A Perturbative-Based Generalized Series Expansion in Terms of Non-Orthogonal Component Functions

Abstract: In this paper we present a generalized perturbative approximate series expansion in terms of non-orthogonal component functions. The expansion is based on a perturbative formulation where, in the non-orthogonal case, the contribution of a given component function, at each point, in the time domain or frequency in the Fourier domain, is assumed to be perturbed by contributions from the other component functions in the set. In the case of orthogonal basis functions, the formulation reduces to the non-perturbativ… Show more

“…The technique has since been applied to the characterization of neurotransmitter receptor activation [24]. Additional inverse problems in electrophysiology are currently being pursued, including the topic of this paper [25].…”

Perturbation Based Decomposition of sEMG Signals

“…The technique has since been applied to the characterization of neurotransmitter receptor activation [24]. Additional inverse problems in electrophysiology are currently being pursued, including the topic of this paper [25].…”

Perturbation Based Decomposition of sEMG Signals

The Related Properties of Generalized Orthogonal Group in Specific Normed Linear Spaces