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| Figure 1: Start of Wage Curves, with One Real and One Fake Switch Point |
1.0 Introduction
This post presents another numeric example with pure fixed capital and extensive rent.
Aside from these aspects of the model, no joint production exists.
Models of pure fixed capital or of extensive rent share certain properties with models of the production of commodities
with labor and circulating capital alone. This article demonstrates that a model that combines pure fixed capital and
extensive rent can exhibit issues raised by joint production. The cost-minimizing technique need not maximize the wage,
and the choice of technique cannot be analyzed by the construction of the wage frontier. A switch point can exist without
an intersection of wage curves, and intersections of wage curves can be fake switch points.
2.0 Technology
The example is specified by the technology, endowments of land, and requirements for use. An analysis of
quantity flows identifies which techniques are feasible at a given level of requirements for use. The analysis of the choice of
technique requires the examination of the solutions to the price systems for each technique.
I assume the existence of two types of land. More than one type is required for this model to exhibit extensive
rent. With only two types of land, contrasting the orders of efficiency and of rentability is uninteresting. The
order of efficiency is the order in which different types of land are introduced into cultivation as net output
expands. The order of rentability sorts the lands by rent per acre. When both types of land are farmed, one type
will be only partially farmed. It has a rent of zero; the other type of land obtains a positive rent. The orders
of efficiency and rentability are necessarily identical, with two types of land and only one scarce. These orders
can be completely reversed in models with more lands and both extensive and intensive rent.
Fixed capital is another aspect of joint production, in addition to land, in this model. A newly produced machine
can be used for three years in production. Machines are assumed not to be consumption goods. New machines, but
not old machines, can be consumer goods in models of pure fixed capital. This model seems to be close to the minimal
complexity to investigate a combination of land-like natural resources and fixed capital in a model with the production
of multiple commodities that is otherwise of single production alone. In a simpler model, the physical life of the machine would be only two years.
Table 1: Inputs for Processes Comprising the Technology
| Input | Processes |
| I | II | III | IV | V | VI | VII |
| Labor | a0,1 = 0.4 | a0,2 = 0.2 | a0,3 = 0.6 | a0,4 = 0.4 | a0,5 = 0.23 | a0,6 = 0.59 | a0,7 = 0.39 |
| Type 1 Land | 0 | c1,2 = 1 | c1,3 = 1 | c1,4 = 1 | 1 | 1 | 1 |
| Type 2 Land | 0 | 0 | 0 | 0 | c2,5 = 1 | c2,6 = 1 | c2,7 = 1 |
| Corn | a1,1 = 0.1 | a1,2 = 0.4 | a1,3 = 0.578 | a1,4 = 0.6 | a1,5 = 0.39 | a1,6 = 0.59 | a1,7 = 0.61 |
| New Machines | 0 | 1 | 0 | 0 | 1 | 0 | 0 |
| Type 1 1-Yr. Old Machines | 0 | 0 | 1 | 0 | 0 | 0 | 0 |
| Type 1 2-Yr. Old Machines | 0 | 0 | 0 | 1 | 0 | 0 | 0 |
| Type 2 1-Yr. Old Machines | 0 | 0 | 0 | 0 | 0 | 1 | 0 |
| Type 1 2-Yr. Old Machines | 0 | 0 | 0 | 0 | 0 | 0 | 1 |
The technology is specified by the coefficients of production for seven processes. Each column in Table 1 shows
the person-years of labor, acres of either type of land, bushels of corn, and numbers of new and old machines required
as inputs to operate a process at unit level. The outputs of corn and machines, new and old, per unit level of each
process are shown in Table 2. Machines are an industrial product which needs no land to produce. The laborers
produce corn on land from inputs of corn and machines. Old machines one year older are produced jointly with corn
from inputs of machines. Each old machine is of a type customized to the land on which it was produced. Old machines
cannot be transferred from one type of land to another. They are assumed to be capable of free disposal. Formally,
free disposal of an old machine of, say, type 1 is specified by assuming the existence of another process duplicating
the second or third process, but without an output of an old machine. Each process is assumed to exhibit constant
returns to scale (CRS) and to require a year to complete. The coefficients of production for the first four
processes, other than those for land, are taken from a reswitching example by Baldone (1980).
