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union

Set of all elements, rows, or columns of two arrays, without duplicates

Syntax

[v, ka, kb] = union(a, b)
[v, ka, kb] = union(a, b, orient)

Arguments

a, b
arrays of booleans, numbers, or text. Sparse boolean or numerical matrices are accepted. The types of a and of b can be distinct but compatible for concatenation.

orient
orientation of the processing:
  • 1 or "r": the union is performed over the rows.
  • 2 or "c": the union is performed over the columns.

v
row vector, or matrix. v's data type is the type of [a(:) ; b(:)]'s result.

ka
row vector of integers: Indices in a of v elements/rows/columns coming from a.

kb
row vector of integers: Indices in b of v remaining elements/rows/columns coming from b.

Description

union(a,b) returns a sorted row vector which retains the unique entries of [a(:) ; b(:)].

union(a,b,"r") or union(a,b,1)returns the matrix formed by the union of the unique rows of a and b sorted in lexicographic ascending order. In this case matrices a and b must have the same number of columns.

union(a,b,"c") or union(a,b,2)returns the matrix formed by the union of the unique columns of a and b sorted in lexicographic ascending order. In this case matrices a and b must have the same number of rows.

[v,ka,kb]=union(a,b) also returns index vectors ka and kb such that v is a sorted combination of the entries a(ka) and b(kb).

Examples

A = [6  7  6 ; 5  8  3 ];
B = [1  7  1  0  6 ];

union(A, B)
[u, ka, kb] = union(A, B)
--> union(A, B)
 ans  =
   0.   1.   3.   5.   6.   7.   8.

--> [u, ka, kb] = union(A, B)
 u  =
   0.   1.   3.   5.   6.   7.   8.
 ka  =
   6.   2.   1.   3.   4.
 kb  =
   4.   1.

A = ["a" "b" "a" "c" "c" "b"
     "b" "c" "a" "b" "c" "c" ];
B = ["b" "a" "c" "c" "b" "a"
     "a" "c" "b" "b" "b" "b" ];

[U, ka, kb] = union(A, B, "c")
--> [U, ka, kb] = union(A, B, "c")
 U  =
  "a"  "a"  "a"  "b"  "b"  "b"  "c"  "c"
  "a"  "b"  "c"  "a"  "b"  "c"  "b"  "c"

 ka  =
   3.   1.   2.   4.   5.

 kb  =
   2.   1.   5.

[F, T] = (%f, %t);
A = sparse([T T F T F T ; F F F F T T ; T F F F F T ]); full(A)
B = sparse([F F T T F F ; T T T T T T ; T F T T T F ]); full(B)

[U, ka, kb] = union(A, B, "c");
issparse(U)
full(U), ka, kb
--> A = sparse([T T F T F T ; F F F F T T ; T F F F F T ]); full(A)
 ans  =
  T T F T F T
  F F F F T T
  T F F F F T

--> B = sparse([F F T T F F ; T T T T T T ; T F T T T F ]); full(B)
 ans  =
  F F T T F F
  T T T T T T
  T F T T T F

--> [U, ka, kb] = union(A, B, "c");
--> issparse(U)
 ans  =
  T

--> full(U), ka, kb
 ans  =
  F F F T T T
  F T T F F T
  F F T F T T

 ka  =
   3.   5.   2.   1.   6.
 kb  =
   1.

See also

  • brackets — Concatenation. Recipients of an assignment. Results of a function
  • unique — extracts (and sorts) distinct elements, rows or columns of a matrix

History

VersionDescription
6.1.0 Extension to boolean matrices.
6.1.1 Extension to sparse boolean, sparse real, and sparse complex matrices.
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<< setdiff Set operations unique >>

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Last updated:
Mon Jun 17 17:49:15 CEST 2024