Metastable Features in an Ising Model

In the Ising model metastable features have been widely studied. Consider an Ising model with Hamiltonian (1) where J represents the interaction of neighbors, and H indicates the external field. In the absence of an external field, and below the critical temperature, the symmetry is broken and the system finds a non-zero magnetization. This means that the majority of spins choose the same direction, say a downward direction. Now, if we impose an external field in the opposite direction (say upward), from the theoretical point of view the majority of spins should flip upward putting the system into its other vacuum. Although theoretically, in the presence of an external field the free energy is no more symmetrical, and the system should fall into its global minimum, but the process is still time consuming. Now let’s see how it works. From a free energy point of view, after imposing an upward magnetic field, the global minimum would be around m ≈ 1, see Fig 1. If we look at micro levels however things are different.

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Fig 1. Below the critical temperature, the system is in its minimum with m ≈ −1.

By imposing a weak upward external field, although the symmetry breaks and theoretically the system should move to its global minimum, in fact it should pass a local maximum. In such cases transitions are time consuming.

https://doi.org/10.1371/journal.pone.0160363.g001

At microlevel, for a chosen spin, in average the neighbors are downward. If the stimulating field is weaker than 4J, choosing an upward direction for the spin would result in having a higher level of energy, see Fig 2. Due to the Boltzmann energy probability, the spin is unwilling to comply with the external field. In the language of game theory, it is similar to the prisoner dilemma problem. If all spins choose an upward direction, the total energy will be lower and every dipole would be better off. For a sole spin however flipping upward is to get in a higher level of energy causing an unwanted situation. In a network of firms in recession, if all firms simultaneously decide to hire new labors and work with maximum capacity, everybody is better off. For a single firm, starting production with maximum capacity while orders are in minimum level is a risky act that most probably results in loss. From a Keynesian point of view a government stimulating policy similar to a magnetic field helps economy to escape from its unwanted minimum to a favorable one.

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Fig 2. While the direction of all spins are downward, we have imposed a stimulating upward field.

Theoretically, if all spins turn upward, the level of energy will be minimum. In the meantime however if the external field is weak, each spin needs to overcome forces by its neighbors and go to a higher local level of energy. This is not a favorable transition for each spin. For strong fields things are different. If the stimulating field is about 8J, the spin feels that all neighbors are upward and flip easily.

https://doi.org/10.1371/journal.pone.0160363.g002

Let’s go back to our Ising model. After imposing a magnetic field, gradually more and more spins flip upward. In our problem we are concerned with the lifetime of the metastable state. Suppose that below the critical temperature our system has chosen the downward direction with magnetization per site close to −1. If a stimulating upward magnetic field with a low intensity H is imposed, since the force experienced by each spin due to its neighbors is bigger than the stimulating field, the chance for the spin direction to flip is low. As time goes by, however gradually the stimulating field manages to flip more and more spins upward. When half of the spins are upward, in average for each spin, the forces of neighbors cancel out, outing us from a metastable trap. In this situation our stimulating field easily forces the spins to take an upward direction. The period that it takes for the stimulating field to drive magnetization from its initial value to a zero value is called the metastable lifetime denoted here by τ.

Generally, the size of the system, its temperature, and the intensity of the stimulating field can influence the lifetime of the metastable states. Most studies in cited papers take the temperature around 0.8T_c. When we study the response of the system to the stimulating field we basically define four separate regimes. The lifetime of metastable states has been depicted schematically in Fig 3, see [14] for more details.

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Fig 3. The schematic life time of metastable states as a response to the strength of the stimulating field from [14].

