Open AccessAnalytical Foundations of Volterra Series
Author(s) -
Stephen Boyd,
Leon O. Chua,
C. Desoer
Publication year - 1984
Publication title -
ima journal of mathematical control and information
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.385
H-Index - 37
eISSN - 1471-6887
pISSN - 0265-0754
DOI - 10.1093/imamci/1.3.243
Subject(s) - volterra series , series (stratigraphy) , volterra equations , operator (biology) , mathematics , taylor series , volterra integral equation , mathematical proof , complement (music) , calculus (dental) , nonlinear system , mathematical analysis , integral equation , paleontology , physics , quantum mechanics , medicine , biochemistry , chemistry , geometry , dentistry , repressor , complementation , gene , transcription factor , biology , phenotype
In this paper we carefully study the analysis involved with Volterra series. We address system-theoretic issues ranging from bounds on the gain and incremental gain of Volterra series operators to the existence of Volterra series operator inverses, and mathematical topics such as the relation between Volterra series operators and Taylor series. The proofs are complete, and use only the basic facts of analysis. We prove a general Steady-state theorem for Volterra series operators, and then establish a general formula for the spectrum of the output of a Volterra series operator in terms of the spectrum of a periodic input. This paper is meant to complement recent work on Volterra series expansions for dynamical systems.
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