Dear statalists,
I'm learning how to use the command xtabond2, but I'm not sure about a few things in the results which I couldn't understand. I read parts of the famous article of Roodman of 2009 but I didn't solve the issues.
From a technical point of view I didn't understand why sometimes the difference in Hansen test is not present - my idea is that it can't be done but I'm not able to explain technically why
I post one model as an example to show my result
furthermore I'm not sure if I have to use both the suboptions equation(level) and equation(diff) in the option ivstyle in order to use instruments in the level model and in the transformed model. Third question is what kind of result I obtain with none of two suboptions in ivstyle.
Any help is appreciated.
I'm learning how to use the command xtabond2, but I'm not sure about a few things in the results which I couldn't understand. I read parts of the famous article of Roodman of 2009 but I didn't solve the issues.
From a technical point of view I didn't understand why sometimes the difference in Hansen test is not present - my idea is that it can't be done but I'm not able to explain technically why
I post one model as an example to show my result
Code:
xtabond2 LECI L.LECI LGCF LP LSFI LPA LHC LTO LFDI LGC , gmm(L.LECI, lag(1 6) collapse ) iv( LGCF LP LSFI LPA LHC LTO LFD > I LGC ) robust twostep Favoring space over speed. To switch, type or click on mata: mata set matafavor speed, perm. Dynamic panel-data estimation, two-step system GMM ------------------------------------------------------------------------------ Group variable: Code Number of obs = 1038 Time variable : year Number of groups = 93 Number of instruments = 16 Obs per group: min = 1 Wald chi2(9) = 651.63 avg = 11.16 Prob > chi2 = 0.000 max = 16 ------------------------------------------------------------------------------ | Corrected LECI | Coefficient std. err. z P>|z| [95% conf. interval] -------------+---------------------------------------------------------------- LECI | L1. | .345666 .126138 2.74 0.006 .0984402 .5928919 | LGCF | -.157589 1.114522 -0.14 0.888 -2.342012 2.026834 LP | 1.420067 .6380981 2.23 0.026 .1694178 2.670716 LSFI | -2.405806 .8000958 -3.01 0.003 -3.973965 -.8376465 LPA | .3219948 .2495487 1.29 0.197 -.1671116 .8111011 LHC | 5.588163 2.899331 1.93 0.054 -.0944215 11.27075 LTO | 3.191879 1.300292 2.45 0.014 .6433525 5.740405 LFDI | .2704359 .3048973 0.89 0.375 -.3271518 .8680236 LGC | 1.893409 1.265654 1.50 0.135 -.5872276 4.374046 _cons | -37.55127 15.16168 -2.48 0.013 -67.26762 -7.834926 ------------------------------------------------------------------------------ Instruments for first differences equation Standard D.(LGCF LP LSFI LPA LHC LTO LFDI LGC) GMM-type (missing=0, separate instruments for each period unless collapsed) L(1/6).L.LECI collapsed Instruments for levels equation Standard _cons LGCF LP LSFI LPA LHC LTO LFDI LGC GMM-type (missing=0, separate instruments for each period unless collapsed) D.L.LECI collapsed ------------------------------------------------------------------------------ Arellano-Bond test for AR(1) in first differences: z = -3.13 Pr > z = 0.002 Arellano-Bond test for AR(2) in first differences: z = 0.22 Pr > z = 0.829 ------------------------------------------------------------------------------ Sargan test of overid. restrictions: chi2(6) = 24.85 Prob > chi2 = 0.000 (Not robust, but not weakened by many instruments.) Hansen test of overid. restrictions: chi2(6) = 6.34 Prob > chi2 = 0.386 (Robust, but can be weakened by many instruments.) Difference-in-Hansen tests of exogeneity of instrument subsets: GMM instruments for levels Hansen test excluding group: chi2(5) = 6.33 Prob > chi2 = 0.276 Difference (null H = exogenous): chi2(1) = 0.01 Prob > chi2 = 0.909
Any help is appreciated.
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