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I was under the impression that a surjection could exist if |B| > |A|, but I'm not too sure. Can't something like this happen?

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This is not the math SE. Ask here: math.stackexchange.com. –  Chiel92 Jan 28 '13 at 15:03
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BTW, the answer is no, since it's not a function en therefore not a surjection. –  Chiel92 Jan 28 '13 at 15:03

3 Answers 3

I believe that the function is indeed surjective. As long as for every member of your codomain there exists a member in your domain that maps onto it, the function is surjective. A unique member is not a requirement.

Although incomplete, ive always found http://mathsguide.org/surjections.php to be a decent resource for some of these basics.

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You are wrong, since a function must have only one function value for each domain value. –  Chiel92 Dec 31 '13 at 11:37

I stumbled upon this question again, and I thought I'd give a more complete answer.

Functions f: X -> Y must by definition obey the rule that for each x in X there is only one y in Y such that f(x) = y. Your example does not obey this, and therefore is not a function. It follows that it cannot be a surjection.

Your example should be called a relation, rather than a function.

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It's not a function, because you can't have an input pointing to two different results in the codomain

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