2.1 1.5 degree consistent degrowth pathway

In this section we explore a transition scenario designed so that the emissions trajectory in the degrowth scenario is ultimately 1.5°C consistent. The parameters necessary to just obtain a 1.5 degree consistent emissions pathway in the degrowth scenario can be determined, approximately, from the sensitivity analysis in Figure 3. The following scenarios assume that the renewable investment rate parameter Δ₁ = 0.105 and $\sigma _{ne}^M = 0.05$. Results for key variables are displayed in Figure 5.

Fig. 5. Trajectories for select SFCIO-IAM model variables assuming Δ₁ = 0.105 and σ^M_ne = 0.05. Growth scenario trajectories (green plots), steady-state trajectories (orange plots), degrowth scenario trajectories (blue plots). The solid red lines in panels (2) and (3) correspond to the 500 GtCO₂ carbon budget and 1.5°C warming threshold, respectively.

In this fast transition scenario, emissions decline rapidly in all three scenarios (panel (1)), with cumulative emissions (panel (2)) remaining below the 500 GtCO₂ budget for the degrowth scenario while transgressing the budget in approximately year 2045 in the growth scenario and year 2050 for the steady-state scenario. Consequently, global mean surface temperatures do not exceed 1.5 degrees in the degrowth scenario by 2050 (panel (3)). Unlike the base case scenario, there is a period of transient economic growth (panel (4)) in both the steady-state and degrowth scenarios associated with the very rapid energy transition being imposed on the model. Panel (6) shows that renewable capital is significantly larger in year 2050 for all three scenarios, and panel (7) indicates that in the degrowth and steady state scenarios, the percentage of electric power demand met by renewable sources is approaching unity.

The key assumption driving these results is the immense upfront investment in renewables assumed in all three scenarios. As shown in panel (8), the renewable investment fraction of real GDP begins at approximately 5% (an order of magnitude larger than that in the base case) and declines slowly over the model run to just over 2%, which is four times that witnessed in the base case scenario. While the renewable fraction of GDP dedicated to renewable investment is similar across all three scenarios, the real magnitude of investments are substantially different given the differences in real-GDP pathways shown in panel (4). That broadly similar climate objectives are realized (emissions and cumulative emissions) across all three scenarios is due to this real difference in investment flows. By year 2051, cumulative renewable investment (in real terms) is approximately 34% larger in the growth scenario as compared with the degrowth scenario which implies that the trajectory of real investments necessary to meet the 1.5 degree target in the degrowth scenario is unambiguously smaller than that in the growth scenario. As discussed further in the modelling section, the SFCIO-IAM model attempts to build new renewable capital rapidly and immediately without assuming a period of slowly ramping up investments which accounts for the high and declining trajectories in panel (8).Footnote ^xiii

As noted in the base case, assumptions concerning changes in energy efficiencies and the underlying climate model have large impacts on the model outcomes. Repeating the sensitivity experiments from the base case indicates similar results for the 1.5 degree consistent scenario. Panel (1) of Figure 6 indicates that for higher rates of manufacturing energy intensity decline the cumulative emissions across all three scenarios become comparable. Importantly, the model shows that for rates of intensity decline higher than approximately 3.5%, all scenarios are capable of reducing emissions in line with the 1.5 degree carbon budget. However, should progress in energy efficiency slow, and consequently energy intensity declines decrease, this result disappears. Indeed, for energy intensity declines less than 1% per annum, both the steady-state and growth scenarios are no longer budget consistent. This result is shown, across a wider range of renewable investment rates in the contour plot in panel (4). Finally, panel (3) indicates a key difference arising from the growth assumptions in that the size of the renewable energy system must be significantly larger in the growth scenario as compared to the degrowth scenario; especially so for intensity decline rates lower than 2%. While not modelled explicitly in this paper, this difference might imply substantial differences in the materials requirements of the energy transition.

