Question

Consider a game in which, simultaneously, player 1 selects a number x and player 2 select a number y, where x and y must be greater than or equal to 0. Player 1's payoff is U1 = 8x - 2xy - x2 and player 2's payoff is U2 = 4by + 2xy - y? The parameter b is privately known to player 2. Player 1 knows only that b = O with probability 1/2 and b = 4 with probability 1/2. In other words, at the beginning of the game, Nature chooses b =0 with probability 1/2 and b = 4 with probability 1/2, and player 2 observes b. Then the players simultaneously select x and y. Note that there are two types of player 2. Let us say that player 2 is the Low type if b = 0 and the High type if b = 4. Let y denote the choice of the Low type and let yhdenote the choice of the high type. This game has a unique (Bayesian) Nash equilibrium. Calculate the equilibrium and report the equilibrium choices xt, yht, and yH. VH=

Answer 1

Player 2 with bao o type ie Low type Uz = 2ay - Y Z May Uz wirt y au, ay L 0 22-2y = x Player 2 with b=4 type in High type U2=1674 +224H-yh Max Ve wort yh Juz =0 ayh 16 +22-2440 Y H = 16+20 * 2 1/2

Player 2 with bao o type ie Low type Uz = 2ay - Y Z May Uz wirt y au, ay L 0 22-2y = x Player 2 with b=4 type in High type U2=1674 +224H-yh Max Ve wort yh Juz =0 ayh 16 +22-2440 Y H = 16+20 * 2 1/2

Νοιω player/ I knows with I probability type -bility the's going to face High type he's going to face Low and 14 / 2 probab- u = 8x-2x 6 Yhtly-22 = 87-24 ((164204) +- ? (~)-22 =84-22 (++2) +- 2 )-a? = 8x-2x (4+2 + 2) - 2² 87-24 ( 4+)-42 x-84-20²-22 11 UF - Bar (why? So his = 0] because duro - 6x=0 y x=0 ato 418 * = 16+213 8. 2/2