A note on empirical tests of separability and the "approximation" view of functional forms.
Aizcorbe, Ana M.
I. Introduction
An influential paper by Denny and Fuss |6~ provided two important
contributions to the literature dealing with empirical tests of
separability. First, they found an important limitation in empirical
tests of separability when the translog is viewed as an
"exact" representation of the underlying function (hereafter referred to as the "exact" view of functional forms). Second,
they demonstrated that the translog functional form may, in principle,
be viewed as a Taylor series expansion to an arbitrary function.
Appealing to this view, they then derive testable restrictions for the
existence of an aggregate, something empirical tests under the
"exact" view are incapable of providing. Their proposed test
has become the norm in empirical work.(1)
The applicability of their method for empirical work hinges on
viewing estimated functional forms, such as the translog, as
second-order Taylor series expansions (also referred to as second-order
approximations). Although they demonstrated that, in principle, one may
view translog coefficients as Taylor series coefficients to an arbitrary
function, their paper did not address the relevant question from an
empirical point of view: Can estimated translog coefficients be viewed
as Taylor series coefficients to an arbitrary function? This distinction
between properties of the translog in principle and properties of the
translog once estimated is clearly important because testing the
separability restrictions requires that the translog be estimated.
This note examines the approximation properties of the estimated
translog functional form. In particular, conditions under which
approximations derived from estimated translog functional forms may be
viewed as a Taylor series expansion are examined. Another way to state
the issue is: Under what conditions can coefficient estimates obtained
using a translog functional form be viewed as estimates for a Taylor
series coefficients? This issue was rigorously addressed by White |13~
for linear approximations (i.e., first-order approximations), where he
demonstrated that OLS estimates of first-order approximations do not
provide consistent estimates of Taylor series coefficients. The
continuing interpretation of the translog and other functional forms as
second-order approximations suggests that applied researchers are not
convinced that White's argument for first-order approximations
generalizes to higher-order approximations |4~. Therefore, this note may
be viewed as an examination of these issues as they relate to the
translog functional form. Although the focus of this note is on
least-squares techniques (since it is the commonly used estimation method) and the widely-used translog, it is readily demonstrated that
the arguments made here apply to other functional forms which take the
form of quadratic expansions (such as the quadratic and generalized Leontief).
The note is organized as follows. Section II reviews the Denny and
Fuss (DF) argument. The applicability of their argument for the
estimated translog is examined in section III. Here, it is demonstrated
that the estimated version of a translog functional form provides
unbiased estimates of Taylor series coefficients only if the underlying
function holds exactly. Therefore, assuming that the estimated translog
yields estimates of a second-order "approximation" involves
the maintained assumption that it holds "exactly". Section IV
points out the unfortunate implications for empirical tests of
separability. Specifically, conventional methods for estimating the
theoretical separability restrictions do not yield an empirical test of
the existence of an aggregate.
II. The Denny and Fuss Argument
The general point made by DF is that the empirical restrictions for
separability and their interpretation depends on how one interprets the
functional form used to conduct the test. Thus, they defined two
alternative views of functional forms:
DEFINITION 1 (Denny and Fuss). A second-order approximation, A(z), to
the production function Q = Q(z), where z = ||Z.sub.1~...|Z.sub.N~~
represents the inputs, is the Taylor-series quadratic expansion
|Mathematical Expression Omitted~
where |z.sup.*~ = |Mathematical Expression Omitted~ is the point of
expansion.
A function satisfying this definition may be viewed as a second
order-approximation. Alternatively, one may assume that the functional
form holds exactly:
DEFINITION 2. An approximation A(z) is exact for Q(z) iff A(z) = Q(z)
for all z.
DF then (1) demonstrated a problem with separability tests conducted
under the exact view of functional forms, and (2) proposed an
alternative method using the approximation view. Each of these issues is
examined in turn.
Problems with Separability Tests under the Exact View.
