Gradings on the Albert algebra and on $\mathfrak{f}_4$

We study group gradings on the Albert algebra and on the exceptional simple Lie algebra \frak{f}_4 over algebraically closed fields of characteristic zero. The immediate precedent of this work is [Draper, C. and Martin, C.: Gradings on \frak{g}_2 . Linear Algebra Appl. 418 (2006), no. 1, 85-111] where we described (up to equivalence) all the gradings on the exceptional simple Lie algebra \frak{g}_2 . In the cases of the Albert algebra and \frak{f}_4 , we look for the nontoral gradings finding that there are only eight nontoral nonequivalent gradings on the Albert algebra (three of them being fine) and nine on \frak{f}_4 (also three of them fine).

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