The weaker the stimulating field, the longer the life time. The first two regimes on the right are stochastic regimes in which the life time is not only long but also has serious variations. These two regimes are named as the coexistence regime and the single droplet regime. For stronger fields we have two regimes in which transition from metastable states happens in a deterministic way with a small variation. These two regimes are called multi droplet and strong field.

https://doi.org/10.1371/journal.pone.0160363.g003

Let’s explain what Fig 3 represents. At the right hand side of the graph we show the responses of the system to very weak fields. When the stimulating field is too weak the lifetime of the metastable states can be dramatically high. For finite size systems in this regime, the model lives in a coexistence regime in which thermal fluctuations are even more important than the stimulating field. In this regime even if the system moves upward, although thermal fluctuation dipoles may move downward again, the regime is however a stochastic regime in which the variance of the lifetime is comparable with its mean value. Both the magnitude of the lifetime and its variance depend on the size of the system, which dramatically grows as the size grows. Such a regime is called a “Coexistence” regime.

The second regime is called the single droplet regime. In this regime the stimulating field is a little bit stronger, and the system would finally go to its global minimum. The lifetime is however long and the response of the system is stochastic. We should wait for a chance for the formation of a droplet with upward spins. This droplet takes a long time to grow and capture the whole system. Although in this regime we can find an average value for the lifetime, the variance is still comparable with the average value. So, the regime is still a stochastic regime. This regime is called the “Single Droplet” regime.

The third regime is where the stimulating field is strong enough to form lots of droplets and grow in a manner to escape from the metastable trap in a predictable period. The lifetime is not stochastic anymore and would be (2) in which c₁ and c₂ are constants. As we expect, the lifetime dramatically decreases as the stimulating field increases. This regime is called the “Multi Droplet” regime.

The last regime is called the “Strong Field” regime. It is a regime in which the stimulating field is strong enough to allow each spin to have a chance to flip. The rate is so high that we do not need to wait for some survivable droplets to form.

Relation Between Macroeconomic Variables and the Ising Model

In the previous section we reviewed the responses and the lifetime of metastable states in the Ising model. We now need to interpret these responses in the language of economy. We need to report a minimum bound and money value of a fiscal stimulation. For the beginning let’s consider a cubic D dimensional lattice. In D dimensions each dipole has 2D neighbors. In a downward vacuum their force on a dipole is around −2DJ, see Fig 2. If they all turn from a downward direction to an upward direction, their force on our dipole is equal to 2DJ. Our stimulating field appears as H. In a downward vacuum each spin feels a downward force from neighbors almost equal to −2DJ, where if the stimulating field is about 4DJ each spin feels a net force equal to 2DJ. In this case, each spin can simply suppose that all of its neighbors are upward and there is no exogenous field.

On the economy side we supposed that the transfer of goods or money between firms forces them to chose a downward or upward direction. Suppose that in an expansion when all firms and corporations work with maximum capacity, the GDP is in its maximum level which we denote as GDP₊. In a recession when all firms work with their minimum capacity, the GDP is in GDP₋ level. Let’s denote the difference between this gap as ΔGDP = GDP₊ − GDP₋. In a recession, when all firms work with a minimum capacity, if the government has a purchase as big as ΔGDP, then it has compensated for the reduction of purchase by its neighbors. If we compare it with our Ising model, we find that a stimulation as big as ΔGDP resembles a stimulating field as big as 4DJ.

Stimulating bill may be designated to be spent for periods more than one year. In this case we need to write (3) where N is the number of spins in the lattice or the number of nodes in a network, and τ is the time interval or Monte Carlo steps that we stimulate the Ising model.

A point that should be noted is that our transformation of parameters for the Ising model to the macroeconomics variable is true if we suppose that the firms decide for their production level on an annual base. Actually, lots of contracts with labors are on annual basis. This however by itself does not mean that firms change their strategies on an annual basis since contracts of different labors may be expired in different months. Strategies however will not change with a monthly basis. Firms can bear with fluctuations of a couple of months with their inventory investments. This discussion however is of importance in the interpretation of our findings. In the end of the paper we will recall this matter and discuss the robustness of our findings for this interpretation. For now let’s suppose that firms change their strategies on an annual basis.

