Consider the following nonlinear regression model:
𝑦
𝑡
=
𝛼
𝑥
𝑡
𝛽
+
𝜀
𝑡
Assume i.i.d. data and
𝔼
[
𝜀
𝑡
|
𝑥
𝑡
]
=
0
. To estimate
𝛼
and
𝛽
by GMM, we use the following moment conditions:
𝔼
[
𝑦
𝑡
−
𝛼
𝑥
𝑡
𝛽
]
=
0
𝔼
[
(
𝑦
𝑡
−
𝛼
𝑥
𝑡
𝛽
)
𝑥
𝑡
]
=
0
We have an i.i.d. sample with
𝑇
=
1000
observations, with
∑
𝑡
=
1
𝑇
𝑥
𝑡
=
1123.9975
,
∑
𝑡
=
1
𝑇
𝑥
𝑡
2
=
5379.7163
∑
𝑡
=
1
𝑇
𝑥
𝑡
3
=
15602.875
∑
𝑡
=
1
𝑇
𝑥
𝑡
4
=
81337.6911
We obtain point estimates
𝛼
̂
=
−
1
and
𝛽
̂
=
3
. To compute the variance of the estimates, we need to estimate the matrix
𝛤
0
,
𝛤
̂
0
=
[
𝛤
̂
11

𝛤
̂
12

𝛤
̂
21

𝛤
̂
22
]
Then, the value
𝛤
̂
21
is:

Question

Consider the following nonlinear regression model:
𝑦
𝑡
=
𝛼
𝑥
𝑡
𝛽
+
𝜀
𝑡
Assume i.i.d. data and 
𝔼
[
𝜀
𝑡
|
𝑥
𝑡
]
=
0
. To estimate 
𝛼
 and 
𝛽
 by GMM, we use the following moment conditions:
𝔼
[
𝑦
𝑡
−
𝛼
𝑥
𝑡
𝛽
]
=
0
𝔼
[
(
𝑦
𝑡
−
𝛼
𝑥
𝑡
𝛽
)
𝑥
𝑡
]
=
0
We have an i.i.d. sample with 
𝑇
=
1000
 observations, with
∑
𝑡
=
1
𝑇
𝑥
𝑡
=
1123.9975
,
∑
𝑡
=
1
𝑇
𝑥
𝑡
2
=
5379.7163
∑
𝑡
=
1
𝑇
𝑥
𝑡
3
=
15602.875
∑
𝑡
=
1
𝑇
𝑥
𝑡
4
=
81337.6911
We obtain point estimates 
𝛼
̂
=
−
1
 and 
𝛽
̂
=
3
. To compute the variance of the estimates, we need to estimate the matrix 
𝛤
0
,
𝛤
̂
0
=
[
𝛤
̂
11
	
𝛤
̂
12

𝛤
̂
21
	
𝛤
̂
22
]
Then, the value 
𝛤
̂
21
 is:

BlackTom AI · Accepted Answer

Before judging any option, I’ll outline what Γ̂21 represents in this GMM setup. The second moment condition is E[(y_t − α x_t^β) x_t] = 0, and the first moment condition is E[y_t − α x_t^β] = 0. When forming the Γ matrix, its entry Γ21 is the expectation of the derivative of the first moment condition with respect to β, i.e. Γ21 = E[ ∂/∂β (y_t − α x_t^β) ]. Since ∂/∂β of y_t − α x_t^β equals −α x_t^β ln x_t, we get Γ21 = E[ −α x_t^β ln x_t ].

Now, with the given parameter values α = −1 and β = 3, this simplifies to Γ21 = −(−1) E[ x_t^3 ln x_t ] = E[ x_t^3 ln x_t ]. To compute this from data, one would need the sample average (1/T) ∑ x_t^3 ln x_t. However, the provided data give only:
- ∑ x_t = 1123.9975
- ∑ x_t^2 = 5379.7163
- ∑ x_t^3 = 15602.875
- ∑ x_t^4 = 81337.6911
There is no information about ln x_t, nor about the joint values of x_t^3 ln x_t, so we cannot numerically compute Γ̂21 from these summaries.

Now evaluating each option:
- Option: 𝛤̂21 = −81.3377
  Why this is unlikely: to reach a numeric value like −81.3377, one would need the average of x_t^3 ln x_t or an equivalent statistic. Since nothing in the provided sums includes ln x_t terms, this specific value cannot be justified from the given data. It would require additional information that couples x_t^3 with ln x_t.
- Option: 𝛤̂21 = 5.3797
  Why this is unlikely: similar to the previous, a positive 5.3797 would hinge on the log-weighted third moment. Without ln x_t data or a derived statistic that ties to ln x_t, this cannot be confirmed.
- Option: There is not enough information to compute 𝛤̂21.
  Why this is plausible: this directly aligns with the fact that Γ21 requires E[ x_t^3 ln x_t ], and the dataset summaries do not provide any information about ln x_t or the product x_t^3 ln x_t. Hence, you cannot compute Γ̂21 from the given summaries alone.
- Option: 𝛤̂21 = −1.124
  Why this is unlikely: again, it would imply a specific log-weighted third moment value, for which there is no supporting data in the provided sums.
- Option: 𝛤̂21 = −15.6029
  Why this is unlikely: this mirrors a value tied to the plain E[x_t^3] or a related non-log moment. The presence of ln x_t is essential here, which is not provided in the summary statistics.
- Option: 𝛤̂21 = 15.6029
  Why this is unlikely: same reasoning as above; without ln x_t, you cannot arrive at a positive log-weighted third moment that matches a number derived from E[x_t^3] alone.

In summary, the crucial obstacle is the absence of any ln x_t information or the cross-moment ∑ x_t^3 ln x_t in the given data. Without that, you cannot compute Γ̂21 numerically. Therefore, the only option that correctly reflects the information limitation is the one stating that there is not enough information to compute 𝛤̂21.

Similar Questions

Consider the following nonlinear regression model: yi=α+eβxi+εi, Assume i.i.d. data and 𝔼[εi|xi]=0. To estimate α and β by GMM, we need two moment conditions. Choose the best answer below:

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