Sergey Y. Sadov
Published 2011-03-06Version 1
Pleijel's inequality is an approximate inversion formula for the Stieltjes transform (or Cauchy integral) of a distribution function on positive semi-axis. It implies a Tauberian theorem due to Malliavin. The proposed analogs of Pleijel's inequality deal with (1) approximate recovery of the Riesz means of the distribution function from its Stieltjes transform, and (2) approximate recovery of the distribution function with power growth for which the ordinary Stieltjes transform does not exist. In the latter case, a power of the Cauchy (or Stieltjes) kernel is used to define the "generalized Stieltjes transform". A previously unpublished theorem stated in Appendix pertains to combination of the two situations (input: generalized Stieltjes transform; output: Riesz means).
Comments: Translated from Russian (practically inaccessible publication). 9pp + one-page Appendix added in translation
Journal: Funkcionalnyj Analiz. Spektral'naja teorija. Mezhvuzovskij sbornik nauchnyh trudov. Ul'anovsk, 1987, pp. 156-164. (MR #92j:26013)
Riesz means on homogeneous trees
Divergent Cesaro and Riesz means of Jacobi and Laguerre expansions
Fractional integral and generalized Stieltjes transforms for hypergeometric functions as transmutation operators
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