In metastable studies the strength of the stimulating field has been discussed. In economy however we are mainly concerned with the budget. So, not only the strength of stimulation in each year, but also the period in which this stimulation should be imposed is important. As a result, the term that is important for us is τH rather than τ or H. If there is a minimum bound for the term τH to move an Ising model from one of its vacuums to the other, it means that for our network of firms there is a minimum bound for an effective stimulation. So, we seek to find the minimum of τH in the Ising model.

As discussed in the previous section, to classify the lifetime of the metastable states we have four different regimes. The first two regimes where the stimulating field is too weak are not of our interest. This is because the lifetime is stochastic. Neither politicians, nor policy makers are interested in a stimulation that has a stochastic lifetime. Politicians will loose their positions and policy maker will loose their reputation. The first goal of a stimulation is to trigger economy from recession to an expansion in a proper period of time. So, we leave the stochastic regimes in Fig 3 aside and focus on Multi-Droplet and Strong-Field regimes.

In the Multi-Droplet region the lifetime has been indicated in Eq (2). Our aim is to find the minimum of τH or . This function is clearly a decreasing function of H. So, the bigger the magnitude of the magnetic field, the smaller the τH. So, to find a minimum for τH we are forced into the Strong-Field region.

Response of an Ising model to a strong magnetic field has been discussed in [18] and [19]. The lifetime has been of interest in the mentioned references. Since we need to find the minimum of the term τH rather than τ we need to run our own simulations.

We considered a two-dimensional 1024*1024 cubic lattice at T = 0.8T_c with a system living in its downward vacuum. We then imposed a magnetic field and updated each spin through the Monte Carlo method with the Glauber weight. We draw τH as a function of H in Fig 4. This figure deserves attention; first of all both strong and weak fields result in a higher value of τH. It is clear why weak fields result in higher rates of τH. This is because for weak fields the chance for every spin to flip is small. Strong fields as well result in higher values for τH; the reason for this is that to flip every spin we do not need a field stronger than the neighboring effects which is equal to 4J. The minimum of the curve however is obtained for H ≈ 2DJ. This means that for a minimum stimulation, the government needs to impose incentives for corporations with a rate that compensates for half of the reduction of orders in the recession. In the minimum, we have τH = (3.877 ± 0.004)J. Such a field suggests a minimum for fiscal stimulation equal to 0.48ΔGDP. For such stimulation, before we update each site once in an average, the magnetization tends to zero. In other words, the lifetime is below one Monte-Carlo step.

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Fig 4. The result of our simulation for finding τH for metastable states has been graphed.

H is in units of J (the coupling constant). The model is a two dimensional 1024*1024 lattice. The current figure is for one iteration. The minimum of τH is obtained (3.877 ± 0.004)J for 100 iterations.

https://doi.org/10.1371/journal.pone.0160363.g004

Studying Small World Network

A regular cubic lattice for the network of firms is applicable for a very simplified world. A better approximation can be reached via going to a more realistic network. In this line we focus on Watts-Strogatz network. We consider networks with 2m neighbors and let m vary from 2 to 32. The result of this simulation is depicted in Fig 5. As it can be seen in the figure, as the degree of nodes grow, the minimum grows accordingly. Minimums of τH as a function of m has been depicted in Fig 6. It can be seen from the figure that the minimum of τH grows linearly with m. This is a good news for us. If we look at Eq (9), we notice that a linear growth of the minimum of τH means a unique answer for a suggested bill. This means that to find a minimum for the stimulation policy we do not need to know the degree distribution of the network as long as it is a Watts-Strogatz one. Our suggestion for the minimum of the stimulating bill will be robust against the variation of the degree as long as the variation of degrees is not divergent. For large m, the minimum merges to 0.878 ± 0.027. So, the minimum bound for stimulation is bill = (0.439 ± 0.013)ΔGDP.

