nilmanifold

As nouns the difference between terms and nilmanifold

is that terms is while nilmanifold is (mathematics) a quotient space of a nilpotent lie group modulo a closed subgroup, or (equivalently) a homogeneous space with a nilpotent lie group acting transitively on it.

As an adjective transitive

is making a (l) or passage.

As a noun nilmanifold is

(mathematics) a quotient space of a nilpotent lie group modulo a closed subgroup, or (equivalently) a homogeneous space with a nilpotent lie group acting transitively on it.

As nouns the difference between subgroup and nilmanifold

is that subgroup is a group within a larger group; a group whose members are some, but not all, of the members of a larger group while nilmanifold is (mathematics) a quotient space of a nilpotent lie group modulo a closed subgroup, or (equivalently) a homogeneous space with a nilpotent lie group acting transitively on it.

As a verb subgroup

is to divide or classify into subgroups.

As a verb modulo

is .

As a noun nilmanifold is

(mathematics) a quotient space of a nilpotent lie group modulo a closed subgroup, or (equivalently) a homogeneous space with a nilpotent lie group acting transitively on it.

In mathematics|lang=en terms the difference between nilpotent and nilmanifold

is that nilpotent is (mathematics) describing an element of a ring, for which there exists some positive integer n such that xⁿ = 0 while nilmanifold is (mathematics) a quotient space of a nilpotent lie group modulo a closed subgroup, or (equivalently) a homogeneous space with a nilpotent lie group acting transitively on it.

As an adjective nilpotent

is (mathematics) describing an element of a ring, for which there exists some positive integer n such that xⁿ = 0.

As a noun nilmanifold is

(mathematics) a quotient space of a nilpotent lie group modulo a closed subgroup, or (equivalently) a homogeneous space with a nilpotent lie group acting transitively on it.