Rigidity and triangularity of an exponential map
Abstract
Let k be a field of arbitrary characteristic, A be a domain and K=frac(A). Then (1) All exponential maps of k[3] are rigid, and we give a necessary and sufficient condition for the triangularity of δ ∈ EXP(k[3]). (2) If δ ∈ EXP(A[3]) such that rank(δ)=rank(δK), then δ is rigid and we give a necessary and sufficient condition for the triangularity of δ. When k is of zero characteristic, (1) is due to DD and (2) is due to KL.
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