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Fig 5. The result of simulation for Watts-Strogatz small world.

As long as the degrees grows, the minimum for τH grows.

https://doi.org/10.1371/journal.pone.0160363.g005

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Fig 6. The minimum of τH grows linearly with the degree of nodes.

So, the ratio of τH/2mJ tends to an almost constant rate.

https://doi.org/10.1371/journal.pone.0160363.g006

Actually if in Fig 5 we re-scale each curve by the degree of the network or m, the results give the curves of Fig 7. As it can be seen, all curves are unified through this scaling. Let’s see how it happens. In the strong field regime where we impose an intense stimulating field, after only a few Monte Carlo steps the system moves from one of the metastable states to the other. This means that with such strong fields, each node does not have enough time to be influenced by the far nods. Only close neighbors are important. In this case the mean field approximation works properly.

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Fig 7. If in a small world we re-scale the curves with the degree of nodes, then all curves fit together.

This means that all networks suggest the same minimum bound for the stimulating field.

https://doi.org/10.1371/journal.pone.0160363.g007

Let’s suppose that in our network each node in average has 2D neighbors. For dynamics of magnetization we can write (4)

Since we have supposed that T = 0.8T_c where T_c is proportional to D, Eq (4) reduces to (5) in which C is independent of the dimension or degree of nodes. Now, if we re-scale H as h = H/2DJ, the equation reads as (6)

As it can be seen after re-scaling H by a factor of 2DJ, we find a unique equation for its dynamics. This is why in Fig 7 after re-scaling the size of the stimulation by the degree of nodes we find a unique curve. So, the minimum of τH grows with the average of the degree of nodes.

Our observation implies that in Eq (9) the size of the minimum successful bill is universal. In other words it is independent of the number of neighbors or degree average of nodes. We however should be careful since in our mean field argument we supposed that we could work with the average of neighbors. Our proof holds true if the standard variation of the degree of nodes is small in respect to its average. If we are working with scale free networks then we need to be more careful. We have omitted such cases at the current level.

Budget Constraint: If a government does not have enough budget to impose a big stimulation in one year, although the annual spending can be lower, the whole spending should be higher. In Fig 8 we see both τH and τ in terms of the strength of stimulation. The lowest budget can be effective when stimulation is imposed for only one period which is 0.44 of the GDP gap. If the government has a budget constraint and is willing to stimulate the economy for more than one period, then this figure comes handy. The green curve shows the period that a stimulation needs to be imposed and the red curve shows the value of the total stimulus bill. If for example the government aims to stimulate the economy in 3 years, then the value of stimulation would be about 0.64ΔGDP, and if we have a two year plan, the minimum bound would be around 0.54ΔGDP.

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Fig 8. In this figure we have graphed both the average of τH and τ for fifty iterations for a Watts-Strogatz network with degree of 16.

Such a graph comes handy for the case that we have limits for the budget in each year. If we aim to stimulate the market in periods longer than one step, then we can work with this figure in an Ising simulation of the network of firms. If for example instead of one Monte Carlo step we aim to stimulate the market in three steps, then it means that the size of H is about 0.42. This strength suggests the value of 1.25 for τ be equal to H. This means that in this case, the total bill is about 0.62ΔGDP. So for a three year stimulation, in each year we need a stimulation around 0.21ΔGDP. For a two-year spending stimulation we need about 0.53ΔGDP for the whole bill and 26%ΔGDP for each year.

https://doi.org/10.1371/journal.pone.0160363.g008

Results for the Great Recession

In this section we aim to find what our model suggests for the minimum stimulation for the United States. However finding a minimum is a bit hard. This is because in the year 2009 when the GDP was declining, stimulation was imposed. So, in one hand we had an avalanches of defaults and on the other we had stimulation being imposed. As a result extrapolating an exact value for the real gap is not possible. We however try to do our best and have at least a rough guess for the minimum bound based on our analysis.