Fig. 6. Panels (1) and (3) display a sensitivity analysis of year 2050 cumulative emissions and year 2050 renewable capital stock sizes over a range of per annum energy intensity declines. Panel (2) (grey plots) displays the global average surface temperature trajectories for each of model representative parametrizations of the underlying CMIP5 climate models. Panel (4) displays the contour plot for year 2050 cumulative emissions over a range of energy intensity declines and renewable investment rates. Growth scenario trajectories (green plots), steady-state trajectories (orange plots), degrowth scenario trajectories (blue plots). The solid red lines in panels (2) and (3) correspond to the 500 GtCO₂ carbon budget and 1.5°C warming threshold, respectively.

Given the steady-state scenario is almost consistent with the 1.5 degree carbon budget which gives a 50% chance of remaining within 1.5 degrees of warming, the results of panel (3) in Figure 6 are not surprising. Running the model for parametrizations underlying each of the CMIP5 climate models shows that about half of the pathways remain below 1.5 degrees warming while half exceed the value by year 2100.

Given the emissions reductions results of the above scenario are dependent on both an unprecedented rate of renewable buildout and electrification of end use, it is necessary to explore in greater detail the impacts on the production sectors as well as on households and governments. Figure 7 displays the trajectories for the net worth, loans, and capital stocks for each of the three productive sectors across degrowth, steady-state, and growth assumptions. Across all three growth assumptions the large increase in renewable sector capital (panel (7)) is financed by a transient surge in loans provided by private banks (panel (4)). Ultimately (panel(1)), the net worth of the renewable sector increases significantly over the model run. In contrast to this, the net worth (panel(2)) and capital stock (panel (8)) of the fossil fuel sectors decline steadily. Panel (5) indicates that the fossil-fuel sector eventually begins selling off its capital stock (this selling off is represented as negative loans) given the lack of demand for its output.Footnote ^xiv

Fig. 7. Trajectories for SFCIO-IAM sectoral model variables assuming Δ₁ = 0.105 and $\sigma _{ne}^M$ = 0.05. Growth scenario trajectories (green plots), steady-state trajectories (orange plots), degrowth scenario trajectories (blue plots).

In the SFCIO-IAM model wages paid to households are assumed to simply be the difference between revenues and costs from the three production sectors. As such, the simultaneous increase in loans (and hence loan interest and principal payments) by the renewable and manufacturing sectors accompanied by the decline in fossil-fuel sector revenue act to suppress wages; this is shown in panels (1) and (2) of Figure 8. While wages eventually recover in the growth scenario, they stay permanently lower in the steady-state scenario and decrease continuously in the degrowth scenario.

Fig. 8. Trajectories for SFCIO-IAM sectoral macroeconomic variables assuming Δ₁ = 0.105 and $\sigma _{ne}^M$ = 0.05. Growth scenario trajectories (green plots), steady-state trajectories (orange plots), degrowth scenario trajectories (blue plots).

The role of private banks in the SFCIO-IAM model is simple with banks acting as passive lenders to the production sectors. It is assumed banks have zero-net worth for simplicity. By the mechanics of the scenarios, the demand for loans by the renewable and manufacturing sectors increases substantially, requiring private banks to borrow from the government in order to keep the required reserves on hand which is shown in panel (3). While this pattern holds initially, it reverses in the steady-state and degrowth scenarios whereby banks, eventually end up as purchasers of interest-earning government treasuries after the initial spike in the demand for loans levels off.

4.1 Input–output model

The interrelationships between the three sectors are captured in the following matrix of input–output technical coefficients where the order of sectors on the rows of columns is renewable, fossil fuels, and manufacturing respectively. We assume, for tractability, that the renewable sector does not utilize any inputs from the other sectors to produce its output while the fossil-fuel sector (which we model as vertically integrated) uses some of its own output to power its operation.Footnote ^xix Finally, the manufacturing sector sources both electric power and fuels from the renewable and fossil-fuel sectors (third column):

(11)$$\eqalignno{{\vector A}( {\vector t}) =\cr& \hskip-2.5pc\left({\matrix{ 0 & 0 & {\displaystyle{{P_R\phi_g( t ) k_e^R ( t ) } \over {X^M( t ) }}} \cr 0 & {\displaystyle{{S( 0 ) } \over {EROI( 0 ) \cdot S( t ) }}} & {\displaystyle{{P_{FF}[ {CF[ {\tau_Ek_e^M ( t ) -\phi_g( t ) k_e^R ( t ) } ] + \tau_{FF}k_{ne}^M ( t ) } ] } \over {X^M( t ) }}} \cr 0 & 0 & {a_{33}} \cr } } \right)}$$

