# Category:Binary operations

Computing portal |

Here is a list of articles in the Binary operations category of the Computing portal that unifies foundations of mathematics and computations using computers. This category is for internal and external **binary operations**, functions, operators, actions, and constructions, as well as topics concerning such operations. Associative binary operations may also be extended to higher arities.

## Subcategories

This category has the following 7 subcategories, out of 7 total.

### B

### D

### L

### M

## Pages in category "Binary operations"

The following 95 pages are in this category, out of 95 total.

- Binary operation
*(computing)*

### *

- Absorbing element
*(computing)* - Alternativity
*(computing)* - Anticommutative property
*(computing)* - Anticommutativity
*(computing)* - Associative property
*(computing)* - Commutative property
*(computing)* - Distributive property
*(computing)* - Identity element
*(computing)* - Inverse element
*(computing)* - Power associativity
*(computing)*

### A

- Addition
*(computing)* - Proofs involving the addition of natural numbers
*(computing)*

### B

- Band sum
*(computing)* - Barrel shifter
*(computing)* - Box topology
*(computing)*

### C

- Cap product
*(computing)* - Carry-less product
*(computing)* - Cartesian product
*(computing)* - Circular convolution
*(computing)* - Commutator
*(computing)* - Complement (set theory)
*(computing)* - Composition of relations
*(computing)* - Connected sum
*(computing)* - Convolution
*(computing)* - Courant bracket
*(computing)* - Covariance operator
*(computing)* - Cross product
*(computing)* - Cup product
*(computing)*

### D

- DE-9IM
*(computing)* - Dirichlet convolution
*(computing)* - Discrete logarithm
*(computing)* - Division (mathematics)
*(computing)* - Dot product
*(computing)*

### E

- Elvis operator
*(computing)* - Exponentiation
*(computing)* - Ext functor
*(computing)* - External (mathematics)
*(computing)*

### F

- Frölicher–Nijenhuis bracket
*(computing)* - Function composition
*(computing)*

### G

- Graph product
*(computing)*

### I

- Icosian calculus
*(computing)* - Idempotence
*(computing)* - Intersection
*(computing)* - Intersection (set theory)
*(computing)* - Iterated binary operation
*(computing)*

### J

- Join (topology)
*(computing)* - Join and meet
*(computing)*

### L

- Lagrange bracket
*(physics)* - Lie bracket of vector fields
*(computing)* - Light's associativity test
*(computing)* - Logarithm
*(computing)* - Logic alphabet
*(computing)* - Logical consequence
*(computing)* - Lulu smoothing
*(computing)*

### M

- Magma (algebra)
*(computing)* - Matrix addition
*(computing)* - Frobenius inner product
*(computing)* - Matrix multiplication
*(computing)* - Mean operation
*(computing)* - Mediant (mathematics)
*(computing)* - Minkowski addition
*(computing)* - Modular multiplicative inverse
*(computing)* - Modulo operation
*(computing)* - Multiplication
*(computing)*

### N

- Negacyclic convolution
*(computing)* - Nijenhuis–Richardson bracket
*(computing)* - Nth root
*(computing)* - Null coalescing operator
*(computing)*

### O

- Outer product
*(computing)*

### P

- Parallel (operator)
*(computing)* - Pentation
*(computing)* - Pointwise product
*(computing)* - Poisson bracket
*(physics)* - Product of group subsets
*(computing)* - Product ring
*(computing)* - Product topology
*(computing)* - Products in algebraic topology
*(computing)* - Pythagorean addition
*(computing)*

### Q

- Quasi-commutative property
*(computing)*

### R

- Relational operator
*(computing)* - Replacement product
*(computing)*

### S

- Schouten–Nijenhuis bracket
*(computing)* - Seven-dimensional cross product
*(computing)* - Smash product
*(computing)* - Subtraction
*(computing)* - Symmetric difference
*(computing)*

### T

- Tensor product
*(computing)* - Tensor product of modules
*(computing)* - Tetration
*(computing)* - Tor functor
*(computing)*

### U

- Union (set theory)
*(computing)*

### V

- Vector addition
*(computing)*

### W

- Wedge sum
*(computing)* - Wreath product
*(computing)*