To extrapolate the gap of GDP for the United States we considered the time series of the real growth rate between the years 2000 and 2007. A linear extrapolation suggested a real growth around 2.5% for 2008 and 2009. In spite of this 5% growth, the economy of the US declined about −0.3 in 2008 and −2.8% in 2009. So, a rough guess for the gap is 8.1%. The major part of Obama’s stimulus package or “The American Recovery and Reinvestment Act of 2009” was spent in the years 2009 and 2010. The minimum size suggested by our model for a two year period according to Fig 8 is around 0.54ΔGDP. The GDP of the US in 2007 was around 14938 billions of 2009 US $. So, our model suggests a minimum bound for stimulation around bill = 0.54 ∗ 0.081 ∗ 14938 × 10⁹$ ≈ 650 billion $.

Obama’s stimulation policy bill “The American Recovery and Reinvestment Act of 2009” was firstly 787 billions. Later the bill was revised to 831 billions. The bill was to be spent between the years 2009 and 2019. The major part however was spent during 2009 and 2010. As of the second quarter of 2010, about 480 billions had been spent. As of the first quarter of 2011, around 670 billions had been spent [37]. So, the spent bill for the first two years would be a bit over our threshold.

If we repeat such analysis for the European Union we reach a minimum bound around 4.7% of GDP. This is while “The European Economic Recovery Plan” stimulus bill was around 1.5% of GDP.

In the US, in the first quarter of 2009 according to the OECD database, unemployment was about 8.27%. It reached its peak in the forth quarter of 2009 equal to 9.93%. Then it started to reduce where in the second quarter of 2011 reached 9.07%. So the bill was successful in reversing the growth trend of unemployment and reduce it from its peak by 1%. The major part of the bill was spent through 2009-2010. Part of the bill however was spent in the years after. Unemployment kept its decreasing trend where the US finally managed to overcome the recession. In the EU things went in different ways. In the first quarter of 2009 unemployment was 8.27% reaching its local peak by the first quarter of 2010 equal to 9.56%. The bill however was not able to reverse the growing trend substantially. It experienced its lowest rate in the first quarter of 2011 which was 9.39% which was only 0.3% below the peak. Unemployment then grew gradually and the EU could not overcome the recession.

For sure there has been a wide range of policies affecting economy. Extensive monetary policies held by the Central banks are of the most serious. To have a reliable conclusion one needs to consider a careful temporal pattern of spending in a number of countries. Still a conclusive conclusion can not be reached unless taking in to account effects such as monetary stimulation. So, we can not attribute the recovery of the US economy totally to the fiscal stimulation act. Nevertheless the stimulus act has been of great importance. Based on our simple model the US stimulus package was above the minimum barrier of the metastable feature of the network where the European one was far below it. So, at least at the first level of approximation, our model provides a successful prediction for the two major economies of the world.

The Golden Time Passage

Our study notified the metastable feature of the market. It is a prisoner dilemma. In recession, if a major portion of employers hire more labor and increase their production, the hired labors will buy more and everybody including managers are better off. If however only a small portion of firms do this, they will be losers. So, in spite of the global benefits, local interests prevent the market from reaching its best situation. However as time goes by, a shock such as a technological shock or demand shock may trigger the market to a global extremum, but it would be time consuming. For the Great Depression, the World World War II rose such a demand. A fiscal expansionary policy aims to stimulate a major portion of firms to rise their production and recover the economy in a reasonable period. We found that there was a minimum bound for a successful stimulation. Our results are however vulnerable to the interpretation of the Monte Carlo steps to the real time. To reach Eq (9) we considered a Monte Carlo step as of one year.

