The group ²E₆(q²) has order q³⁶ (q¹² − 1) (q⁹ + 1) (q⁸ − 1) (q⁶ − 1) (q⁵ + 1) (q² − 1) /(3,q + 1).^[1] This is similar to the order q³⁶ (q¹² − 1) (q⁹ − 1) (q⁸ − 1) (q⁶ − 1) (q⁵ − 1) (q² − 1) /(3,q − 1) of E₆(q).

Its Schur multiplier has order (3, q + 1) except for q=2, i. e. ²E₆(2²), when it has order 12 and is a product of cyclic groups of orders 2,2,3. One of the exceptional double covers of ²E₆(2²) is a subgroup of the baby monster group, and the exceptional central extension by the elementary abelian group of order 4 is a subgroup of the monster group.

The outer automorphism group has order (3, q + 1) · f where q² = p^f.

Over the real numbers, ²E₆ is the quasisplit form of E₆, and is one of the five real forms of E₆ classified by Élie Cartan. Its maximal compact subgroup is of type F₄.

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