Here, the P _i terms denote the prices for each sectors output, while the X ⁱ(t) denotes the total sectoral outputs where (i = R, FF, M).Footnote ^xx S(t) denotes the magnitude of the stock of fossil fuels at time t, while EROI(0) denotes the initial period value for the EROI of fossil-fuel production. Here $a_{22} = {\textstyle{{S( 0 ) } \over {EROI( 0 ) \cdot S( t ) }}}$ is designed to capture the effects of declining fossil-fuel EROI with extraction induced declines in S(t). Chiefly, this formulation implies that as EROI declines, more fossil-fuel sector-derived energy is required to produce any given quantity of fossil-fuel sector output. The differential-equation governing the evolution of the stock of fossil-fuels is given as:

(12)$$\displaystyle{{dS} \over {dt}} = \displaystyle{{-X^{FF}( t ) } \over {P_{FF}}}$$

which states that the stock of fossil-fuels declines with extraction necessary to meet total demand per unit time.

Physical capital in the model is separated into five classifications. Renewable capital is separated, for accounting reasons, into that capital $k_e^R ( t )$ necessary to meet intermediate demand arising from the manufacturing sector, and final demand from households and government $k_f^R ( t )$. The manufacturing sector operates electrified and non-electrified manufacturing capital $k_e^M ( t )$ and $k_{ne}^M ( t )$ respectively. Finally, k ^FF(t) denotes the quantity of fossil-fuel sector capital. All capital types are assumed to be measured in a common physical unit of machines [m]. The terms τ _E and τ _FF denote the power requirements per unit of electrified and non-electrified manufacturing capital, respectively. The term ϕ _g is a ‘grid-corrected’ term denoting the power output per unit of renewable capacity. Finally, CF is the conversion factor between fossil-fuel energy and the electricity produced via combustion.

The matrix ${\vector A}( {\vector t})$ captures two key physical dynamics. First, examining the a ₂₃ element, we see that the demand for fossil-fuel sector output in the form of fuels to power non-electrified capital is given as $P_{FF}\tau _{FF}k_{ne}^M ( t )$. As non-electrified capital is replaced by electrified capital, $k_{ne}^M ( t )$ will decline towards zero indicating a decline in the demand for fuels from the fossil-fuel sector. Second, as the magnitude of renewable sector capital $k_e^R ( t )$ increases, the term $\tau _Ek_e^M ( t ) -\phi _g( t ) k_e^R ( t )$ decreases indicating a decrease in fossil-fuel sector-derived electricity to power electrified manufacturing capital. The a ₂₃ term therefore captures both of the necessary energy transition components; the electrification of the manufacturing sector and the displacement of fossil-fuel sector-derived electricity by that produced by the renewable sector. When both of these phenomena occur in the model the a ₂₃ technical coefficient will be equivalent to zero.

From the matrix ${\vector I}-{\vector A}( t )$ we may calculate the Leontief coefficients necessary to obtain expressions for total sectoral outputs. First the determinant D(t) is given as:

(13)$$D( t ) = \displaystyle{1 \over {( {1-( S( 0 ) /( EROI( 0 ) \cdot S( t ) ) ) } ) ( {1-a_{33}} ) }}$$

which can be used to obtain the following nine Leontief coefficients:

(14)$$L_{11}( t ) = 1, \;\quad L_{12}( t ) = 0, \;\quad L_{13}( t ) = \displaystyle{{P_r\phi _g( t ) k_e^R ( t ) } \over {( {1-a_{33}} ) \cdot X^M( t ) }}$$

(15)$$\eqalign{L_{21}( t) = & 0, \;\quad L_{22}( t) = \displaystyle{1 \over {1-S( 0) /( EROI( 0) \cdot S( t) ) }}, \;\cr L_{23}( t) = & \displaystyle{{P_{FF}( t) [ CF[ T_Ek_e^M ( t) -\phi _g( t) k_e^R ( t) ] + \tau _{FF}k_{ne}^m ( t) ] } \over {( {1-S( 0) /( EROI( 0) \cdot S( t) ) } ) ( 1-a_{33}) X^m( t) }}} $$

