We find all the fine group gradings on the real forms of the Albert algebra and of the exceptional Lie algebras g 2 and f 4 . ͑pO s ͒, J ͑0,0,e͒ = R 3 , J ͑0,0,g͒ = 0, ͑g e͒ J ͑0,1,g͒ = 0 ͑͑pO s ͒ g ͒, 053516-19 Gradings on g 2 and f 4 J. Math. Phys. 51, 053516 ͑2010͒ This article is copyrighted as indicated in the article. Reuse of AIP content is subject to the terms at: http://scitation.aip.org/termsconditions. Downloaded to IP: 129.12.232.124 On: Wed, 26 Nov 2014 20:30:56͑2͒ If J is compact, ͑i͒ the Z 2 5 -grading on JªA ͑1,1,1͒ ͑pO͒, J ͑0,0,e͒ = R 3 , J ͑0,0,g͒ = 0, ͑g e͒ J ͑0,1,g͒ = 0 ͑͑pO͒ g ͒, J ͑1,0,g͒ = 1 ͑͑pO͒ g ͒, J ͑1,1,g͒ = 2 ͑͑pO͒ g ͒. ͑3͒ If J is nonsplit and noncompact, ͑i͒ the Z 2 5 -grading on JªA ͑−1,1,−1͒ ͑pO͒, J ͑0,0,e͒ = R 3 , J ͑0,0,g͒ = 0, ͑g e͒ J ͑0,1,g͒ = 0 ͑͑pO͒ g ͒, J ͑1,0,g͒ = 1 ͑͑pO͒ g ͒, J ͑1,1,g͒ = 2 ͑͑pO͒ g ͒; ͑ii͒ the Z 2 3 ϫ Z-grading on JªA ͑−1,1,−1͒ ͑pO͒, J ͑−2,e͒ = ͗2͑e 0 − e 2 ͒ − 1 ͑1͒͘, J ͑−2,g͒ = 0, ͑g e͒ J ͑−1,g͒ = ͗ 0 ͑x͒ − 2 ͑x͒: x ͑pO͒ g ͘, J ͑0,e͒ = ͗e 1 ,e 0 + e 2 ͘, J ͑0,g͒ = ͗ 1 ͑x͒: x ͑pO͒ g ͘, ͑g e͒ J ͑1,g͒ = ͗ 0 ͑x͒ + 2 ͑x͒: x ͑pO͒ g ͘, J ͑2,e͒ = ͗2͑e 0 − e 2 ͒ + 1 ͑1͒͘, J ͑2,g͒ = 0, ͑g e͒.Also, in the same way, we can have a detailed description of the fine gradings on the real forms of f 4 .
