Description
This is the TWO3MCP model formulated using GAMS/EMP.
Reference: Shoven and Whalley: "Applied G.E. Models"
Journal of Economic Literature, XXII (1984)
Small Model of Type : EQUIL
Category : GAMS EMP library
Main file : two3emp.gms
$title EMP Formulation of Simple 2 x 2 x 2 General Equilibrium Model (TWO3EMP,SEQ=68)
$ontext
This is the TWO3MCP model formulated using GAMS/EMP.
Reference: Shoven and Whalley: "Applied G.E. Models"
Journal of Economic Literature, XXII (1984)
$offtext
sets
f factors /labor, capital/
s sectors /mfrs, nonmfrs/
h households /rich, poor/;
*
* demand function parameters.
*
parameter sigmac(h)
/ rich 1.5 , poor 0.75/;
parameter rhoc(h) primal elasticity parameter;
rhoc(h) = (sigmac(h)-1)/sigmac(h);
table alpha(s,h)
rich poor
mfrs 0.5 0.3
nonmfrs 0.5 0.7;
table e(f,h)
rich poor
labor 60
capital 25
*
* production function parameters.
*
parameter phi(s)
/ mfrs 1.5, nonmfrs 2.0 /;
table delta(f,s) factor share coefficients
mfrs nonmfrs
labor 0.6 0.7
capital 0.4 0.3;
parameter sigma(s) elasticities of factor substitution
/ mfrs 2.0, nonmfrs 0.5/;
parameter tshr(h) share of tax revenue,
t(f,s) ad-valorem tax rates;
tshr(h) = 0;
t(f,s) = 0;
parameter rho(s) primal form elasticity parameter;
rho(s) = (sigma(s)-1)/sigma(s);
positive
variables
W(f) factor price,
P(s) commodity price,
Y(s) production level,
C(s) Marginal cost of production,
X(f,s) Conditional factor demands,
D(s,h) Final demands for goods
variables
I(h) income;
equations
fmkt(f) factor market,
cmkt(s) commodity market,
profit(s) zero profit,
income(h) income equation;
* Factor supply (endowments) equals factor demand:
fmkt(f).. sum(h, e(f,h)) =g= sum(s, Y(s) * X(f,s));
* Commodity output equals commodity demand:
cmkt(s).. Y(s) =g= sum(h, D(s,h));
* Unit cost equals market price:
profit(s).. C(s) =g= P(s);
* Income equals factor earnings plus redistributed tax revenue:
income(h).. I(h) =e= sum(f, E(f,h)*w(f)) + TSHR(h)*sum((s,f), t(f,s) * W(f) * Y(s) * X(f,s));
* The following define conditional factor demands and final demand
* based on a primal representation of individual optimization problems:
equations DEFCOST(s) Defines unit cost of production,
DEFUTIL(h) Defines household utility
ISOQUANT(s) Requires that factor demands are feasible
BUDGET(h) Defines budgetary consistency;
variables COST(s) Unit cost function
UTILITY(h) Household utility;
defcost(s).. COST(s) =e= sum(f, (1 + t(f,s)) * W(f) * X(f,s));
defutil(h).. UTILITY(h) =e= sum(s, alpha(s,h)**(1/sigmac(h)) * D(s,h)**rhoc(h))**(1/rhoc(h));
isoquant(s).. phi(s) * sum(f, delta(f,s) * X(f,s)**rho(s))**(1/rho(s)) =g= 1;
budget(h).. sum(s, P(s) * D(s,h)) =l= I(h);
model jel / defcost, defutil, isoquant, budget, fmkt, cmkt, profit, income/;
* compute solution for this dimension problem:
W.lo(f) = 0.0001;
P.lo(s) = 0.0001;
X.lo(f,s) = 0.0001;
D.lo(s,h) = 0.0001;
W.l(f) = 1;
P.l(s) = 1;
Y.l(s) = 10;
I.l(h) = sum(f, W.L(f) * e(f,h));
X.l(f,s) = 1;
D.l(s,h) = 1;
* Fix a numeraire - we really need this to solve
W.fx("labor") = 1;
file myinfo / '%emp.info%' /;
put myinfo '* Shoven & Whalley 1984';
put / 'equilibrium' /;
loop(s,
put 'min' COST(s) /;
loop(f, put X(f,s));
put / DEFCOST(s) ISOQUANT(s) /;
);
loop(h,
put 'max' UTILITY(h) /;
loop(s, put D(s,h));
put / DEFUTIL(h) BUDGET(h) /;
);
put / 'vi INCOME I'/;
put 'vi CMKT P'/;
put 'vi PROFIT Y'/;
put 'vi FMKT W'/;
put 'dualvar C ISOQUANT'/;
putclose;
* Find a good starting point by fixing incomes
I.fx(h) = sum(f, E(f,h)*w.l(f));
solve jel using emp;
* Now solve real problem
I.lo(h) = -inf; I.up(h) = inf;
solve jel using emp;
* apply tax in test problem:
tshr("rich") = 0.4;
tshr("poor") = 1 - tshr("rich");
t("capital","mfrs") = 0.5;
solve jel using emp;