Table 2: Outputs for Processes Comprising the Technology
| Input | Processes |
| I | II | III | IV | V | VI | VII |
| Corn | 0 | b1,2 = 1 | b1,3 = 1 | b1,4 = 1 | b1,5 = 1 | b1,6 = 1 | b1,7 = 1 |
| New Machines | 1 | 0 | 0 | 0 | 0 | 0 | 0 |
| Type 1 1-Yr. Old Machines | 0 | 1 | 0 | 0 | 0 | 0 | 0 |
| Type 1 2-Yr. Old Machines | 0 | 0 | 1 | 0 | 0 | 0 | 0 |
| Type 2 1-Yr. Old Machines | 0 | 0 | 0 | 1 | 0 | 0 | 0 |
| Type 1 2-Yr. Old Machines | 0 | 0 | 0 | 0 | 0 | 1 | 0 |
The specification of model parameters is completed with endowments and requirements for use. Assume 100 acres of each
type of land exist. The required net output is assumed to be 87 bushels corn. This required net output is such that
all and only the techniques which require both types of land to be farmed are feasible.
3.0 Techniques and Feasibility
A technique is defined by which processes are operated, which type of lands are left unfarmed, which are
partially farmed, and which are farmed to the full extent of their endowment. Rents can only be obtained on the last.
Twenty-four techniques (Table 3) are defined for this technology. The capital goods that are used up in operating a
technique can be reproduced. A net output remains, consisting, in the example, solely of corn.
Only scarce lands obtain a rent, and which are scarce varies with the technique. No land is scarce in the
Alpha through Zeta techniques. One land is farmed and not to its full extent. Type 1 land is scarce in the
Eta through Omicron techniques, while type 2 land is scarce in the remaining nine techniques. The techniques also
vary in the economic life of the machine, one, two, or three years, on each type of land. Under the assumptions,
the first six techniques are infeasible. Only Eta through Omega are feasible.
Table 3: Techniques of Production
| Technique | Processes | Type 1 Land | Type 2 Land |
| Alpha | I, II | Partially farmed | Fallow |
| Beta | I, II, III | Partially farmed | Fallow |
| Gamma | I, II, III, IV | Partially farmed | Fallow |
| Delta | I, V | Fallow | Partially farmed |
| Epsilon | I, V, VI | Fallow | Partially farmed |
| Zeta | I, V, VI, VII | Fallow | Partially farmed |
| Eta | I, II, V | Fully farmed | Partially farmed |
| Theta | I, II, III, V | Fully farmed | Partially farmed |
| Iota | I, II, III, IV, V | Fully farmed | Partially farmed |
| Kappa | I, II, V, VI | Fully farmed | Partially farmed |
| Lambda | I, II, III, V, VI | Fully farmed | Partially farmed |
| Mu | I, II, III, IV, V, VI | Fully farmed | Partially farmed |
| Nu | I, II, V, VI, VII | Fully farmed | Partially farmed |
| Xi | I, II, III, V, VI, VII | Fully farmed | Partially farmed |
| Omicron | I, II, III, IV, V, VI, VII | Fully farmed | Partially farmed |
| Pi | I, II, V | Partially farmed | Fully farmed |
| Rho | I, II, III, V | Partially farmed | Fully farmed |
| Sigma | I, II, III, IV, V | Partially farmed | Fully farmed |
| Tau | I, II, V, VI | Partially farmed | Fully farmed |
| Upsilon | I, II, III, V, VI | Partially farmed | Fully farmed |
| Phi | I, II, III, IV, V, VI | Partially farmed | Fully farmed |
| Chi | I, II, V, VI, VII | Partially farmed | Fully farmed |
| Psi | I, II, III, V, VI, VII | Partially farmed | Fully farmed |
| Omega | I, II, III, IV, V, VI, VII | Partially farmed | Fully farmed |
4.0 The Price System
The modeled economy consists of three classes: workers, landlords, and capitalists. Capitalists buy
inputs and hire workers who they direct to produce commodity outputs. In agriculture, capitalist farmers pay
rent on scarce land to landlords. The capitalists choose the processes to operate based on cost. Accordingly, prices must be analyzed.
A system of equations is associated with each technique. An equation characterizes the prices for each process operated under a technique.
These equations show the same rate of accounting profits is obtained on the value of the capital goods advanced at the start
of the year. Rent and wages are paid out of the surplus product at the end of the year. A bushel corn is numeraire.
The rent per acre appears in the equation for processes operating on the land that is fully farmed, if any. This land is scarce.
Lands that are not fully farmed are free, and no rent appears in the equations for the processes operating on them.
5.0 On the Solutions of the Price Systems
Given the rate of profits, the price system for each technique can be solved. The solution for a technique
has one degree of freedom. The solution can be presented with
the wage, the price of new and old machines, and rents per acre as functions of the rate of profits.
Figure 1 graphs the start of the wage curves for each technique in the example. Notice that the ordinate does not
begin at zero in the graph. In this example, each wage curve is downward-sloping. Wage curves can be upward-sloping off
the outer wage frontier in models of fixed capital. In this example with fixed capital and extensive rent, the wage frontier
is neither the outer frontier of all wage curves nor the inner frontier.
