Smoothness of the Radon-Nikodym derivative of a convolution of orbital measures on compact symmetric spaces of rank one

Boudjemâa Anchouche, Sanjiv Gupta

نتاج البحث: المساهمة في مجلةArticleمراجعة النظراء

1 اقتباس (Scopus)

ملخص

Let G/K be a compact symmetric space of rank one. The aim of this paper is to give sufficient conditions for the Cv -smoothness of the Radon Nikodym derivative fa1,...,ap = d (μa1 * ... * μap of the convolution μa1 *...*μap of some orbital measures μai, with respect to the Haar measure μG of G. This generalizes some of the main results in [12], in the case of compact rank one symmetric spaces, where the absolute continuity of the measure μa1 * ... * μap with respect to dμG was considered. Our main result generalizes also the main results in [1] and [7], where the L2-regularity was considered. As a consequence of our main result, we give sufficient conditions for fa1,...,ap to be in Lq (G, dμG) for all q ge; 1 and for the Fourier series of fa1,...,ap to converge absolutely and uniformly to fa1,...,ap.

اللغة الأصليةEnglish
الصفحات (من إلى)211-222
عدد الصفحات12
دوريةAsian Journal of Mathematics
مستوى الصوت22
رقم الإصدار2
المعرِّفات الرقمية للأشياء
حالة النشرPublished - 2018

ASJC Scopus subject areas

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