As a typical family of mono-component signals, the nonlinear Fourier basis {e(ik theta a(t))}(k is an element of Z), defined by the nontangential boundary value of the Mobius transformation, has attracted much attention in the field of nonlinear and nonstationary signal processing in recent years. In this paper, we establish the Jackson's and Bernstein's theorems for the approximation of functions in X(p)(T), 1 <= p <= infinity, by the nonlinear Fourier basis. Furthermore, the analogous theorems for the approximation of functions in Hardy spaces by the finite Blaschke products are established.

• 出版日期2011-5
• 单位中山大学