Polynomial Maps with strongly nilpotent Jacobian matrix and the Jacobian Conjecture
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Abstract Let H : k n → k n be a polynomial map. It is shown that the Jacobian matrix JH is strongly nilpotent if and only if JH is linearly triangularizable if and only if the polynomial map F = X + H is linearly triangularizable. Furthermore it is shown that for such maps F , sF is linearizable for almost all s ∈ k (except a finite number of roots of unity).
[1] G. Meisters. Polyomorphisms Conjugate to Dilations , 1995 .
[2] A. Essen. A Counterexample to a Conjecture of Meisters , 1995 .
[3] H. Bass,et al. The Jacobian conjecture: Reduction of degree and formal expansion of the inverse , 1982 .
[4] A. V. Yagzhev. Keller's problem , 1980 .
[5] C. Olech,et al. Strong nilpotence holds in dimensions up to five only , 1991 .
[6] B. Deng,et al. Conjugation for polynomial mappings , 1995 .