Question about using the word unique

  • Context: Undergrad 
  • Thread starter Thread starter Mr Davis 97
  • Start date Start date
Join the discussion
Ask a follow-up here, or get your own question answered by working scientists, mathematicians and engineers — people, not an autocomplete.
Real named experts · corrections over time · the nuance an AI answer skips
6 replies · 1K views
Mr Davis 97
Messages
1,461
Reaction score
44
I am trying to say that an element ##a## is paired with an element ##b## such that ##b## is paired with no other element.

I would like to write this more succinctly by just saying that ##a## is paired with a unique element ##b##. However, it seems that this could also be interpreted as meaning that ##a## is paired with exactly one element ##b##, while not necessarily implying that ##b## is not paired with any other element.

I need to get another opinion on what to do.
 
Mathematics news on Phys.org
So does ##a## is paired with a unique ##b## mean that ##a## is associated with only one element, while ##b## is paired with a unique ##a## means that ##a## is paired with an element ##b## such that ##b## is paired with no other element?
 
Are ##a## and ##b## from different sets?
Can we distinguish ##(a,b)## and ##(b,a)##?
Is ##(a,b) \wedge (a,c)## with ##b \neq c## possible?
Are all ##(a,.)## paired with some element?
Are all ##(.,b)## paired with some element?

I ask in order to find out, whether there can be established a function, or if it is just any relation.
 
fresh_42 said:
Are ##a## and ##b## from different sets?
Can we distinguish ##(a,b)## and ##(b,a)##?
Is ##(a,b) \wedge (a,c)## with ##b \neq c## possible?
Are all ##(a,.)## paired with some element?
Are all ##(.,b)## paired with some element?

I ask in order to find out, whether there can be established a function, or if it is just any relation.
I guess you could say that it is a bijective function from a finite set to itself
 
Mr Davis 97 said:
I guess you could say that it is a bijective function from a finite set to itself
A general one? This is usually called a permutation, and does not have to have clear pairs, because f(f(a)) does not have to be a.