Inner derivation from Lazard ideal is exponentiable

Statement

Suppose ${\displaystyle L}$ is a Lie ring and ${\displaystyle I}$ is a Lazard ideal in ${\displaystyle L}$. Then, for any ${\displaystyle u\in I}$, the inner derivation of ${\displaystyle L}$ arising via the adjoint action of ${\displaystyle u}$ is an exponentiable derivation of ${\displaystyle L}$.

Proof

Given: Lie ring ${\displaystyle L}$, ideal ${\displaystyle I}$ of ${\displaystyle L}$. A natural number ${\displaystyle c}$ such that the 3-local nilpotency class of ${\displaystyle I}$ is at most ${\displaystyle c}$ and ${\displaystyle I}$ is powered over all primes less than or equal to ${\displaystyle c}$. An element ${\displaystyle u\in I}$.

To prove: The adjoint map ${\displaystyle \operatorname {ad} u=x\mapsto [u,x]}$ is an exponentiable derivation of ${\displaystyle L}$.

Proof: The current version of the proof is incomplete and inaccurate, some fixing needs to be done

Step no.	Assertion/construction	Facts used	Given data used	Previous steps used	Explanation
1	${\displaystyle \operatorname {ad} u}$ is ${\displaystyle (c+1)}$-step-nilpotent, i.e., ${\displaystyle (\operatorname {ad} u)^{c+1}=0}$.		The 3-local nilpotency class of ${\displaystyle I}$ is at most ${\displaystyle c}$ and ${\displaystyle I}$ is an ideal of ${\displaystyle L}$.		[SHOW MORE] For ${\displaystyle x\in L}$, let ${\displaystyle v=[u,x]}$. Then, ${\displaystyle v\in I}$ because ${\displaystyle I}$ is an ideal. Now, ${\displaystyle (\operatorname {ad} u)^{c+1}(x)=(\operatorname {ad} u)^{c}(v)=[u,[u,\dots ,u,[u,v]\dots ]]}$. This Lie bracket is completely inside ${\displaystyle I}$, has length ${\displaystyle c+1}$, and involves two elements ${\displaystyle u,v}$ of ${\displaystyle I}$. The 3-local class condition tells us that the value must be zero.
2	${\displaystyle \operatorname {ad} u}$ is ${\displaystyle (c+1)}$-step-binilpotent, i.e., ${\displaystyle [(\operatorname {ad} u)^{i}(x),(\operatorname {ad} u)^{j}(y)]=0}$ for all ${\displaystyle x,y\in L}$ and all positive integers ${\displaystyle i,j}$ such that ${\displaystyle i+j\geq c+1}$.		The 3-local nilpotency class of ${\displaystyle I}$ is at most ${\displaystyle c}$, and ${\displaystyle I}$ is an ideal of ${\displaystyle L}$.		[SHOW MORE] For ${\displaystyle x,y\in L}$, let ${\displaystyle v=[u,x]}$ and ${\displaystyle w=[u,y]}$. We get that ${\displaystyle v,w\in I}$ because ${\displaystyle I</mth>isanideal.Wecanrewrite<math>[(\operatorname {ad} u)^{i}(x),(\operatorname {ad} u)^{j}(y)]=[(\operatorname {ad} u)^{i-1}(v),(\operatorname {ad} u)^{j-1}(w)]}$