(16)$$L_{31} = 0, \;\quad L_{32}( t ) = 0, \;\quad L_{33} = \displaystyle{1 \over {1-a_{33}}}$$

Assuming, that renewable generation displaces fossil-fuel generation when new renewable capacity comes online (therefore making fossil fuel the provider of the residual power requirements) we may write the following expressions for each sector's final demand:

(17)$$C^R( t ) + G^R( t ) = P_R\phi _g( t ) k_f^R ( t ) $$

The final demand for fossil fuels is therefore given below as the difference between the energy demands C ^e(t) + G ^e(t) and that provided by the renewable sector:

(18)$$C^{FF}( t ) + G^{FF}( t ) = C^e( t ) + G^e( t ) -P_r\phi _g( t ) k_f^R ( t ) $$

The final demand faced by the manufacturing sector is given the sum of consumption, government, and investment expenditures:

(19)$$I( t ) + C^M( t ) + G^M( t ) = Y( t ) -C^E( t ) -G^E( t ) $$

Finally, combining the Leontief coefficients with these expressions for sectoral final demands we can write the following expressions for the total sectoral outputs:

(20)$$X^R( t ) = L_{13}( t ) Pr\phi _g( t ) k_f^R ( t ) + L_{23}[ {Y( t ) -C^E( t ) -G^E( t ) } ] $$

(21)$$\eqalign{X^{FF}( t ) & = L_{22}( t ) [ {C^E( t ) + G^E( t ) -Pr\phi_g( t ) k_f^R ( t ) } ] \cr & \quad + L_{23}( t ) \cdot [ {Y( t ) -C^E( t ) -G^E( t ) } ] } $$

(22)$$X^M( t ) = L_{33}[ {Y( t ) -C^E( t ) -G^E( t ) } ] $$

Each sector (renewable, fossil fuel, and manufacturing) operates a stock of capital whose output, in physical terms, is proportional to the magnitude of the capital stock. Therefore, the physical output (supply) of each sector per unit time is give as:

(23)$$s_R( t ) = \phi _g( t ) ( {k_e^R ( t ) + k_{ne}^R ( t ) } ) $$

(24)$$s_{FF}( t ) = \phi _{FF}( {k^{FF}( t ) } ) $$

(25)$$s_M( t ) = \phi _M( {k_e^M ( t ) + k_{ne}^M ( t ) } ) $$

The ϕ terms appearing in the above three supply equations have a simple and natural interpretation as parameters denoting the output per unit of capital. For example, ϕ _g(t) is the power output per unit of renewable capital.

The above equations state the physical supply of each sector's output per unit time. To be physically sensible, this supply in physical terms must match the demand in physical terms. Using the sectoral final demands as measures of the total physical demand for each sector's production, we define prices as the mechanisms that equate physical supply and demand at any given moment:

(26)$$P_R( t ) = \displaystyle{{X^R( t ) } \over {\phi _Rk^R( t ) }}$$

(27)$$P_{FF}( t ) = \displaystyle{{X^{FF}( t ) } \over {\phi _{FF}k^{FF}( t ) }}$$

(28)$$P_M( t ) = \displaystyle{{X^M( t ) } \over {\phi _M( t ) k^M( t ) }}$$

Having defined the physical supply and demands, and the price mechanism in the model, we may turn to investment. Assuming capital is valued at replacement cost and since capital is the output of the manufacturing sector in this model, the replacement cost is simply the price of manufacturing sector output P _M(t) multiplied by the magnitude of capacity being replaced. The non-renewable sectors invest in new capital in order to close the gap between the demand for its output at some target normal price and its current capacity. The renewable sector invests in new capital until it meets all power requirements in the model:

(29)$$i_e^R ( t ) = \Delta _1( {\mu_1\phi_g^{{-}1} \tau_Ek_e^M ( t ) -k_e^R ( t ) } ) $$

