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Austin, Tim
2016.
Recent Trends in Combinatorics.
Vol. 159,
Issue. ,
p.
453.
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Quantitative Equidistribution for Certain Quadruples in Quasi-Random Groups: Erratum
Published online by Cambridge University Press: 22 September 2015
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In my recent paper [1] there is a mistake in the proof of Corollary 3. The first line of the displayed equation in that proof asserts that
However, since the paper uses complex-valued representations, the integrand on the right here may not retain the absolute value of that on the left. Without this equality, the proof of Corollary 3 can no longer be reduced to an application of Lemma 2. However, it can be proved directly from Schur Orthogonality along very similar lines to the proof of Lemma 2.
\[\int_G|\langle u,\pi^g v\rangle_V|^2\,\rm{d} g = \int_G\langle u\otimes u,(\pi^g\otimes \pi^g)(v\otimes v)\rangle_{V\otimes V}\, \rm{d} g.\]
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References
[1]
Austin, T. (2015) Quantitative equidistribution for certain quadruples in quasi-random groups.
Combin. Probab. Comput.
24
376–381.CrossRefGoogle Scholar
[2]
Bump, D. (2004) Lie Groups, Vol. 225 of Graduate Texts in Mathematics, Springer.CrossRefGoogle Scholar
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