Actually if policies of managers are changed within a period of T, we need to modify Eq (9) to (9) in which T is expressed by the unit of year. If managers decide to cut or rise their production quarterly, the minimum bound would be one fourth of our previous suggestion. The point is that in a deep recession, if an employer has fired part of her employees then it would be unlikely that she changes her mind easily. Even if for a few months the orders grow, a manager may hesitate to employ new labors. If decline in production is due to decrease of working hours, however, then it will be much easier for managers to rise their production. So, when we want to translate the result of our simulation to the language of economy, we need to be clear about the situation. In the case that only working hours have been decreased, the minimum bound for a successful stimulation can be much lower as long as the stimulation is shovel ready. In that case, managers can easily change their mind and rise working hours. So, an update in a Monte Carlo step, or actually an update for a new level of production for each agent can happen in a much shorter time. As a result, the minimum bound would be much lower.

If we look over the big economies through the years 2008 to 2009 we observe that the decline in the GDP growth rate starts a couple of months before the rise in unemployment, see Fig 10. In this figure we have depicted two time series. One of the time series is the GDP growth rate, and the other is the changes in unemployment times minus one. Changes in unemployment has negative correlation with the GDP growth rate under the Okun’s law. In this figure we however show that in the time of crisis this correlation has a lag. Since graphically it was easier to show the lag of our correlated parameters, we multiplied the variation of unemployment by minus one.

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Fig 10. In this figure we have depicted both the changes in GDP and unemployment.

The green curve shows quarterly growth rates of GDP. The blue curve shows the changes of unemployment in sequential quarters times −1. Unemployment and the GDP growth rate have negative correlation. Since we aim to show the lag between these two parameters at the time of crisis we multiplied the changes in unemployment by −1. As it can be seen at the time of crisis, the GDP declines before unemployment rises. The lag between the growth rate and unemployment is the golden time passage for a stimulation. Source: OECD.

https://doi.org/10.1371/journal.pone.0160363.g010

As it can be seen in the Fig 10, in almost all countries, GDP starts to decline a few months before unemployment starts to rise (or its negative form declines). The data from OECD has been rewritten in Table 1. In Germany for example during the forth quarter of the year 2008 and the first quarter of 2009, the GDP declined 6.4%. In the same period, unemployment raised less than half a percent. During the same period while the GDP had declined more than 3% in France, unemployment had grown less than 1.2%. In Japan as well, despite a decline around 6.7%, unemployment only grew around 0.5%. This observation is not surprising. This is due to the fact that on one hand lots of annual based contracts had already been signed, while on the other the everlasting attitude of managers in decreasing working hours before making decision and firing part of the employees existed.

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Table 1. GDP growth rate and unemployment rate of G7 and the E.U. Source: OECD.

https://doi.org/10.1371/journal.pone.0160363.t001

Now, we notify that our observations on metastable features suggests a golden time passage for a fiscal stimulation. This time passage is the period that after a shock such as the bubble burst of 2008 firms abruptly reduce their production as a precautionary act for decline in orders. Besides, people as a precautionary act reduce their consumption. This is while firms still have not fired their employees. Since during this time passage re-rising production for managers is much easier, and a Monte Carlo step means a shorter time in the real world, a minimum bound for a successful stimulation is much lower. A rough estimation from the time series in Fig 10 suggests that this time passage could be around two quarters. So, a serious lesson from studying the metastable feature is that when a shock such as the 2008 crash irrupts making us to expect a recession, we better hurry to impose stimulation instead of sitting for negotiations in congress and offices. In that case a much smaller stimulation may prevent economy from falling into a deep recession. In this time passage every single day counts. As time goes by the minimum bound for a successful stimulation rises. We should notice that at the time of crisis we have a percolation of the crisis between different sectors of the market. Such percolation itself emphasizes a fast response. Our observation however suggests that if the imposed simulation takes place fast, even a small fiscal stimulation might prevent the recession to percolate. The efficiency of the stimulation is highest in the period between two acts; the cut down in working hours and the resulting labour firing. A relatively small but very fast stimulation before the second act is more effective than a pretty large stimulation after the firing process.