Give examples of sets X, Y, Z and functions f:X rightarrow Y, g:Y rightarrow Z, so that the composition g circ f:X rightarrow Z is a bijection, although neither f or g it is.

mksfmasterio

mksfmasterio

Answered question

2022-09-04

Discrete Math composition functions
Give examples of sets X, Y, Z and functions f : X Y, g : Y Z, so that the composition g f : X Z is a bijection, although neither f or g it is.

Answer & Explanation

Raina Russo

Raina Russo

Beginner2022-09-05Added 20 answers

Step 1
WLOG we can take Z = X and g f = I d
If you can apply f without "losing information", it's because f is bijective on its image, i.e. injective. Thus take Y bigger than X. Then you just have to left invert f.
Step 2
If you want to take Z X and g f I d, just left compose with a bijection from X to Z.
Teagan Sutton

Teagan Sutton

Beginner2022-09-06Added 12 answers

Explanation:
Let X = Z = { 1 } and Y = { 1 , 2 }. Now take f injective but not surjective: f ( 1 ) = 1. Moreover take g surjective but not injective: g ( 1 ) = g ( 2 ) = 1. Verify that g f : X Z is a bijecton.

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