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Superstrong approximation

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Superstrong approximation is a generalisation of strong approximation in algebraic groups G, to provide "spectral gap" results. The spectrum in question is that of the Laplacian matrix associated to a family of quotients of a discrete group Γ; and the gap is that between the first and second eigenvalues (normalisation so that the first eigenvalue corresponds to constant functions as eigenvectors). Here Γ is a subgroup of the rational points of G, but need not be a lattice: it may be a so-called thin group. The "gap" in question is a lower bound (absolute constant) for the difference of those eigenvalues.

A consequence and equivalent of this property, potentially holding for Zariski dense subgroups Γ of the special linear group over the integers, and in more general classes of algebraic groups G, is that the sequence of Cayley graphs for reductions Γp modulo prime numbers p, with respect to any fixed set S in Γ that is a symmetric set and generating set, is an expander family.[1]

In this context "strong approximation" is the statement that S when reduced generates the full group of points of G over the prime fields with p elements, when p is large enough. It is equivalent to the Cayley graphs being connected (when p is large enough), or that the locally constant functions on these graphs are constant, so that the eigenspace for the first eigenvalue is one-dimensional. Superstrong approximation therefore is a concrete quantitative improvement on these statements.

Background

Property (τ) is an analogue in discrete group theory of Kazhdan's property (T), and was introduced by Alexander Lubotzky.[2] For a given family of normal subgroups N of finite index in Γ, one equivalent formulation is that the Cayley graphs of the groups Γ/N, all with respect to a fixed symmetric set of generators S, form an expander family.[3] Therefore superstrong approximation is a formulation of property (τ), where the subgroups N are the kernels of reduction modulo large enough primes p.

The Lubotzky–Weiss conjecture states (for special linear groups and reduction modulo primes) that an expansion result of this kind holds independent of the choice of S. For applications, it is also relevant to have results where the modulus is not restricted to being a prime.[4]

Proofs of superstrong approximation

Results on superstrong approximation have been found using techniques on approximate subgroups, and growth rate in finite simple groups.[5]

Notes

  1. ^ (Breuillard & Oh 2014, pages x, 343)
  2. ^ http://www.ams.org/notices/200506/what-is.pdf
  3. ^ Alexander Lubotzky (1 January 1994). Discrete Groups, Expanding Graphs and Invariant Measures. Springer. p. 49. ISBN 978-3-7643-5075-8.
  4. ^ (Breuillard & Oh 2014, pages 3-4)
  5. ^ (Breuillard & Oh 2014, page xi)

References