cofibration

As nouns the difference between terms and cofibration

is that terms is while cofibration is (mathematics) a particular form of mapping a continuous mapping $i\backslash colon\; a\; \backslash to\; x$, where a'' and ''x'' are topological spaces, is a cofibration if it satisfies the homotopy extension property with respect to all spaces ''y .

Fibration is a related term of cofibration.

As nouns the difference between fibration and cofibration

is that fibration is (algebraic topology) a continuous mapping satisfying the homotopy lifting property with respect to any space while cofibration is (mathematics) a particular form of mapping a continuous mapping $i\backslash colon\; a\; \backslash to\; x$, where a'' and ''x'' are topological spaces, is a cofibration if it satisfies the homotopy extension property with respect to all spaces ''y .

In mathematics|lang=en terms the difference between mapping and cofibration

is that mapping is (mathematics) a function that maps every element of a given set to a unique element of another set; a correspondence while cofibration is (mathematics) a particular form of mapping a continuous mapping $i\backslash colon\; a\; \backslash to\; x$, where a'' and ''x'' are topological spaces, is a cofibration if it satisfies the homotopy extension property with respect to all spaces ''y .

As nouns the difference between mapping and cofibration

is that mapping is the process of making maps while cofibration is (mathematics) a particular form of mapping a continuous mapping $i\backslash colon\; a\; \backslash to\; x$, where a'' and ''x'' are topological spaces, is a cofibration if it satisfies the homotopy extension property with respect to all spaces ''y .

As a verb mapping

is .