Some Math: Difference between revisions

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?= expected profit
?= expected profit


afl<sub>asf</sub>
r <sub>b</sub> =rate on bills


r¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬¬b=rate on bills
r<sub>d</sub>=rate on deposits
 
rd=rate on deposits


C= operating costs
C= operating costs

Revision as of 16:09, 4 December 2006

S=B=N+D+K

?=rbB- rdD- C- L

where:

If :

?= expected profit

r b =rate on bills

rd=rate on deposits

C= operating costs

L=expected liquidity costs

S=specie

P= % adjustment cost for impending specie deficiency. Assumed to be constant

X= net specie outflow during the given period 

P(X? N,D)= the pdf of X given N and D


C= f (S,B,N,D)

L= g (S, N, D)

L= s ? p(X-S) P(X? N,D)dX

L(s)<0

L(n)>0

L(d)>0

From these partial derivatives, it follows that expected liquidity costs decrease when S increases. Also, L increases when N and D increase. Finally, let us solve this using a Lagrangian:

TRY TO WRITE THIS DIRECTLY ON THE WEBSITE- PG 43 OF COMPETITION AND CURRENCY


This model was presented by Lawrence H. White.

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