โ Scribed by Benkart, Georgia; Osborn, J. Marshall
No coin nor oath required. For personal study only.
During The Academic Year 1987-1988 The University Of Wisconsin In Madison Hosted A Special Year Of Lie Algebras. A Workshop On Lie Algebras, Of Which These Are The Proceedings, Inaugurated The Special Year. The Principal Focus Of The Year And Of The Workshop Was The Long-standing Problem Of Classifying The Simple Finite-dimensional Lie Algebras Over Algebraically Closed Field Of Prime Characteristic. However, Other Lectures At The Workshop Dealt With The Related Areas Of Algebraic Groups, Representation Theory, And Kac-moody Lie Algebras. Fourteen Papers Were Presented And Nine Of These (eight Research Articles And One Expository Article) Make Up This Volume. Contents: H. Strade: The Absolute Toral Rank Of A Lie Algebra -- R.l. Wilson: Differential Forms And The Algebra W(m:n) -- G.m. Benkart, T.b. Gregory, J.m. Osborn, H. Strade, R.l. Wilson: Isomorphism Classes Of Hamiltonian Lie Algebras -- A. Elduque: On Lie Algebras With A Subalgebra Of Codimension One -- S. Serconek, R.l. Wilson: Forms Of Restricted Simple Lie Algebras -- V.r. Varea: The Subalgebra Lattice Of A Supersolvable Lie Algebra -- R. Farnsteiner: Lie Theoretic Methods In Cohomology Theory -- M.e. Hall: An Introduction To Schubert Submodules -- G.b. Seligman: Kac-moody Modules And Generalized Clifford Algebras -- Workshop Lectures -- Workshop Participants. G. Benkart, J. Marshall Olson, Eds. Papers Presented At The Workshop On Lie Algebras. Includes Bibliographical References.
๐ SIMILAR VOLUMES
The geometry of Jordan and Lie structures tries to answer the following question: what is the integrated, or geometric, version of real Jordan algebras, - triple systems and - pairs? Lie theory shows the way one has to go: Lie groups and symmetric spaces are the geometric version of Lie algebras and
L.l. Avramov, K.b. Tchakerian (eds.). Contains Bibliographies.