Cartan #0: split: 0; compact: 6; complex: 0 canonical twisted involution: e twisted involution orbit size: 1; fiber size: 64; strong inv: 64 imaginary root system: D6 real root system is empty complex factor is empty real form #5: [0,2,5,8,10,13,49,52,54,59] (10) real form #4: [1,3,4,6,9,11,12,14,48,50,53,55,56,58,61] (15) real form #1: [7,15,51,57,60,62] (6) real form #3: [16,18,21,23,24,26,29,31,33,35,36,38,41,43,44,46] (16) real form #2: [17,19,20,22,25,27,28,30,32,34,37,39,40,42,45,47] (16) real form #0: [63] (1) Cartan #1: split: 0; compact: 4; complex: 1 canonical twisted involution: 2,3,4,5,6,4,3,2,1,2,3,4,5,6,4,3,2 twisted involution orbit size: 30; fiber size: 16; strong inv: 480 imaginary root system: A1.D4 real root system: A1 complex factor is empty real form #5: [0,4,10] (3) real form #3: [1,5,11,15] (4) real form #4: [2,6,8,12] (4) real form #2: [3,7,9,13] (4) real form #1: [14] (1) Cartan #2: split: 2; compact: 4; complex: 0 canonical twisted involution: 1,2,3,4,5,6,4,3,2,1 twisted involution orbit size: 15; fiber size: 16; strong inv: 240 imaginary root system: D4 real root system: A1.A1 complex factor: A1 real form #5: [0,2,5] (3) real form #4: [1,3,4,6] (4) real form #1: [7] (1) Cartan #3: split: 0; compact: 2; complex: 2 canonical twisted involution: 4,5,6,4,3,4,5,6,4,2,3,4,5,6,4,1,2,3,4,5,6,4 twisted involution orbit size: 180; fiber size: 4; strong inv: 720 imaginary root system: A1.A1.A1.A1 real root system: A1.A1 complex factor: A1 real form #5: [0] (1) real form #2: [1] (1) real form #4: [2] (1) real form #3: [3] (1) Cartan #4: split: 2; compact: 2; complex: 1 canonical twisted involution: 3,4,5,6,4,3,2,3,4,5,6,4,3,1,2,3,4,5,6,4,3,2,1 twisted involution orbit size: 180; fiber size: 4; strong inv: 720 imaginary root system: A1.A1.A1 real root system: A1.A1.A1 complex factor: A1 real form #5: [0] (1) real form #4: [1] (1) Cartan #7: split: 4; compact: 2; complex: 0 canonical twisted involution: 3,4,5,6,4,3,2,3,4,5,6,4,3,2,1,2,3,4,5,6,4,3,2,1 twisted involution orbit size: 15; fiber size: 4; strong inv: 60 imaginary root system: A1.A1 real root system: D4 complex factor: A1 real form #5: [0] (1) real form #4: [1] (1)