Definition:Composition


 * Set Theory:
 * Composition of Mappings
 * Composition of Relations: $\RR_2 \circ \RR_1 = \set {\tuple {x, z}: x \in S_1, z \in S_3: \exists y \in S_2: \tuple {x, y} \in \RR_1 \land \tuple {y, z} \in \RR_2}$


 * Order theory:
 * Definition:Composition of Galois Connections


 * Abstract Algebra:
 * Another word for an operation, usually binary.
 * Composition of Binary Quadratic Forms
 * Definition:Composition Series


 * Category theory:
 * Definition:Composition of Morphisms
 * Definition:Composition of Functors
 * Definition:Composition of Natural Transformations
 * Definition:Composition Functor
 * Composition Functor on Slice Categories
 * Composition Functor on Categories of Subobjects


 * Combinatorics:
 * A $k$-composition of a strictly positive integer $n \in \Z_{>0}$ is an ordered $k$-tuple: $c = \tuple {c_1, c_2, \ldots, c_k}$ such that $c_1 + c_2 + \cdots + c_k = n$ and $\forall i \in \closedint 1 k: c_i \in \Z_{>0}$


 * Euclid:
 * Definition:Composition of Ratio

Also see

 * Definition:Composite
 * Definition:Component
 * Definition:Decomposition