[摘要] The following basic results on infinite locally finite subgroups of a free m-generator Burnside group B(m, n) of even exponent n, where m > 1 and n greater than or equal to 2(48), n is divisible by 2(9), are obtained: A clear complete description of all infinite groups that are embeddable in B(m, n) as (maximal) locally finite subgroups is given. Any infinite locally finite subgroup L of B(m, n) is contained in a unique maximal locally finite subgroup, while any finite a-subgroup of B(m, n) is contained in continuously many pairwise nonisomorphic maximal locally finite subgroups. In addition, L is locally conjugate to a maximal locally finite subgroup of B(m, n). To prove these and other results, centralizers of subgroups in B(m, n) are investigated. For example, it is proven that the centralizer of a finite 2-subgroup of B(m, n) contains a subgroup isomorphic to a free Burnside group B(infinity,n) of countably infinite rank and exponent n; the centralizer of a finite non-a-subgroup of B(m, n) or the centralizer of a nonlocally finite subgroup of B(m, n) is always finite; the centralizer of a subgroup T is infinite if and only if T is a locally finite 2-group. (C) 1997 Academic Press.