Kaptanoǧlu, Hakkı Turgay2016-02-082016-02-0820070022-1236http://hdl.handle.net/11693/23377Carleson and vanishing Carleson measures for Besov spaces on the unit ball of CN are characterized in terms of Berezin transforms and Bergman-metric balls. The measures are defined via natural imbeddings of Besov spaces into Lebesgue classes by certain combinations of radial derivatives. Membership in Schatten classes of the imbeddings is considered too. Some Carleson measures are not finite, but the results extend and provide new insight to those known for weighted Bergman spaces. Special cases pertain to Arveson and Dirichlet spaces, and a unified view with the usual Hardy-space Carleson measures is presented by letting the order of the radial derivatives tend to 0. Weak convergence in Besov spaces is also characterized, and weakly 0-convergent families are exhibited. Applications are given to separated sequences, operators of Forelli-Rudin type, gap series, characterizations of weighted Bloch, Lipschitz, and growth spaces, inequalities of Fejér-Riesz and Hardy-Littlewood type, and integration operators of Cesàro type.EnglishArvesonBerezin transformBergman metricBergman projectionBesovBlochCarleson measureCesàro - type operatorDirichletFejér - RieszForelli - Rudin - type operatorgrowth spaceHardyHardy - Littlewood inequalityLacunary seriesLipschitzSchatten - von Neumann idealSeparated sequenceUltraweak convergenceWeakBergmanArticle10.1016/j.jfa.2006.12.0161096-0783