FRM Fun 25, interest rate swap comparative advantage

David Harper CFA FRM

David Harper CFA FRM
Subscriber
Some Q&A on the tricky comparative advantage (of interest rate swap) concept (this thread here) got me thinking about how much we can infer from the visual.

Here is a interest rate swap, like Hull shows:
1008_fun_swap.png

Clearly, Company A (on the left) has an advantage in fixed-rate markets, where it (Co A) can borrow at a fixed rate of 6.0% (the left arrow out into the void signifies borrowing from capital markets, at the going rate). And Company B (on the right) has an advantage in floating-rate markets, where it (Company B) can borrow at a floating rate of LIBOR + 2.0%.

Question: given only two further assumptions:
  1. Company A can borrow (on its own) in floating-rate markets at LIBOR + 1.20%, and
  2. The gains created by the swap are shared equally
What is Company B's borrowing rate (on its own) in fixed-rate markets?
 

David Harper CFA FRM

David Harper CFA FRM
Subscriber
Hi Abhiskek,

Indeed you have summarized the information already displayed, which includes:
  • Company A borrows at a fixed rate of 6.0% in the capital markets, such that it must have comparative advantage in fixed-rate capital markets. Then, net of the swap, Company A effectively transforms this fixed-rate obligation into a floating-rate loan where it pays LIBOR + 0.2% (i.e., incoming 5.8% but outgoing LIBOR and outgoing 6.0% = pay LIBOR + 0.2%)
  • Company B borrows at a floating rate of of LIBOR + 2.0%, such that it must have comparative advantage in floating-rate markets. Then, net of the swap, Company B effectively transforms this floating-rate obligation into a fixed-rate loan where it pays 8% (i.e., incoming LIBOR canceled by outgoing LIBOR, which leaves outgoing 2% + 6%).
But the question is a little tougher: given they shared the total gains from the swap (50/50), can we infer information that is not displayed:
  • Company A's borrowing rate (on its own) in floating-rate markets (where it does not have C.A.)
  • Company B's borrowing rate (on its own) in fixed-rate markets (where it does not have C.A.).
I only ask b/c i think (?) it's a good stress test of mastery ....
 

David Harper CFA FRM

David Harper CFA FRM
Subscriber
Please note: the previous question was too difficult (perhaps unsolvable, I'm not quite decided). Apologies, but I just simplified the question by giving a further assumption, and i add the information to the image. Thanks,
 

RiskNoob

Active Member
Let X be Company B's borrowing rate (on its own) in fixed-rate market.

Let Y be the basis for the comparative-advantage argument. (I borrowed the term from Hull Ch.7, Table 7-4) That is,

Y = (fixed rate for Company B - fixed rate for Company A) - (floating rate for Company B - floating rate for Company A)
= (X - 6%) - ( (LIBOR + 2%) - (LIBOR + 1.2%) )

On the other hand Y can be interpreted as

Y = Company A`s profit due to swap transaction using comparative advantage + Company B`s profit due to swap transaction using comparative advantage + FI`s profit.

David already clearly explained the first two (equal) terms, which is 1%. Also, as we can see from the diagram that FI profit is 0.2%.

So,

Y = 1% + 1% + 0.2% = 2.2%

Solving for X, we have X = 9%. - Company B's borrowing rate (on its own) in fixed-rate markets is 9%.

RiskNoob
 

ShaktiRathore

Well-Known Member
Subscriber
Let x be the fixed rate at which B can borrow,
B pays: 6% and L+2%
B receives: L%
so total net fixed rate to B= (6%+L+2%)-L%=8%
So total advantage to B in terms of fixed rate:x-8%[B wants to borrow at fixed rate but entered into swap to benefit from low fixed rate from A side who has comparative advantage in fixed rate]

A pays: 6% and L%
A receives: 5.8%
so total net floating rate to A= (6%+L)-5.8%=L+.2%
So total advantage to A in terms of floating rate:L+1.2%-(L+.2%)=1%[A wants to borrow at floating rate but entered into swap to benefit from low fixed rate from B side who has comparative advantage in floating rate]

total advantage to A=total advantage to B
=>x-8%=1%
=>x=8%+1%
=>x=9%

Ans2:
from diagram also we can infer directly that,
than total benefit to B=x-6%+L-(L+2%)=x-8%
total benefit to A=Libor+1.2%-Libor+5.8%-6%=1%
for benefit to B=benefit to A,
x-8%=1%
x=8%+1%
x=9%


thanks
 

vt2012

Member
Agree, answer is quite obvious:
Company B's borrowing rate (on its own) in fixed-rate markets is 9%.
Gain =(9-6)-(L+2-L-1.2)=2.2% shared as 1%(CoA)+1%(CoB)+0.2%(FI).

Much more interesting the problem is WITHOUT asumption that CoA's borrowing rate (FL) is L+1.2
Strictly speaking, the problem HAS solution.
Let's denote CoB's borrowing rate (FX) as X; CoA's borrowing rate (FL) as L+sA.
Then gain (total) from swap =X-8+sA
After swap CoA's gain =L+s-6+5.8-L=sA-0.2; CoB's gain=X-(L+2)-L-6=X-8

Equations:
1. Gains are shared X-8=sA-0.2
2. Total gain minus FI is twice each gain X-8+sA-0.2=2(sA-0.2), or 2(X-8)
A bit algebra and we have solution X=sA+7.8

With your assumption sA=1.2 we have X=9
 

vt2012

Member
Agree, answer is quite obvious:
Company B's borrowing rate (on its own) in fixed-rate markets is 9%.
Gain =(9-6)-(L+2-L-1.2)=2.2% shared as 1%(CoA)+1%(CoB)+0.2%(FI).

