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Andi120 · 2023年02月25日

使用forward rate是一种近似还是准确的方法?有没有什么隐藏的assumption在这个方法里面?

NO.PZ2018123101000086

问题如下:

Exhibit 1 shows par, spot, and one-year forward rates.

Bond 4 is a fixed-Rate Bonds of Alpha Corporation, with 1.55% annual coupon and callable at par without any lockout periods. The bond maturity is 3 years.

Based on the information above, the value of the embedded option in Bond 4 is closest to:

选项:

A.

nil.

B.

0.1906.

C.

0.3343.

解释:

C is correct.

考点:考察对含权债券的理解

解析:

债券4是可Callable。其价值为:

Value of callable bond = value of straight bond – value of call option on bond

因此,Embedded call option的价值为:

Value of call option on bond = Value of straight bond – Value of callable bond

利用Spot rate对该Straight bond进行定价为:

1.55(1.0100)1+1.55(1.012012)2+101.55(1.012515)3=100.8789\frac{1.55}{{(1.0100)}^1}+\frac{1.55}{{(1.012012)}^2}+\frac{101.55}{{(1.012515)}^3}=100.8789

而Callable bond的定价需要使用1-year forward rate,将债券的现金流从最后一期开始,依次向前一个节点折现,以判断折现值是否会触发行权价;使用表格中的Forward rate对Callable bond进行定价:

因此Call option的Value为:100.8789-100.5446=0.3343

是不是这里严格意义上应该用二叉树,而forward rate就相当于二叉树的一条路径是吗?

2 个答案
已采纳答案

pzqa015 · 2023年02月26日

嗨,从没放弃的小努力你好:


这里没给二叉树,我们就用forward rate来计算。

其实二叉树上的利率就是forward rate得到的,只不过二叉树考虑了利率波动。如果假设利率无波动,那么embedded option bond的value就用forward rate来计算。用forward rate计算含权债的价格,要说有assumption的话,那就是假设利率无波动。

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pzqa015 · 2023年02月26日

嗨,从没放弃的小努力你好:


forward rate计算含权债的价格,可以理解为二叉树的一条路径。

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