Consider a committee which must select one alternative from a set of
three or more alternatives. Committee members each cast a ballot which
the voting procedure counts. The voting procedure is strategy-proof if
it always induces every committee member to cast a ballot revealing his
preference. I prove three theorems. First, every strategy-proof voting
procedure is dictatorial. Second, this paper's strategy-proofness
condition for voting procedures corresponds to Arrow's rationality,
independence of irrelevant alternatives, non-negative response, and
citizens' sovereignty conditions for social welfare functions. Third,
Arrow's general possibility theorem is proven in a new manner.