Fine Gradings of Low-Rank Complex Lie Algebras and of Their Real Forms

Abstract: Abstract. In this review paper, we treat the topic of fine gradings of Lie algebras. This concept is important not only for investigating the structural properties of the algebras, but, on top of that, the fine gradings are often used as the starting point for studying graded contractions or deformations of the algebras. One basic question tackled in the work is the relation between the terms 'grading' and 'group grading'. Although these terms have originally been claimed to coincide for simple Lie algebras, i… Show more

“…An explicit and irredundant description was later given for some classical simple Lie algebras of small rank (see the nice survey [Svo08] and references therein). Such descriptions are also known for the octonions [Eld98], the exceptional simple Jordan algebra (or Albert algebra) [DM09] and for the exceptional simple Lie algebras of type G 2 [DM06], and independently [BT09], and of type F 4 [DM09].…”

Fine gradings on simple classical Lie algebras

“…An explicit and irredundant description was later given for some classical simple Lie algebras of small rank (see the nice survey [Svo08] and references therein). Such descriptions are also known for the octonions [Eld98], the exceptional simple Jordan algebra (or Albert algebra) [DM09] and for the exceptional simple Lie algebras of type G 2 [DM06], and independently [BT09], and of type F 4 [DM09].…”

Fine gradings on simple classical Lie algebras

“…4) and also that the parametrization given for these subgroups is redundant: the same conjugacy class can appear many times. An explicit (and irredundant) description of the corresponding fine gradings was later given for some classical simple Lie algebras of small rank-see [39] and references therein. Such descriptions are also known for the octonions [23], the exceptional simple Jordan algebra (the Albert algebra) [20], and the exceptional Lie algebras of types G 2 [7,19] and F 4 [20]; they were also announced for D 4 [21,22] and E 6 (conference presentation).…”

“…For results concerning gradings on real Lie algebras the reader is referred to [29] and to the recent survey [39].…”

Gradings on Finite-Dimensional Simple Lie Algebras

“…These maximal quasitori are also called MAD-groups (Maximal Abelian Diagonalizable). Unfortunately, the knowledge of the MAD-groups of Aut( L) for L a real Lie algebra, is not an equivalent problem to that one of classifying fine gradings on L up to equivalence [Sv,§4].…”

Gradings on the real form 𝔢6,−26