作者welly (insight)
看板Economics
标题Re: [请益] Walrasian budget set 的 Convexity 问题
时间Tue Jan 22 00:30:06 2008
※ 引述《washburn (Just a game)》之铭言:
By definition, If X is a convex set, then
: x'' = alpha*x + (1-alpha)*x' belongs to LR+, for any alpha belongs to [0,1].
To show B{p,w} is convex, for any a, b belong to B{p,w},
we need to show that c= alpha*a + (1-alpha)*b also belongs to B{p,w}.
First, c belongs to LR is obvious.
Second, p*c=p*(alpha*a + (1-alpha)*b)
=alpha*p*a+(1-alpha)*p*b
<=alpha*w + (1-alpha)*w
<= w
By definition, B{p,w} is a convex set.
Q.E.D.
: Walrasian budget set:B {p,w} = {x belongs to LR: p*x <= w}。
: 请问,为什麽在 X 为 convex 时,B {p,w} 也是 convex?
--
※ 发信站: 批踢踢实业坊(ptt.cc)
◆ From: 122.124.125.58
※ 编辑: welly 来自: 122.124.125.58 (01/22 00:31)
1F:推 washburn:你好快! 211.77.241.2 01/22 00:33