgs,
Bruhat lattices, plane partition generating functions, and minuscule representations,
Singular locus of a Schubert variety,
Determinantal loci and the flag variety,
Symplectic analogs of the distributive lattices \(L(m,n)\),
Representation functors and flag-algebras for the classical groups. II,
Accessible proof of standard monomial basis for coordinatization of Schubert sets of flags
