A necessary and sufficient condition is obtained for the complex exponential system to be dense in the weighted Banach space L_α~p={f:f_(-∞)~∞|f(t)e^(-α)(t)|~Pdt<∞},where 1(?)p<+∞andα(t)is a nonnegative c...A necessary and sufficient condition is obtained for the complex exponential system to be dense in the weighted Banach space L_α~p={f:f_(-∞)~∞|f(t)e^(-α)(t)|~Pdt<∞},where 1(?)p<+∞andα(t)is a nonnegative continuous function on R.展开更多
A sufficient condition is obtained for the minimality of the complex exponential system E(A, M) = {z^le^λnz: l = 0, 1,,.., mn - 1; n = 1, 2,...} in the Banaeh space La^p consisting of all functions f such that f^...A sufficient condition is obtained for the minimality of the complex exponential system E(A, M) = {z^le^λnz: l = 0, 1,,.., mn - 1; n = 1, 2,...} in the Banaeh space La^p consisting of all functions f such that f^-a ∈ LP(N). Moreover, if the incompleteness holds, each function in the closure of the linear span of exponential system E(A, M) can be extended to an analytic function represented by a Taylor-Dirichlet series.展开更多
基金the National Natural Science Foundation of China(No.10671022)the Research Fund for the Doctoral Program of Higher Education(No.20060027023).
文摘A necessary and sufficient condition is obtained for the complex exponential system to be dense in the weighted Banach space L_α~p={f:f_(-∞)~∞|f(t)e^(-α)(t)|~Pdt<∞},where 1(?)p<+∞andα(t)is a nonnegative continuous function on R.
基金Supported by the National Natural Science Foundation of China (Grant No.10671022)the Research Foundation for Doctor Programme (Grant No.20060027023)
文摘A sufficient condition is obtained for the minimality of the complex exponential system E(A, M) = {z^le^λnz: l = 0, 1,,.., mn - 1; n = 1, 2,...} in the Banaeh space La^p consisting of all functions f such that f^-a ∈ LP(N). Moreover, if the incompleteness holds, each function in the closure of the linear span of exponential system E(A, M) can be extended to an analytic function represented by a Taylor-Dirichlet series.
