info:eu-repo/semantics/article
Negative Ricci curvature on some non-solvable Lie groups II
Fecha
2020-04Registro en:
Will, Cynthia Eugenia; Negative Ricci curvature on some non-solvable Lie groups II; Springer; Mathematische Zeitschrift; 294; 3-4; 4-2020; 1085-1105
0025-5874
CONICET Digital
CONICET
Autor
Will, Cynthia Eugenia
Resumen
We construct many examples of Lie groups admitting a left-invariant metric of negative Ricci curvature. We study Lie algebras which are semidirect products l= (a⊕ u) ⋉ n and we obtain examples where u is any semisimple compact real Lie algebra, a is one-dimensional and n is a representation of u which satisfies some conditions. In particular, when u= su(m) , so(m) or sp(m) and n is a representation of u in some space of homogeneous polynomials, we show that these conditions are indeed satisfied. In the case u= su(2) we get a more general construction where n can be any nilpotent Lie algebra where su(2) acts by derivations. We also prove a general result in the case when u is a semisimple Lie algebra of non-compact type.