A stability condition for adaptive recursive second-order polynomial filters

“…As noted, for example, in [19], recursive models (even in the linear case) may be unstable unless the ANC algorithm is carefully designed, by suitably setting the step size or adopting specific algorithmic modifications, such as the introduction of a 1426 D. DELVECCHIO AND L. PIRODDI leakage factor. BIBO stability conditions have been derived for recursive Volterra filters [34], bilinear models [35], second order polynomial models [36,37], recursive FLANN filters [22], essentially relying on the asymptotic stability of the linear submodel and ensuring the boundedness of the nonlinear terms. Interestingly enough, only the former assumption is necessary for recursive FLANN filters, given the specific bounded structure of the nonlinear terms [22].…”

A dual filtering scheme for nonlinear active noise control

“…As noted, for example, in [19], recursive models (even in the linear case) may be unstable unless the ANC algorithm is carefully designed, by suitably setting the step size or adopting specific algorithmic modifications, such as the introduction of a 1426 D. DELVECCHIO AND L. PIRODDI leakage factor. BIBO stability conditions have been derived for recursive Volterra filters [34], bilinear models [35], second order polynomial models [36,37], recursive FLANN filters [22], essentially relying on the asymptotic stability of the linear submodel and ensuring the boundedness of the nonlinear terms. Interestingly enough, only the former assumption is necessary for recursive FLANN filters, given the specific bounded structure of the nonlinear terms [22].…”

A dual filtering scheme for nonlinear active noise control

“…[32], a sufficient, but not necessary, condition to ensure a bounded output requires x(n) to be bounded. Therefore, in nonlinear system identification experiments, the Gaussian input signal is zero-mean Gaussian signal.…”

A hierarchical alternative updated adaptive Volterra filter with pipelined architecture

“…(10) By calling the term on the right of (10), and introducing the 's defined above, we have (11) Since the poles 's are inside the unit circle, by induction on the order of the system, one can easily show that this last expression can also be written as follows [9]:…”

“…In [9], the authors of this letter presented simple sufficient stability conditions for recursive quadratic Volterra filters. In this letter, such stability conditions are extended to the more general recursive Volterra systems of arbitrary order, i.e., the polynomial systems described by the following input-output relationship: (1) It is shown in this letter that, provided that the stability of the linear part is guaranteed, the output of the filters in (1) is bounded for every if the input signal is bounded by a certain value which can be very efficiently computed from the filter coefficients.…”

On the stability of discrete time recursive Volterra filters