Downloads provided by UsageCountsThe Square-Zero Basis of Matrix Lie Algebras
Copyright policy ) Raúl Durán Díaz; Víctor Gayoso Martínez; Luis Hernández Encinas; Jaime Muñoz Masqué;
The Square-Zero Basis of Matrix Lie Algebras
A method is presented that allows one to compute the maximum number of functionally-independent invariant functions under the action of a linear algebraic group as long as its Lie algebra admits a basis of square-zero matrices even on a field of positive characteristic. The class of such Lie algebras is studied in the framework of the classical Lie algebras of arbitrary characteristic. Some examples and applications are also given.
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Lie algebra of matrices, invariant function, Invariant function, Primary 14L24, Secondary 15B33, 17B10, linear representation, square-zero matrix, QA1-939, FOS: Mathematics, Representation Theory (math.RT), Mathematics, Mathematics - Representation Theory, linear algebraic groups
Lie algebra of matrices, invariant function, Invariant function, Primary 14L24, Secondary 15B33, 17B10, linear representation, square-zero matrix, QA1-939, FOS: Mathematics, Representation Theory (math.RT), Mathematics, Mathematics - Representation Theory, linear algebraic groups
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