Group in which every p-local subgroup is p-solvable

Definition
Let $$G$$ be a finite group and $$p$$ be a prime number. We say that $$G$$ is a group in which every p-local subgroup is p-solvable if every defining ingredient::p-local subgroup of $$G$$ (i.e., the normalizer of any nonidentity $$p$$-subgroup) is a defining ingredient::p-solvable group.