An important contribution of the DF paper was in pointing out a
problem with conducting separability tests under the exact view. To see
this, note that, in theory, a production function
y = f(|X.sub.1~, |X.sub.2~, |X.sub.3~) (1)
is separable in |X.sub.1~ and |X.sub.2~ if (1) may be restated as:
y = f(g(|X.sub.1~, |X.sub.2~), |X.sub.3~). (2)
In that case, it is said that an aggregate, |Mathematical Expression
Omitted~, exists. The well-known theoretical condition that allows one
to move from (1) to (2) is that the marginal rate of substitution between |X.sub.1~ and |X.sub.2~ be invariant to changes in the level of
|X.sub.3~:
d/d|X.sub.3~|(dy/d|X.sub.1~)/(dy/d|X.sub.2~)~ = 0. (3)
The problem with testing the restrictions in (3) in the exact view is
that choosing a functional form for |Mathematical Expression Omitted~
implicitly places restrictions on the functional form of the aggregate
|Mathematical Expression Omitted~. DF demonstrated this for the translog
functional form:
PROPOSITION 1 (Denny and Fuss). The separable form of a translog
function interpreted as an exact production function must be either a
Cobb-Douglas function of translog subaggregates or a translog function
of Cobb-Douglas subaggregates.
This is demonstrated by considering the well-known translog:
|Mathematical Expression Omitted~
and the empirical counterpart to the separability conditions in (3)
for the translog |2~:
|Mathematical Expression Omitted~
So, for example, a sufficient condition for (5) to hold is that
||alpha~.sub.13~ = ||alpha~.sub.23~ = 0, which, once imposed on (4)
yields:
ln y = ||alpha~.sub.0~ + ||theta~.sub.g~ ln g + ||theta~.sub.h~ ln h,
(6)
where |Mathematical Expression Omitted~ is a translog function of
|X.sub.1~ and |X.sub.2~, and |Mathematical Expression Omitted~ is a
translog function of |X.sub.3~. This presents a problem for empirical
testing since the theoretical conditions for separability in (3)
represent a test for the existence of some aggregate |Mathematical
Expression Omitted~ while the empirical test (using the translog)
implies functional form restrictions on the particular form that
|Mathematical Expression Omitted~ may take: In this case, |Mathematical
Expression Omitted~ must be translog. Therefore, the empirical test is
not just a test for separability, but a test of separability,
conditional on given functional forms for |Mathematical Expression
Omitted~. They also demonstrated that other conditions that guarantee
condition (5) also place restrictions on the particular form that
|Mathematical Expression Omitted~ can take. Therefore, empirical tests
of separability under the exact view of functional forms do not
represent a test for existence.
Empirical Tests of Separability under the Approximation View.
To circumvent this problem, DF proposed the now-conventional
"approximate" tests for separability where one views the
translog as an approximation rather than as an exact representation of
the underlying function. To justify this view, they provided conditions
under which the translog may be viewed as an approximation: In
Proposition 2 of their paper, DF demonstrated that the translog
functional form in (4), with symmetry imposed, is a second order
approximation if the following holds:
|Z.sub.i~ = ln |X.sub.i~
||Z.sup.*~.sub.i~
||alpha~.sub.0~ = Q(z)/|z.sup.*~
||alpha~.sub.i~ = dQ(z)/d|Z.sub.i~/|z.sup.*~
||alpha~.sub.ij~ = |d.sup.2~Q(z)/d|Z.sub.i~d|Z.sub.j~/|z.sup.*~ =
|d.sup.2~Q(z)/d|Z.sub.j~d|Z.sub.i~/|z.sup.*~ = ||alpha~.sub.ji~. (7)
The key conditions in (7) are the last three, which state that the
coefficients of the approximation must equal the derivatives of the
underlying function at |z.sup.*~. Their proof involves imposing these
restrictions on the translog in (4), to obtain an expression that
satisfies Definition 1. Therefore, their proposition demonstrated that
in principle one may view the translog as a second-order approximation.
The usefulness of this for separability testing is that under the
approximation view, one does not impose functional form restrictions on
the underlying function and thus, one does not restrict the functional
form of the aggregate |Mathematical Expression Omitted~. Specifically,
Proposition 4 in DF showed that under the approximation view, the
separable version of the translog still satisfies the definition for a
second-order approximation. Therefore, the test of the empirical
separability restrictions, under the approximation view, represent a
test for the existence of an aggregate.
