Question: We have three bidders (A, B and C) and three goods (x, y and z). The valuations are: vA(x) = 16 vA(y) = 8 vA(z)
We have three bidders (A, B and C) and three goods (x, y and z). The valuations are: vA(x) = 16 vA(y) = 8 vA(z) = 0 vA(xy) = 32 vA(xz) = 14 vB (x) = 12 vB (y) = 14 vB (z) = 0 vB (xy) = 24 vB (xz) = 10 vC (x) = 4 vC (y) = 6 vC (z) = 20 vC (xz) = 0 vC (xy) = 18 All the valuations that are missing are assumed to be equal to 0 (so for instance we have vA(xyz) = 0, vi() = 0 for any bidder i= A, B, C, etc.). Find the allocation and the price paid by each bidder with the VCG auction
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