Much more interesting the problem is WITHOUT asumption that CoA's borrowing rate (FL) is L+1.2
Strictly speaking, the problem HAS solution.
Let's denote CoB's borrowing rate (FX) as X; CoA's borrowing rate (FL) as L+sA.
Then gain (total) from swap =X-8+sA
After swap CoA's gain =L+s-6+5.8-L=sA-0.2; CoB's gain=X-(L+2)-L-6=X-8

Equations:
1. Gains are shared X-8=sA-0.2
2. Total gain minus FI is twice each gain X-8+sA-0.2=2(sA-0.2), or 2(X-8)
A bit algebra and we have solution X=sA+7.8

With your assumption sA=1.2 we have X=9

P.S. Naturally, restriction is sA>0.2, otherwise we'll have losses, not gains
 

David Harper CFA FRM

David Harper CFA FRM
Subscriber
vt2012 agreed, but you finish with one equation in two unknowns (X=sA+7.8), so you do require the s(A) assumption, yes? I could not improve on that .... I did originally expect it to be solvable w/o the sA assumption. Without knowing A's floating rate, there are three equations:
  1. Fx(b) + Fl(a) - g = 8%; where g = gain before FI fee of 0.2%
  2. 2*Fx(b) - g = 15.8%; i.e., B gets half of the post-fee gain such that Fx(b) - 8% = 0.5*(g-0.25%)
  3. 2*Fl(a) -g = 0.2%; i.e., A gets half of the post-fee gain such that Fl(a) - 0.2% = 0.5*(g-0.2%) and omitting Libor throughout
But, unless i mistaken, that matrix is indeterminate, is why I added back an assumption. Although in Excel, I could not find other solutions, so I *feel* there is a solution in three equations but I could not find :mad: thanks for your help!
 

ABFRM

Member
Hello David but there is an underlying assumption that benefits will be passed on two both equally.
Is this the case really? because in practice A will take more advantage becuse A has absolute advantage in bothe the markets so underlying assumption that both will share the advantage equally is doubtful.
 

David Harper CFA FRM

David Harper CFA FRM
Subscriber
I agree the 50/50 share assumption is dubious (very interesting that the counterparty with absolute advantage ought to garner greater share of the gain!). The only reason I employed the assumption is that, without such an assumption (or sharing rule), I think the problem would have allow for an infinite number of solutions. So, as is often the case in writing questions, it is a way to "sneak in" an assumption that helps lead to only one answer. Thanks!
 

vt2012

Member
vt2012 agreed, but you finish with one equation in two unknowns (X=sA+7.8), so you do require the s(A) assumption, yes? I could not improve on that .... I did originally expect it to be solvable w/o the sA assumption. Without knowing A's floating rate, there are three equations:
  1. Fx(b) + Fl(a) - g = 8%; where g = gain before FI fee of 0.2%
  2. 2*Fx(b) - g = 15.8%; i.e., B gets half of the post-fee gain such that Fx(b) - 8% = 0.5*(g-0.25%)
  3. 2*Fl(a) -g = 0.2%; i.e., A gets half of the post-fee gain such that Fl(a) - 0.2% = 0.5*(g-0.2%) and omitting Libor throughout
But, unless i mistaken, that matrix is indeterminate, is why I added back an assumption. Although in Excel, I could not find other solutions, so I *feel* there is a solution in three equations but I could not find :mad: thanks for your help!


Hi David,
In your terms equations are:
1. Fx(b)+Fl(a)-L-g=8 -> g=Fx(b)+Fl(a)-L-8 this is g definition
2. Fx(b)-8=0.5(g-0.2)
3. Fl(a)-L-0.2=0.5(g-0.2)

Rank of the matrix is 2

Or, substituting g t0 2 and 3 we have

1. Fx(b)-8=Fl(a)-L-0.2
2. Fl(a)-L-0.2=Fx(b)-8

Of course, rank of the matrix =1; it means that there is no solution in terms Fx(b)=number and Fl(a)=number
However, remembering linear algebra course, solution of the equations is Fx(b)=Fl(a)-L+7.8
That is why I mentioned that "strictly speaking the problem Has solution" :)
 

David Harper CFA FRM

David Harper CFA FRM
Subscriber
Hi vt2012, yes, well-played sir, "strictly speaking" the problem does have a solution indeed! I swear i must be have been lulled, from writing too many practice questions, into thinking that the solution must be a value. Your demonstration of the matrix rank is great, much more efficient than my indeterminate calculation. Terrific, thank you for "proof" of the solution, I am finally satisfied.

P.S. this is example of why i love finance, it's a onion you can just keep peeling, no concept is fully baked, there is always an n+1. I really think, too, that going an notch below the surface reinforces the surface itself. When I first read Hull's comparative advantage, it was a vague idea and an attempt to memorize the key formula, i think in this concept, that magically there is an apparent free lunch given by the total gain = difference of the rate differentials. Try to memorize the formula, and (for me) the formula is easily forgotten. But play with the (n+1), below the surface, and formula becomes almost an intuition. Or, maybe it's just practice, not sure ;)
 
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