III. Problems with Separability Tests under the Approximation View
The difficulty with the DF solution, from an empirical perspective,
is that there is no guarantee that a translog estimating equation, once
estimated, will yield parameters that are in some sense equal to the
derivatives of the underlying function, as (7) requires. This raises the
issue of potential biases in estimation and suggests the following
criteria for determining whether an estimated translog is a second-order
approximation:
DEFINITION 1'. The translog estimating equation:
|Mathematical Expression Omitted~
yields an approximation:
|Mathematical Expression Omitted~
which may be viewed as a second-order quadratic approximation to an
arbitrary function, Q(x), at the point |Mathematical Expression Omitted~
if
|Mathematical Expression Omitted~
|Mathematical Expression Omitted~
|Mathematical Expression Omitted~
where |Mathematical Expression Omitted~ is the expectations operator.
Alternatively, one may view the translog functional form as an exact
representation of the underlying function, in which case the resulting
approximation is called exact:
DEFINITION 2'. An estimated translog approximation |Mathematical
Expression Omitted~ is exact for |Mathematical Expression Omitted~ for
all x.
Definition 1' states that an approximation obtained from an
estimated translog may be viewed as a second-order approximation if the
expected value of the estimated translog coefficients equal the
derivatives of the underlying function. Another way to state this is
that it may be viewed as a second-order approximation if the DF
conditions in (7) hold in expectation. Similarly, Definition 2'
states that the approximation obtained from an estimated translog is
exact if it provides unbiased predictions of the underlying function
Q(x) at all points (not just the point of approximation).
These definitions are used below to explore conditions under which an
approximation obtained using an estimated translog function will satisfy
Definition 1'. At this point it is useful to give an intuitive
overview of the argument to be made. First, the relationship between two
approximations to the same function, but using different points of
approximations is examined and it is demonstrated that changing the
point of approximation does not alter the predicted values of the
approximation. This means that all translog approximations from an
estimated translog function will yield the same predicted values,
regardless of the point of approximation used in the estimation. Using
this result, it is demonstrated that if one assumes that an
approximation yields unbiased estimates at the point of approximation,
then it must yield unbiased estimates at all points, which cannot occur
unless the approximation holds exactly. Therefore, assuming that
Definition 1' holds for the translog approximation involves the
implicit assumption that Definition 2' holds as well.
Each of these arguments are now examined in turn.
PROPOSITION 1. When estimating a translog equation, changing the
point of approximation does not affect the predicted values of the
approximation at any point.
Proof. Consider two translog approximations. The first
|Mathematical Expression Omitted~
is obtained using estimates from the following translog estimating
equation which uses ||X.sup.*~.sub.i~ = 1 as the point of approximation
(without loss of generality):
|Mathematical Expression Omitted~
The second approximation:
|Mathematical Expression Omitted~
is obtained using estimates from the following translog estimating
equation which uses some arbitrary point ||X.sup.k~.sub.i~ as the point
of approximation:
|Mathematical Expression Omitted~
Since both estimating equations involve the same dependent variable
(ln y), set the right-hand sides of (12) and (14) equal to obtain the
following equalities(2):
|Mathematical Expression Omitted~
|Mathematical Expression Omitted~
||alpha~.sub.ij~ = ||beta~.sub.ij~
||epsilon~.sub.1~ = ||epsilon~.sub.2~. (15)
Note, then, that these equalities, once imposed on (12) yield an
estimating equation identical to that in (14): Both regression equations have identical independent variables (ln y); dependent variables and
residuals. Therefore, the estimated coefficients obtained from (12) and
(14) will satisfy the following conditions:
|Mathematical Expression Omitted~
|Mathematical Expression Omitted~
|Mathematical Expression Omitted~
Finally, substituting (16) into (11) and comparing the result to (13)
yields:
|Mathematical Expression Omitted~
|Mathematical Expression Omitted~
Equation (17) says that |Mathematical Expression Omitted~ evaluated
at any point will take on the same value as |Mathematical Expression
Omitted~. Taking expectations over (17) yields equation (18). Therefore,
changing the point of approximation does not affect the prediction given
by the approximation.(3) Q.E.D.
