Systems of several first-order quadratic recursions whose evolution is easily ascertainable

Abstract

The evolution, as functions of the "ticking time" =0,1,2,..., of the solutions of the system of N quadratic recursions eqnarray* xn( +1) =cn+Σm=1N[ Cnmxm( ) ] +Σm=1N\ dnm[ xm( ) ] 2\ +Σm1>m2=1N[ Dnm1m2xm1( ) xm2( ) ] ~,~~~n=1,2,...,N~, && eqnarray* featuring N+N2+N2+N( N-1) N/2=N( N+1) ( N+2) /2 ( -independent) coefficients cn, Cnm, dnm and Dnm1m2, may be easily ascertained, if these coefficients are given, in terms of N+N2=N( N+1) a priori arbitrary parameters an and bnm, by N( N+1) ( N+2) /2 explicit formulas provided in this paper. Here N is an arbitrary positive integer.

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