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Day 2: CES Production Function and Exponential PMP Cost Function
Day 2 NotesHowitt and Msangi 1
Understand the effect on policy models of a quadratic PMP cost function.
Understand this formulation has a production function which enables us to measure adjustments at the intensive margin.
Run and interpret the PMP CES Machakosmodel, and Calculate the elasticities of supply and input demand.
Day 2 NotesHowitt and Msangi 2
PMP Calibration◦ Calibration Checks◦ Livestock PMP Machakos Model◦ CES Production Function◦ Machakos CES PMP Model◦ Calibrating Demands with Limited Data◦ Endogenous Prices
Day 2 NotesHowitt and Msangi 3
Day 2 NotesHowitt and Msangi 4
I. All positive net returns
II. LP estimated acreage is close to observed base acreage
III. Difference between marginal PM cost at base land allocation from corresponding dual calibration constraint value
IV. First-order conditions hold
V. Verify calibrated non-linear model reproduces observed base solution
Day 2 NotesHowitt and Msangi 5
0≥c
*
100 tolerance −⋅ ≤
x XBASEXBASE
( ) ( )2
2
100 tolerancei i i i i
i i
XBASE adjadj
α γ λλ
+ − +⋅ ≤
+
( ) ( )( )
1 2
1 2
VMP100 toleranceij ij j i i
ij j i i
w adj
w adj
λ λ
λ λ
− + + +⋅ ≤
+ + +
*
100 tolerance −⋅ ≤
xn XBASEXBASE
1. Base Dataset
PMP Calibration Stages and Tests
2. Calibrated Linear Program
3. CES Analytical Derivation
4. PMP Least Squares Solution
5. Demand Calibration
6. CES & PMP Endogenous
Price
Net Returns
% Diff from Base
VMP vs. Opportunity
Cost
% Diff PMP
Price Check
% Diff from Base
Policy runs
Tests
Stages
Day 2 NotesHowitt and Msangi 6
Day 2 NotesHowitt and Msangi 7
max i i i ij iji ij
v y x a csΠ = −∑ ∑subject to
i ix XBASE iε≤ + ∀
i ii i
x XBASE≤∑ ∑
CATT,HAYLINK GRASS,HAYLINK 0CATT GRASSa x a x+ =
0ix ≥
Livestock PMP Machakos Example: Machakos_Cattle_PMP_Day2.gms
Same Primal LP problem, except with calibration constraints:
Day 2 NotesHowitt and Msangi 8
subject to
( )0.5i i i i i i ii
Max v y xn xn xnα γ− +∑
i ii i
xn XBASE≤∑ ∑
CATT,HAYLINK GRASS,HAYLINK 0CATT GRASSa xn a xn+ =
After introducing the “IL” set, allowing us to exclude cattle, we can define the calibrated non-linear program:
Day 2 NotesHowitt and Msangi 9
Assume Constant Returns to Scale
Assume the Elasticity of Substitution is known from previous studies or expert opinion. ◦ In the absence of either, we find that 0.17 is a
numerically stable estimate that allows for limited substitution
CES Production Function
Day 2 NotesHowitt and Msangi 10
/
1 1 2 2 ... ii i igi gi gi gi gi gi gij gijy x x x
υ ρρ ρ ρ = τ β +β + +β
Consider a single crop and region to illustrate the sequential calibration procedure:
Define:
And we can define the corresponding farm profit maximization program:
Day 2 NotesHowitt and Msangi 11
1σ−ρ =
σ
/
max .j
j j j j jx j jv x x
υ ρ
ρ π = τ β − ω
∑ ∑
Constant Returns to Scale requires:
Taking the ratio of any two first order conditions for optimal input allocation, incorporating the CRS restriction, and some algebra yields our solution for any share parameter:
Day 2 NotesHowitt and Msangi 12
1.jjβ =∑
( )
( )
1 11
11
1 11 l
l l
letting l all jx
x
− σ
− σ
β = = ≠ ω
+ ω
∑
( )
( )
11
1111
11
1 .1
ll
ll
l l
xxx
x
− σ
− σ− σ
− σ
ωβ =
ω ω+
ω ∑
As a final step we can calculate the scale parameter using the observed input levels as:
Day 2 NotesHowitt and Msangi 13
/
( / ) .i
land land
j jj
yld x x
xυ ρ
ρ
⋅τ =
β
∑
To avoid unbalance coefficients, we can scale input costs into units of the same order of magnitude for the program, and then de-scale inputs back into standard units.
Day 2 NotesHowitt and Msangi 14
( )
( )
11 1
11
ll
l
xx
− σ
− σ
ω ββ =
ω
jβ
Machakos CES PMP Example: Machakos_CES_Crops_PMP_Day2.gms
Specify model with same data used for Primal LP and Quadratic PMP with Leontief production technology.
subject to
One important difference: Input constraints
Day 2 NotesHowitt and Msangi 15
( )0.5i i i i i i ii
Max v y xn xn xnα γ− +∑
i ii i
xn XBASE≤∑ ∑/
1 1 2 2 ... ii i ii i i i i i ij ijy x x x
υ ρρ ρ ρ = τ β +β + +β
When only equilibrium price and quantity in the model base year, and an estimate of elasticity are available, we can follow these steps to derive a demand function:
◦ Assume linear form specification:
◦ Recall demand elasticity:
◦ Rearrange the flexibility relationship:
◦ Derive the intercept:
Day 2 NotesHowitt and Msangi 16
inti i i iv yδ= +
i ii
i i
y vv y
η ∂=
∂
i ii
i
vyµδ =
int i i i iv yδ= −
Redefine the non-linear profit maximization program with endogenous prices and CES production, except we include the demand function as an additional constraint in the model:
Day 2 NotesHowitt and Msangi 17
( )0.5i i i i i i ii
Max v y xn xn xnα γ− +∑subject to
i ii i
xn XBASE≤∑ ∑/
1 1 2 2 ... ii i ii i i i i i ij ijy x x x
υ ρρ ρ ρ = τ β +β + +β
inti i i iv yδ= +