A numerical example is helpful in examining this issue. Consider two
second-order quadratic TABULAR DATA OMITTED approximations to an
arbitrary function in one variable: y = f(X). Table I provides estimated
coefficients and predicted values for the dependent variable and its
derivatives for two regressions, both using a translog functional form.
Each approximation is performed at a different point of approximation:
The first is centered at X = 1 while the second is centered at the mean.
Note that although most of the coefficient estimates differ, the
estimated values for y and its derivatives do not vary as the point of
approximation changes. That is, OLS provides the same estimated function
regardless of the "point of approximation" chosen. Another way
to state the point is that knowing the equalities in (16) makes one of
the regressions superfluous. That is, if one estimates (12), one can use
the equalities in (16) to obtain the estimates of the regression in
(14).
We now make the central point.
PROPOSITION 2. A translog approximation obtained by estimating the
translog functional form satisfies the definition for second order
approximations (Definition 1') only if it is exact (satisfies
Definition 2').
Proof. Suppose Definition 1' holds for the approximation
|Mathematical Expression Omitted~, above. That is, evaluate (11) at the
point of approximation x = 1 and impose the first equality in (10):
|Mathematical Expression Omitted~
Further, suppose |Mathematical Expression Omitted~ does not satisfy
Definition 2'. That is, suppose there exists a point |x.sup.k~ such
that
|Mathematical Expression Omitted~
This condition will be used to raise a contradiction. In particular,
it is demonstrated that given (19), a translog approximation will not
satisfy Definition 1' unless it violates (20).
To do this, consider another approximation |Mathematical Expression
Omitted~, also satisfying definition 1' at this arbitrary point
|x.sup.k~:
|Mathematical Expression Omitted~
The relationship between the expectations of the two approximations
|Mathematical Expression Omitted~ and |Mathematical Expression Omitted~
is given in (18), which when applied to the point of approximation is
stated as:
|Mathematical Expression Omitted~
This, combined with (21) yields:
|Mathematical Expression Omitted~
which contradicts (20). Q.E.D.
This implies that if Definition 1' holds (i.e., the translog
approximation yields unbiased estimates at the point of approximation),
then it must be the case that one obtains unbiased estimates everywhere,
which cannot occur unless the functional form holds exactly (i.e.,
Definition 2' holds).
IV. Implications for the Conventional Separability Test
Having demonstrated that approximations obtained from translog
estimating equations must be viewed as "exact" approximations,
the implications for separability testing are fairly obvious. Since
these approximations must be viewed as "exact", Proposition 1
of DF applies to the translog approximation and the approximation view
of the translog fails to circumvent the problems in the exact view.
This means it is inappropriate to interpret the conventional
empirical test for separability as a test for the existence of an
aggregate. Since applying the definition for second-order approximations
to an estimated functional form requires that the functional form of the
estimated function match that of the true, underlying function, one is
actually testing for separability, conditional on the functional form
chosen. That is, testing the separability conditions still involves a
maintained functional form assumption which affects the possible
functional forms of aggregates being tested. Thus, one can not test for
existence of an aggregate, and can only test for aggregates of a
particular functional form (i.e., those allowed by the functional form
chosen for the estimated function).
This argument motivates the need for new methods for testing
separability restrictions. Promising techniques which do not impose
functional form assumptions on the underlying function are the
non-parametric tests discussed in Varian |11~. Another approach would
focus on testing the validity of aggregates with a particular functional
form |1~. Finally, the development of new functional forms which provide
unbiased estimates of underlying elasticities |7~ could provide a useful
way to test for the existence of an aggregate.
1. Among the numerous studies applying the Denny and Fuss
separability tests are Norsworthy and Malmquist |10~, Hazilla and Kopp
|8~, Wang-Chang and Friedlaender |12~, McMillan and Amoako-Tuffour |9~,
and Chung |5~.
2. If one multiplies out the bracketed terms in (14) and simplifies,
one obtains:
|Mathematical Expression Omitted~
Setting this equal to the right-hand side of (12) yields the
equalities.
3. This point may also be examined by using tedious algebra to
demonstrate that the predictions from (12) and (14) are identical:
|Mathematical Expression Omitted~
where |X.sup.1~ and |X.sup.k~ are the matrices of explanatory variables for equations (12) and (14) respectively, and the batted
vectors represent parameter estimates.
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