E₈ (mathematics) - E₈ As An Algebraic Group

E₈ As An Algebraic Group

By means of a Chevalley basis for the Lie algebra, one can define E₈ as a linear algebraic group over the integers and, consequently, over any commutative ring and in particular over any field: this defines the so-called split (sometimes also known as “untwisted”) form of E₈. Over an algebraically closed field, this is the only form; however, over other fields, there are often many other forms, or “twists” of E₈, which are classified in the general framework of Galois cohomology (over a perfect field k) by the set H1(k,Aut(E₈)) which, because the Dynkin diagram of E₈ (see below) has no automorphisms, coincides with H1(k,E₈).

Over R, the real connected component of the identity of these algebraically twisted forms of E₈ coincide with the three real Lie groups mentioned above, but with a subtlety concerning the fundamental group: all forms of E₈ are simply connected in the sense of algebraic geometry, meaning that they admit no non-trivial algebraic coverings; the non-compact and simply connected real Lie group forms of E₈ are therefore not algebraic and admit no faithful finite-dimensional representations.

Over finite fields, the Lang–Steinberg theorem implies that H1(k,E₈)=0, meaning that E₈ has no twisted forms: see below.