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In that game, if you remember what the best responses looked like, they looked like this where this was the effort of Player 1; this was the effort of Player 2.
不知道你们还记不记得最佳对策是什么了,这条线代表参与人1的付出,这条代表参与人2的付出
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So the line I've just drawn is the best response for Player I as it depends on Player II's choice.
我画的这条线表明参与人I的最佳对策,取决于参与人II的策略
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And there are different choices here 1, 2, 3, and 4 for Player I, and here's the 45o line.
参与人I有1一直到4的可选策略,这条是45°线
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This is the payoff to Player I of choosing Middle against Left.
这条线表示参与人I在对手选右时,选择左而获得的收益
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So here's the straight line, and this line is the expected payoff to Player I from choosing Down as it depends on the probability that the other person chooses Right, and then once again, we can write down the equation.
这就是第三条直线了,它表示参与人I选择下获得的收益,是另一个参与人,选右概率的一个函数,对于这一条直线,我们依然能够给出方程式
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This is the payoff to Player I of choosing Middle against Right, and the line in between, this line here, is the expected payoff to Player I of choosing Middle as a function of the probability that other people choose Right.
这条表示对手选右时参与人选中的收益,两个端点中间的线段部分,表示参与人I选右的预期收益,它是对手选右概率的一个方程
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So this the best response for Player II for every possible choice of Player I, and just to make sure we understand it, what this blue line tells me is you give me an S1, an effort level of Player I, I read up to the blue line and go across and that tells me Player II's best response.
这就是在任意参与人I的可选策略下,参与人II的最佳对策,为了让大家都明白,这条蓝色线表示给定一个S1,即参与人I的付出,通过查找蓝色的线,可以得出参与人II的最佳对策
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