Isoclinic Lie rings

From Groupprops

Definition

Two Lie rings are said to be isoclinic if there is an isoclinism of Lie rings between them.

Facts

Lie rings isoclinic to the trivial ring

A Lie ring is isoclinic to the trivial Lie ring if and only if it is an abelian Lie ring.

Subrings isoclinic to each other

Any subring of a Lie ring is isoclinic to its product with the center of the ring. In particular, this means that any two subrings having nonempty intersections with the same cosets of the center are isoclinic to each other. It also implies that any cocentral subring of a Lie ring is isoclinic to the whole Lie ring.

Invariants under isoclinism

Simple invariants

Probabilistic invariants