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2 results

  • The size of characters of exceptional lie groups

  • Part of
  • Kathryn E. Hare, Karen Yeats
  • Journal:
    Journal of the Australian Mathematical Society / Volume 77 / Issue 2 / October 2004
    Published online by Cambridge University Press:
    09 April 2009, pp. 233-248
    Print publication:
    October 2004
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  • Pointwise bounds for characters of representations of the compact, connected, simple, exceptional Life groups are obtained. It is a classical result that if μ is a central, continuous measure on such a group, then μdimG is absolutely continuous. Our estimates on the size of characters allow us to prove that the exponent, dimension of G, can be replaced by approximately the rank of G. Similar results were obtained earlier for the classical, compact Lie groups.

  • Pointwise estimates of the size of characters of compact Lie groups

  • Part of
  • Kathryn E. Hare, David C. Wilson, Wai Ling Yee
  • Journal:
    Journal of the Australian Mathematical Society. Series A. Pure Mathematics and Statistics / Volume 69 / Issue 1 / August 2000
    Published online by Cambridge University Press:
    09 April 2009, pp. 61-84
    Print publication:
    August 2000
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  • Pointwise bounds for characters of representations of the classical, compact, connected, simple Lie groups are obtained with which allow us to study the singularity of central measures. For example, we find the minimal integer k such that any continuous orbital measure convolved with itself k times belongs to L2. We also prove that if k = rank G then μ 2kL1 for all central, continuous measures μ. This improves upon the known classical result which required the exponent to be dimension of the group G.