manifold

As nouns the difference between adaptor and manifold

is that adaptor is while manifold is (now historical) a copy made by the manifold writing process.

As an adjective manifold is

various in kind or quality, diverse.

As an adverb manifold is

many times; repeatedly.

As a verb manifold is

to make manifold; multiply.

As nouns the difference between taxonomy and manifold

is that taxonomy is the science or the technique used to make a classification while manifold is (now historical) a copy made by the manifold writing process.

As an adjective manifold is

various in kind or quality, diverse.

As an adverb manifold is

many times; repeatedly.

As a verb manifold is

to make manifold; multiply.

As adjectives the difference between manifold and versatile

is that manifold is various in kind or quality, diverse while versatile is capable of doing many things competently.

As a noun manifold

is a copy made by the manifold writing process.

As an adverb manifold

is many times; repeatedly.

As a verb manifold

is to make manifold; multiply.

In mathematics|lang=en terms the difference between topology and manifold

is that topology is (mathematics) a collection τ'' of subsets of a set ''x'' such that the empty set and ''x'' are both members of ''τ'' and ''τ is closed under arbitrary unions and finite intersections while manifold is (mathematics) a topological space that looks locally like the "ordinary" euclidean space $\backslash mathbb\{r\}^n$ and is hausdorff.

As nouns the difference between topology and manifold

is that topology is (mathematics) a branch of mathematics studying those properties of a geometric figure or solid that are not changed by stretching, bending and similar homeomorphisms while manifold is (now historical) a copy made by the manifold writing process.

As an adjective manifold is

various in kind or quality, diverse.

As an adverb manifold is

many times; repeatedly.

As a verb manifold is

to make manifold; multiply.

In mathematics|lang=en terms the difference between manifold and manifoldness

is that manifold is (mathematics) a topological space that looks locally like the "ordinary" euclidean space $\backslash mathbb\{r\}^n$ and is hausdorff while manifoldness is (mathematics) a generalized concept of magnitude.

As nouns the difference between manifold and manifoldness

is that manifold is (now historical) a copy made by the manifold writing process while manifoldness is the quality of being manifold, diversity.

As an adjective manifold

is various in kind or quality, diverse.

As an adverb manifold

is many times; repeatedly.

As a verb manifold

is to make manifold; multiply.

In mathematics|lang=en terms the difference between manifold and metriplectic

is that manifold is (mathematics) a topological space that looks locally like the "ordinary" euclidean space $\backslash mathbb\{r\}^n$ and is hausdorff while metriplectic is (mathematics) describing a structure, on a smooth manifold, that consists of a pair of tensors: a skew-symmetric poisson tensor and a symmetric metric tensor.

As adjectives the difference between manifold and metriplectic

is that manifold is various in kind or quality, diverse while metriplectic is (mathematics) describing a structure, on a smooth manifold, that consists of a pair of tensors: a skew-symmetric poisson tensor and a symmetric metric tensor.

As a noun manifold

is (now historical) a copy made by the manifold writing process.

As an adverb manifold

is many times; repeatedly.

As a verb manifold

is to make manifold; multiply.

In mathematics|lang=en terms the difference between manifold and quasitoric

is that manifold is (mathematics) a topological space that looks locally like the "ordinary" euclidean space $\backslash mathbb\{r\}^n$ and is hausdorff while quasitoric is (mathematics) describing a smooth 2n''-dimensional manifold that admits a smooth, locally standard action of an ''n''-dimensional torus, with orbit space an ''n -dimensional simple convex polytope.

As adjectives the difference between manifold and quasitoric

is that manifold is various in kind or quality, diverse while quasitoric is (mathematics) describing a smooth 2n''-dimensional manifold that admits a smooth, locally standard action of an ''n''-dimensional torus, with orbit space an ''n -dimensional simple convex polytope.

As a noun manifold

is (now historical) a copy made by the manifold writing process.

As an adverb manifold

is many times; repeatedly.

As a verb manifold

is to make manifold; multiply.

In mathematics|lang=en terms the difference between manifold and supergeometry

is that manifold is (mathematics) a topological space that looks locally like the "ordinary" euclidean space $\backslash mathbb\{r\}^n$ and is hausdorff while supergeometry is (mathematics) a differential geometry of modules over graded commutative algebras, supermanifolds and graded manifolds.

As nouns the difference between manifold and supergeometry

is that manifold is (now historical) a copy made by the manifold writing process while supergeometry is (mathematics) a differential geometry of modules over graded commutative algebras, supermanifolds and graded manifolds.

As an adjective manifold

is various in kind or quality, diverse.

As an adverb manifold

is many times; repeatedly.

As a verb manifold

is to make manifold; multiply.

In mathematics terms the difference between manifold and varifold

is that manifold is a topological space that looks locally like the "ordinary" Euclidean space $\backslash mathbb\{R\}^n$ and is Hausdorff while varifold is a certain generalization of a differentiable manifold.

As nouns the difference between manifold and varifold

is that manifold is a copy made by the manifold writing process while varifold is a certain generalization of a differentiable manifold.

As an adjective manifold

is various in kind or quality, diverse.

As an adverb manifold

is many times; repeatedly.

As a verb manifold

is to make manifold; multiply.