The bracketed term in Eq. (29) is the difference between the capacity of renewable generation necessary to power electrified manufacturing capital $\tau _Ek_e^M$ and the currently built capacity $k_e^R$. The parameter Δ₁ is the rate at which the gap closes while μ ₁ denotes the percentage of excess capacity that the renewable sector aims to construct. The remaining investment equations follow the same logic:

(30)$$i_f^R ( t ) = \delta _1\mu _1\phi _g^{{-}1} P_R^{{-}1} [ {C^E( t ) + G^E( t ) } ] -\Delta _1k^R( f ) $$

(31)$$i^F( t ) = \Delta _2\mu _2\phi _{FF}^{{-}1} ( t ) P_{F0}^{{-}1} X^{FF}( t ) -\Delta _2k^{FF}( t ) $$

(32)$$i_e^M ( t) = \Delta _3\mu _3\phi _M^{{-}1} ( t) P_{M0}^{{-}1} X^M( t) -\Delta _3k_e^M ( t) + \Delta _3k_{ne}^M ( t) ) $$

Finally, aggregate investment in monetary terms is determined by valuing the above investment terms at the price of manufacturing sector output. Therefore, we have that:

(33)$$I( t ) = I^R( t ) + I^{FF}( t ) + I^M( t ) = P_M( t ) [ {i_e^R ( t ) + i_f^R ( t ) } ] + P_M( t ) i^{FF}( t ) + P_M( t ) i_e^M ( t ) $$

Each sector finances their investment via loans received from private banks upon which they must make both interest payments and pay back the principal. The capital stocks of each sector grow with investment and decline with depreciation. Finally, each sector finances the purchase of new capital via loans taken from private banks. For example, the stock of physical capital held by the fossil fuel sector is determined by the differential equation:

(34)$$\displaystyle{{dk^{FF}} \over {dt}} = i^{FF}( t ) -\sigma _{FF}( t ) k^{FF}( t ) $$

where σ _FF(t) is an endogenous depreciation rate. The magnitude of the loans extended to the same sector is governed by:

(35)$$\displaystyle{{dL^{FF}} \over {dt}} = Pm( t ) i_e^{FF} ( t ) -Z_{FF}L^{FF}( t ) $$

where Z _FF denotes the fraction of the total outstanding loan repaid per unit time. The dynamics for all of the capital stocks and loans are shown in Table 1. Finally, we assume that the banking sector acts as passive lenders, extending loans to the three sectors as required to finance their capital investment.

Table 1. State variables and their associated differential equations

4.2 Renewable power dynamics

Following the discussion in the Introduction, we denote the storage fraction ϕ(t) as a linearly increasing function of the ratio of total renewable electric power produced to that of total electric power consumed in the model where an increase in this ratio indicates that variable renewable generation provides a greater fraction of total electric power in the model. This ratio, ψ(t) is denoted as follows:

(36)$$\psi ( t ) = \displaystyle{{\phi _R( {k_e^R ( t ) + k_f^R ( t ) } ) } \over {\tau _Ek_e^M ( t ) + ( {C^E( t ) + G^E( t ) } ) P_r^{{-}1} }}$$

where ϕ _R is the power output per unit of renewable capacity before taking into account possible energy losses due to storage. Therefore, the numerator is the total electric power produced by the models stocks of renewable energy capital $k_e^R ( t ) + k_f^R ( t )$ divided by the quantity of electric power consumed by the electrified manufacturing capital $\tau _Ek_e^M ( t )$ and the electric power demanded as part of household and government final demand $( {C^E( t ) + G^E( t ) } ) P_r^{{-}1}$.

Now letting a and b determine the minimum and maximum values that ϕ(t) can obtain, the storage fraction is given as the following function of ψ(t):

(37)$$\phi ( t ) = a + b\psi ( t ) $$

Here a is the base level storage fraction that occurs at zero VRE penetration (we assume a = 0 in all modelling) and b is given as the upper bound storage fraction minus a so that when VRE penetration is at 100%, ψ(t) = 1 and therefore ϕ(t) will be equivalent to its upper bound value.

The grid-corrected power output ϕ _g(t) is therefore given as a function of the EROI of the renewable technology, the storage fraction, and the ESOI of electrical energy storage. See Appendix C for a full derivation.

