Essential dimension

In mathematics, essential dimension is an invariant defined for certain algebraic structures such as algebraic groups and quadratic forms. It was introduced by J. Buhler and Z. Reichstein^[1] and in its most generality defined by A. Merkurjev.^[2]

Basically, essential dimension measures the complexity of algebraic structures via their fields of definition. For example, a quadratic form q : V → K over a field K, where V is a K-vector space, is said to be defined over a subfield L of K if there exists a K-basis e₁,...,e_n of V such that q can be expressed in the form [math]\displaystyle{ q\left(\sum x_i e_i\right) = \sum a_{ij} x_ix_j }[/math] with all coefficients a_ij belonging to L. If K has characteristic different from 2, every quadratic form is diagonalizable. Therefore, q has a field of definition generated by n elements. Technically, one always works over a (fixed) base field k and the fields K and L in consideration are supposed to contain k. The essential dimension of q is then defined as the least transcendence degree over k of a subfield L of K over which q is defined.

Formal definition

Fix an arbitrary field k and let Fields/k denote the category of finitely generated field extensions of k with inclusions as morphisms. Consider a (covariant) functor F : Fields/k → Set. For a field extension K/k and an element a of F(K/k) a field of definition of a is an intermediate field K/L/k such that a is contained in the image of the map F(L/k) → F(K/k) induced by the inclusion of L in K.

The essential dimension of a, denoted by ed(a), is the least transcendence degree (over k) of a field of definition for a. The essential dimension of the functor F, denoted by ed(F), is the supremum of ed(a) taken over all elements a of F(K/k) and objects K/k of Fields/k.

Examples

• Essential dimension of quadratic forms: For a natural number n consider the functor Q_n : Fields/k → Set taking a field extension K/k to the set of isomorphism classes of non-degenerate n-dimensional quadratic forms over K and taking a morphism L/k → K/k (given by the inclusion of L in K) to the map sending the isomorphism class of a quadratic form q : V → L to the isomorphism class of the quadratic form [math]\displaystyle{ q_K : V \otimes_L K \to K }[/math].
• Essential dimension of algebraic groups: For an algebraic group G over k denote by H¹(−,G) : Fields/k → Set the functor taking a field extension K/k to the set of isomorphism classes of G-torsors over K (in the fppf-topology). The essential dimension of this functor is called the essential dimension of the algebraic group G, denoted by ed(G).
• Essential dimension of a fibered category: Let [math]\displaystyle{ \mathcal{F} }[/math] be a category fibered over the category [math]\displaystyle{ Aff/k }[/math] of affine k-schemes, given by a functor [math]\displaystyle{ p : \mathcal{F} \to Aff/k. }[/math] For example, [math]\displaystyle{ \mathcal{F} }[/math] may be the moduli stack [math]\displaystyle{ \mathcal{M}_g }[/math] of genus g curves or the classifying stack [math]\displaystyle{ \mathcal{BG} }[/math] of an algebraic group. Assume that for each [math]\displaystyle{ A \in Aff/k }[/math] the isomorphism classes of objects in the fiber p⁻¹(A) form a set. Then we get a functor F_p : Fields/k → Set taking a field extension K/k to the set of isomorphism classes in the fiber [math]\displaystyle{ p^{-1}(Spec(K)) }[/math]. The essential dimension of the fibered category [math]\displaystyle{ \mathcal{F} }[/math] is defined as the essential dimension of the corresponding functor F_p. In case of the classifying stack [math]\displaystyle{ \mathcal{F} = \mathcal{BG} }[/math] of an algebraic group G the value coincides with the previously defined essential dimension of G.

Known results

• The essential dimension of a linear algebraic group G is always finite and bounded by the minimal dimension of a generically free representation minus the dimension of G.
• For G a Spin group over an algebraically closed field k, the essential dimension is listed in OEIS: A280191.
• The essential dimension of a finite algebraic p-group over k equals the minimal dimension of a faithful representation, provided that the base field k contains a primitive p-th root of unity.
• The essential dimension of the symmetric group S_n (viewed as algebraic group over k) is known for n ≤ 5 (for every base field k), for n = 6 (for k of characteristic not 2) and for n = 7 (in characteristic 0).
• Let T be an algebraic torus admitting a Galois splitting field L/k of degree a power of a prime p. Then the essential dimension of T equals the least rank of the kernel of a homomorphism of Gal(L/k)-lattices P → X(T) with cokernel finite and of order coprime to p, where P is a permutation lattice.

References

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