Question

Polynomial maps from the same complex vector space to itself have this property according to the Ax–Grothendieck theorem. A proof technique named for this property was used by Heinz Prüfer to prove Cayley’s formula, which counts the number of spanning trees of a complete graph. One of these functions exist between the rationals and the integers, meaning that they are both (*) countably infinite, and have the same cardinality. (10[1])A homomorphism with this property is an isomorphism. Functions with this property of a set to itself are also permutations. Functions that are both injective and surjective also have this property. Inverse exists for functions with, for 10 points, what property of a function, in which one element of the domain is paired with exactly one element of the codomain. ■END■

ANSWER: bijective [or bijection; or one to one correspondence; accept injective and surjective before mentioned; accept “one to one” in place of “injective”; accept “onto” in place of “surjective”; reject partial answers]
<Leo Law, Other Science>
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Buzzes

PlayerTeamOpponentBuzz PositionValue
Michał GerasimiukStanfordBerkeley A6710

Summary

2023 Penn Bowl (Norcal)10/28/2023Y1100%0%0%67.00