On Positive Law Problems in the Class of Locally Graded Groups

Abstract: We consider five known problems, show that three of them are equivalent, and all of them have an affirmative answer in the class of locally graded groups. Outside of this class a counterexample is known to only one problem.

“…However, the answer is positive for a large class of groups: Burns and Medvedev proved in [2] that a locally graded group satisfying a positive law is nilpotent-by-(locally finite of finite exponent). (See also the paper [1] by Bajorska and Macedońska. ) An interesting question regarding positive laws is the following: under what conditions does a positive law on a set T of generators of a group G imply a (possibly different) positive law on the whole of G?…”

Positive Laws on Large Sets of Generators: Counterexamples for Infinitely Generated Groups

“…However, the answer is positive for a large class of groups: Burns and Medvedev proved in [2] that a locally graded group satisfying a positive law is nilpotent-by-(locally finite of finite exponent). (See also the paper [1] by Bajorska and Macedońska. ) An interesting question regarding positive laws is the following: under what conditions does a positive law on a set T of generators of a group G imply a (possibly different) positive law on the whole of G?…”

Positive Laws on Large Sets of Generators: Counterexamples for Infinitely Generated Groups

“…Proof It is shown in [2], that every collapsing LG-group satisfies a positive law, which implies by Theorem 2, that G is nilpotent-by-'locally finite of finite exponent', and proves the "if" part. The "only if" part follows because nilpotent-by-'locally finite of finite exponent' groups are LG-groups.…”

On difficult problems and locally graded groups

Positive laws on word values in residually-p groups