In the illustrated range of the rate of profits, the wage frontier is the wage curve for the Zeta, Nu, Xi, and Omicron techniques.
The wage curve for a technique is found from solving the price system formed from the machine-building process and the corn-producing
processes operating on the non-scarce type of land. Quadrio Curzio & Pellizzari (2010) call this the ‘solving subsystem’.
The Zeta, Nu, Xi, and Omicron techniques differ on which processes are operated on Type 1 land, but not on Type 2 land, which
is free for all four techniques. Thus, they have the same solving system and the same wage curve.
Why are the wage curves for Nu and Omicron cost-minimizing in the illustrated range of the rate of profits? A technique is
cost-minimizing at a given rate of profits if:
- The wage and the prices of all produced commodities (corn and machines of various types and vintages) are positive.
- The rent of the scarce type of land is positive.
- The prices of old machines not produced by the technique are negative for the price systems in which they are produced. Bidard (2016) defines ghost commodities as such non-produced commodities that affect the prices of produced commodities.
The price of a Type 1 old machine is negative under Omicron prices for rates of profits smaller than at the switch point
between Nu and Omicron. A more general model would have processes that do not result from extending the economic life of a
machine produced by the technique under consideration. For the technique to be cost-minimizing, no extra profits can be obtained
by operating additional processes at the prices for the given rate of profits.
Two techniques are cost-minimizing at a switch point, except in fluke cases. The wage and the prices of all commodities
produced with both techniques do not vary between the price systems for the two techniques. The rent per acre of land is
also the same for the two techniques cost-minimizing at a switch point. Two types of switch points exist in the example, in addition to fake switch points.
In the first type, the techniques that are cost-minimizing for a switch point differ in the economic life of a machine. For
example, the economic life of a machine used in farming Type 1 land is one year under Nu and three years under Omicron. Figure 2 illustrates
the switch point between Nu and Omicron. Gamma, Sigma, Phi, Omega, Iota, Mu, and Omicron have positive prices for Type 1 one-year old machines in
the graphed ranges of the rate of profits. Type 1 one-year old machines are also produced in the Beta, Rho, Upsilon, Psi, Theta, Lambda, and Xi
techniques. Their prices are negative for these techniques in the indicated range. The price is zero, at the switch point, of the machine
one year older than used in the technique with the shorter life in the price system for the other technique. A price of zero is a
signal that the economic life of the machine can be truncated.
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| Figure 2: Price of Type 1 One-Year-Old Machines (Detail) |
Rents per acre are zero at the other type of switch point. In the example, a switch point between Iota and Sigma
exists at a rate of profits of approximately 45.04 percent. Their wage curves intersect at the switch point. The
machine is run for its full physical life on Type 1 land under both techniques, and truncated after its first year of
operation on Type 2 land. The techniques differ in which type of land is fully farmed and which is free. Figures 3 and 4 depict
the rent curves for the example. The rent curve for Iota intersects the abscissa in Figure 3. Type 1 land is free under Sigma and
has a rent per acre of zero under Iota at the switch point. Likewise, the rent curve for Sigma intersects the abscissa at the
switch point in Figure 4. The rent per acre on Type 2 land is zero at the switch point.
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| Figure 3: Rent On Type 1 Land |
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| Figure 4: Rent On Type 2 Land |
A fluke switch point in which four techniques are cost-minimizing can combine these two types of switch points. Two techniques
can differ in both the economic life of a machine and in which land is fully farmed. Two other techniques would then be cost-minimizing
so that firms are indifferent between the economic life of the machine and which land is fully farmed. Two of these four techniques
would differ in the economic life of a machine on scarce land; they would have the same wage curve. A switch point in which both the economic
life of a machine and which type of land is scarce vary is the intersection of three wage curves.
Fake switch points arise when only two wage curves intersect for techniques which vary in both the economic life of a machine and the type
of land that is fully farmed. Two fakes (Table 4) appear in the example. In both fakes, the prices of commodities produced under both
techniques with intersecting wage curves do not vary between the techniques. For the first fake, the technique Omicron with the
longer economic life of a machine is cost-minimizing. For the second fake, the technique Lambda with the longer economic life of a machine
is not cost-minimizing. No price of these commodities not produced under both techniques are not zero under the technique in which they are produced.
Their prices deviate from their behavior under the first type of switch point described above. On the other hand, the rent of one
type of land, Type 2 for the first fake and Type 1 for the second, is zero for both techniques, as in the second type of switch point.