(38)$$\phi _g( t ) = \left({\displaystyle{{1-\phi ( t ) + \eta \phi ( t ) } \over {1/EROI_R + \eta \phi ( t) /ESOI_e}}} \right)\displaystyle{{\phi _R} \over {EROI_R}}$$

4.3 Climate

In this section we introduce the (BEAM) carbon cycle model of Glotter et al. (Reference Glotter, Pierrehumbert, Elliott and Moyer2013) in order to link the emissions produced by economic activities to atmospheric concentrations while also capturing some key carbon-cycle processes. BEAM models a three-reservoir carbon-cycle system where M _at, M _up, and M _lo are the masses of inorganic carbon in the atmosphere, upper ocean, and lower ocean respectively. A set of three coupled non-linear differential equations governs the evolution of each the stocks of carbon which are presented as follows:

(39)$$\displaystyle{{dM_{at}} \over {dt}} = E( t ) -k_a( {M_{at}-A\cdot BM_{up}} ) $$

(40)$$\displaystyle{{dM_{up}} \over {dt}} = k_a( {M_{at}-A\cdot BM_{up}} ) -k_d\left({M_{up}-\displaystyle{{M_{lo}} \over \delta }} \right)$$

(41)$$\displaystyle{{dM_{lo}} \over {dt}} = k_d\left({M_{up}-\displaystyle{{M_{lo}} \over \delta }} \right)$$

where E(t) is an emissions term. Global average surface temperatures in the SFCIO-IAM model are obtained using the two-component energy balance model (2-EBM) described in Geoffroy et al. (Reference Geoffroy, Saint-Martin, Olivié, Voldoire, Bellon and Tytéca2013). The equations that govern the evolution of the global mean surface air temperature T and the temperature of the deep ocean T ₀ are given as:

(42)$${\cal C}\displaystyle{{dT} \over {dt}} = {\cal F}( t ) -\lambda T-\gamma ( {T-T_0} ) $$

(43)$${\cal C}_0\displaystyle{{dT_0} \over {dt}} = \gamma ( {T-T_0} ) $$

where ${\cal F}( t )$ is a radiative forcing term given by:

(44)$${\cal F}( t) = \displaystyle{{{\cal F}_{2x{\rm C}{\rm O}_2}} \over {\ln ( 2) }}\ln \left({\displaystyle{{M_{at}( t) } \over {[ M_{at}^0 }}} \right)$$

where $M_{at}^0$ is the reference period (pre-industrial) mass of atmospheric carbon. Finally, emissions E(t) are given as:

(45)$$E( t ) = \displaystyle{{\zeta X^{FF}( t ) } \over {P_{FF}( t ) }}$$

which states that emissions per unit time E(t) are proportional to the total physical output of the fossil-fuels sector by a factor ζ.

Finally, we turn to the climate feedback which is included in the form of a damage function whose output losses are shared between declines in the productivity parameters of each sectors capital, and to enhanced depreciation of the capital stocks. We use the form, calibrated so that D(t) = 0.5 at $T = 6^\circ {\rm C}$, proposed by economist Martin Weitzman as follows (Weitzman, Reference Weitzman2012):

(46)$$D( t ) = 1-\displaystyle{1 \over {( {1 + \pi_1T( t ) + \pi_2T{( t ) }^2} ) + \pi _3T{( t ) }^{0.6754}}}$$

The climate damage D(t) is shared out between impacts on the ϕ _i productivity terms and the depreciation terms the σ _i (i = R, F, M) using an approach similar to that in Moyer et al. (Reference Moyer, Woolley, Matteson, Glotter and Weisbach2014). A fraction β of the D(t) damages occurs as additional depreciation to the capital stock k ⁱ(t) leading to the following climate damage modified depreciation term:

(47)$$\sigma _i( t ) = \sigma _i + \beta D( t ) $$

while the climate damage modified productivity terms are given as:

(48)$$\phi _i( T ) = \phi _i\cdot \left({\displaystyle{{1-\alpha } \over {1-\beta \alpha }}} \right)$$

The full model boils down to the following set of 15 coupled non-linear differential equations which are expressed in Table 1.