Triangular derivations related to problems on affine 𝑛-space

Abstract: Abstract. This paper studies the Cancellation Problem, the Embedding Problem, and the Linearization Problem. It shows how these problems can be related to a special class of locally nilpotent derivations.

“…Added in Proof. The author would like to express his thanks to Professor Michiel de Bondt, who informed the candidate counterexample [5] to the author. The author wonders why Conjecture E has been left unsettled for more than ten years.…”

“…If Conjecture E is affirmative, it gives a negative answer to the Cancellation Problem and to the Linearization Problem, and shows that Shastri's embedding is indeed a counterexample to the Embedding Problem and the A n -Fibration Problem (n ≥ 3) over a line A 1 C . However, by The Main Result 2, then they are also still open by [5].…”

“…which is easily seen to be a locally nilpotent derivation on A and has a slice s [5] but A D ∼ =C C [4] . This conjecture is equivalent to the following conjecture.…”

Note on the candidate counter-example in the cancellation problem for affine spaces posed by Arno Van den Essen

“…Added in Proof. The author would like to express his thanks to Professor Michiel de Bondt, who informed the candidate counterexample [5] to the author. The author wonders why Conjecture E has been left unsettled for more than ten years.…”

“…If Conjecture E is affirmative, it gives a negative answer to the Cancellation Problem and to the Linearization Problem, and shows that Shastri's embedding is indeed a counterexample to the Embedding Problem and the A n -Fibration Problem (n ≥ 3) over a line A 1 C . However, by The Main Result 2, then they are also still open by [5].…”

“…which is easily seen to be a locally nilpotent derivation on A and has a slice s [5] but A D ∼ =C C [4] . This conjecture is equivalent to the following conjecture.…”

Note on the candidate counter-example in the cancellation problem for affine spaces posed by Arno Van den Essen

“…. ., X n ] be a polynomial ring over a field K. A natural problem in commutative algebra and algebraic geometry is to understand the group GA n (K) of automorphisms of K[X] preserving K. There are various long-standing open problems and conjectures in affine algebraic geometry concerning polynomial rings and their automorphisms (see [10], [11] and [15] for more details). Below we mention a few of the most famous ones.…”

Linearized polynomial maps over finite fields

“…One of the most fundamental questions in studying problems on affine n-space is the following : given a polynomial F in n variables over a field K, how can one decide if F is a coordinate ? Related problems are the Abhyankar-Sathaye Conjecture, the Cancellation Problem, the Jacobian Conjecture and Linearization Conjectures (see [10], [9] and [7] for more details). In case n = 2 this problem was solved by Ch §dzynski and Krasinski in [3] and by the second author in [8]; in fact, in the last paper also an algorithm was given to compute a mate of F. However the case n > 3 remains open.…”

An algorithm to find a coordinate’s mate