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5 - Algebraic and analytic groups

Published online by Cambridge University Press:  07 September 2011

Dan Segal
Affiliation:
All Souls College, Oxford
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Summary

Algebraic groups

Here, algebraic group will mean a Zariski-closed subgroup of SLn (K), for some n ∈ ℕ and some algebraically closed field K. For background and terminology, see [B2], [H2], [PR] and [W1]. In this section, topological language refers to the Zariski topology.

The following theorem, due to Merzljakov, in a sense provides the philosophical background to all the ellipticity results concerning groups of Lie type; a sharper result specific to simple groups is stated below.

Theorem 5.1.1 [M2] Every algebraic group is verbally elliptic.

This depends on Chevalley's concept of constructible sets. Let V = Kd be the affine space, with its Zariski topology. A subset of V is constructible if it is a finite union of sets of the form CU where C is closed and U is open. A morphism from V to V1 = Kl is a mapping defined by l polynomials.

The key result is

Proposition 5.1.2 Let Y be a constructible subset of V, with closure Ȳ.

  1. (i) (See [W1], 14.9) The set Y contains a subset U that is open and dense in Ȳ.

  2. (ii) (Chevalley, see [H2], §4.4) If f : V → V1 is a morphism then f(Y) is a constructible subset of V1.

Type
Chapter
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Words
Notes on Verbal Width in Groups
, pp. 96 - 112
Publisher: Cambridge University Press
Print publication year: 2009

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