The rent on the other type of land is positive for the technique for which it is scarce. The first switch point is a fake because the wage
curve for Omega does not intersect with the other wage curves. Under Omicron and Omega, the economic lives of the machines are the
same. The techniques differ in which land is scarce. By the same logic, the wage curve for Theta must intersect at the second
switch point in Table 5 for it not to be a fake.
Table 4: Rent Per Acre Varies with the Technique at Fake Switch Points
| Rate of Profits (Percent) | Technique | Commodities Produced Under Both | Ghost Commodities | Type 1 Land | Type 2 Land |
| 15.9 | Omicron* | Corn, New machines, Type 2 one and two-year old machines. | Type 1 one and two-year old machines. Prices of both are positive. | Scarce. Rent is positive. | Free |
| Chi | Prices are positive and same as Omicron. | | Free | Scarce. Rent is positive. |
| 56.7 | Lambda | Corn, new machines, Type 1 one-year old machines. | Type 1 one and two-year old machines. Prices of both are positive. | Scarce. Rent is positive. | Free |
| Rho* | Prices are positive and same as Lambda. | | Free | Scarce. Rent is positive. |
6.0 The Cost-Minimizing Systems
A numeric example that combines the production and use of fixed capital with extensive rent is developed above.
Table 5 summarizes the variation in the cost-minimizing technique through the full range of the rate of profits. The boundaries on
the ranges at which techniques are cost-minimizing are approximate. The switch point between Pi and Rho exhibits capital-reversing.
A higher wage or lower rate of profits is associated with the adoption of a technique that requires greater employment per unit of net output.
This result is a challenge for what some obdurate economists still teach, that, under ideal assumptions, equilibria in the labor market must
be the intersections of well-behaved, monotonic supply and demand curves. These results are also a challenge for claims by economists of the
Austrian school. For the switch points between Iota and Omicron and between Rho and Sigma, a longer economic life of a machine is associated
with greater capital-intensity, as they would expect. But for the switch points between Nu and Omicron and between Pi and Rho,
a shorter economic life of a machine is associated with greater capital-intensity
Table 5: Cost-Minimizing Techniques
| Range (Percent) | Technique | Economic Life of Machine (Years) | Land |
| Type 1 | Type 2 | Type 1 | Type 2 |
| 0 ≤ r ≤ 5.12 | Nu | 1 | 3 | Scarce | Free |
| 5.12 ≤ r ≤ 36.3 | Omicron | 3 | 3 | Scarce | Free |
| 36.3 ≤ r ≤ 45.0 | Iota | 3 | 1 | Scarce | Free |
| 45.0 ≤ r ≤ 55.7 | Sigma | 3 | 1 | Free | Scarce |
| 55.7 ≤ r ≤ 62.7 | Rho | 2 | 1 | Free | Scarce |
| 62.7 ≤ r ≤ 74.2 | Pi | 1 | 1 | Free | Scarce |
7.0 Conclusions
Joint production presents the possibilities of many phenomena inconsistent with clear properties of models of the
production of commodities with circulating capital alone. This article demonstrates that at least some of these phenomena
can occur with the combination of fixed capital and extensive rent, even though they do not occur in models of pure fixed capital
and extensive rent considered separately. The choice of technique cannot be analyzed solely by the construction of the wage frontier.
A switch point exists at which two wage curves do not intersect. Two fake switch points exist in the example, where rents per acre are
not equal on one type of land at the switch point for the techniques with intersecting wage curves. The feasible technique with the largest
wage is not necessarily cost-minimizing
No claim is made that other issues of joint production might not arise in models combining fixed capital and extensive rent. D’Agata (1983)
provides an example in a model of intensive rent with a non-unique and sometimes upward-sloping wage frontier. The model in this article
is similar to a model of intensive rent in some ways. Can an example be given with these properties?
A model with more types of land provides a setting for comparing and contrasting the orders of efficiency and rentability.
The analysis in this article demonstrates that the wage frontier for cost-minimizing techniques is disconnected from the ordering
of wage curves. How does the order in which lands are introduced into cultivation, at a given rate of profits, relate to the ordering of
wage curves in models with fixed capital? Presumably, the introduction of fixed capital still allows for the order of rentability
to differ from the order of efficiency. More efficient lands are not necessarily paid a higher rent per acre.
Models of rent emphasize the need to consider technical change. Net output can be increased only up to a hard limit.
The introduction of new processes and techniques, a capability to extend the physical life of machines, the discovery
of new natural resources, or decreases in some coefficients of production for existing processes are required to increase
net output beyond that limit. Introduction of such possibilities into the model will result in structural economic dynamics.
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