Inner-Lazard Lie ring: Difference between revisions

Revision as of 22:36, 4 May 2012

Definition

An inner-Lazard Lie ring is a Lie ring $L$ such that there exists a natural number $c$ with both the following two properties:

No.	Shorthand for property	Explanation
1	The additive group is a powered group for the set of all primes strictly less than $c$ .	For any prime number $p<c$ , and any element $a\in L$ , there is a unique element $b\in L$ such that $pb=a$ .
2	The 3-local nilpotency class is at most $c$ .	For any subset of $L$ of size at most three, the subring of $L$ generated by that subset is a nilpotent Lie ring of nilpotency class at most $c$ .

Condition (1) gets more demanding (i.e., stronger, so satisfied by fewer groups) as $c$ increases, while condition (2) gets less demanding (i.e., weaker, so satisfied by fewer groups) as we increase $c$ . Thus, a particular value of c may work for a Lie ring but larger and smaller values may not.

p-Lie ring

An inner-Lazard $p$ -Lie ring is a special case of the above, namely a Lie ring $L$ such that:

There is a prime $p$ such that every element of $L$ has order a power of $p$ .
The Lie subring of $L$ generated by any three elements of $L$ is a nilpotent Lie ring of nilpotency class at most $p$ .

@@ Line 6: / Line 6: @@
 ! No. !! Shorthand for property !! Explanation
 |-
-| 1 || The additive group is a [[defining ingredient::powered group for a set of primes|powered group for the set]] of all primes ''strictly less than'' <math>c</math>. || For any prime number <math>p \le c</math>, and any element <math>a \in L</math>, there is a unique element <math>b \in L</math> such that <math>pb = a</math>.
+| 1 || The additive group is a [[defining ingredient::powered group for a set of primes|powered group for the set]] of all primes ''strictly less than'' <math>c</math>. || For any prime number <math>p < c</math>, and any element <math>a \in L</math>, there is a unique element <math>b \in L</math> such that <math>pb = a</math>.
 |-
 | 2 || The [[defining ingredient::local nilpotency class of a Lie ring|3-local nilpotency class]] is at most <math>c</math>. || For any subset of <math>L</math> of size at most three, the subring of <math>L</math> generated by that subset is a [[nilpotent Lie ring]] of nilpotency class at most <math>c</math>.