论文信息 - Uniform approximation with doubly finite Volterra series

Uniform approximation with doubly finite Volterra series

The assumption that a system possesses a certain discrete-time Volterra series representation frequently forms the basis for studies in the areas of signal processing and communication theory. A further assumption often made, always without discussion, is that the representation can be suitably approximated by a corresponding 'double finite' series. It is shown that, for a very large class of nonlinear discrete-time systems, such doubly finite approximations exist in the sense of uniform approximation on a ball of bounded inputs. Several additional results are also given. These concern, for example, asymptotic properties of the expansions. The results provide a more firm foundation for applications involving Volterra series. >

Irwin W. Sanderg

[1] I. W. Sandberg. Approximation theorems for discrete-time systems , 1991 .

[2] Irwin W. Sandberg,et al. Iteration and functional expansions , 1984 .

[3] Irwin W. Sandberg,et al. Structure theorems for nonlinear systems , 1991, Multidimens. Syst. Signal Process..

[4] Irwin W. Sandberg. Expansions for discrete-time nonlinear systems , 1983 .

[5] I. Sandberg. On Volterra expansions for time-varying nonlinear systems , 1983 .

[6] I. Sandberg,et al. A perspective on system theory , 1984 .

[7] I. Sandberg. The mathematical foundations of associated expansions for mildly nonlinear systems , 1983 .

[8] Stephen P. Boyd,et al. Analytical Foundations of Volterra Series , 1984 .