Exponential Formulas for the Jacobians and Jacobian Matrices of Analytic Maps
Abstract
Let F=(F1, F2, ... Fn) be an n-tuple of formal power series in n variables of the form F(z)=z+ O(|z|2). It is known that there exists a unique formal differential operator A=Σi=1n ai(z) zi such that F(z)=exp (A)z as formal series. In this article, we show the Jacobian J(F) and the Jacobian matrix J(F) of F can also be given by some exponential formulas. Namely, J(F)= (A+ A)· 1, where A(z)= Σi=1n ai zi(z), and J(F)=(A+RJa)· In× n, where In× n is the identity matrix and RJa is the multiplication operator by Ja for the right. As an immediate consequence, we get an elementary proof for the known result that J(F) 1 if and only if A=0. Some consequences and applications of the exponential formulas as well as their relations with the well known Jacobian Conjecture are also discussed.
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