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subbundle

Terms vs Subbundle - What's the difference?

terms | subbundle |


As nouns the difference between terms and subbundle

is that terms is while subbundle is (mathematics) a collection of linear subspaces of the fibers vx'' of ''v'' at ''x'' in ''x'' (where ''v'' is a vector bundle and ''x a topological space), that make up a vector bundle in their own right.

Fiber vs Subbundle - What's the difference?

fiber | subbundle |


In mathematics|lang=en terms the difference between fiber and subbundle

is that fiber is (mathematics) the preimage of a given point in the range of a map while subbundle is (mathematics) a collection of linear subspaces of the fibers vx'' of ''v'' at ''x'' in ''x'' (where ''v'' is a vector bundle and ''x a topological space), that make up a vector bundle in their own right.

As nouns the difference between fiber and subbundle

is that fiber is (countable) a single elongated piece of a given material, roughly round in cross-section, often twisted with other fibers to form thread while subbundle is (mathematics) a collection of linear subspaces of the fibers vx'' of ''v'' at ''x'' in ''x'' (where ''v'' is a vector bundle and ''x a topological space), that make up a vector bundle in their own right.

Subspace vs Subbundle - What's the difference?

subspace | subbundle |


In mathematics|lang=en terms the difference between subspace and subbundle

is that subspace is (mathematics) a subset of a space which is a space in its own right while subbundle is (mathematics) a collection of linear subspaces of the fibers vx'' of ''v'' at ''x'' in ''x'' (where ''v'' is a vector bundle and ''x a topological space), that make up a vector bundle in their own right.

As nouns the difference between subspace and subbundle

is that subspace is (mathematics) a subset of a space which is a space in its own right or subspace can be (bdsm) the psychological state of the submissive or "bottom" during sadomasochistic activity while subbundle is (mathematics) a collection of linear subspaces of the fibers vx'' of ''v'' at ''x'' in ''x'' (where ''v'' is a vector bundle and ''x a topological space), that make up a vector bundle in their own right.

Linear vs Subbundle - What's the difference?

linear | subbundle |


As an adjective linear

is linear (in mathematics, of first-degree polynomial).

As a noun subbundle is

(mathematics) a collection of linear subspaces of the fibers vx'' of ''v'' at ''x'' in ''x'' (where ''v'' is a vector bundle and ''x a topological space), that make up a vector bundle in their own right.