Added in v0.4.2
Fusion power plants could be a future source of clean, firm electricity. Most proposals for fusion plants use a thermal cycle, where the energy of fusion heats a working fluid. The working fluid passes through a turbine connected to a generator. These plants would be broadly similar to fission plants. They might also have some fusion-specific operational behaviors, which are implemented in this module.
This fusion module is implemented only for thermal plants with unit commitment (THERM=1).
(Some proposals for fusion plants, notably those by Helion Energy, would not need a thermal cycle and are not well-described by this module.)
There are three domains in which a fusion plant of this model may differ from a standard thermal plant.
- Parasitic power. Fusion plants may require significant parasitic ("recirculating") power for various subsystems, or to initiate and drive the reactions.
- Hourly-scale pulsed operational behavior. Pulsed tokamak plants may need to operate in cycles lasting one to a few hours.
- Maintenance and associated constraints. Maintenance may be more significant for fusion than other plants, and materials-engineering-related limitations may constrain plant operation.
There are nine optional parameters for fusion in this model; all can be mixed and matched. Some of the properties span more than one of these domains.
Fusion plant designs often require significant amounts of electrical energy (and instantenous power)
- to maintain the vacuum pumps, cryogenic systems, tritium plants,
- for heating systems, control magnet systems, target manufacturing, or lasers,
- or for starting up a fusion plasma pulse.
These correspond to what we term
- Passive parasitic power: systems which are always on regardless of whether the plant is in the committed state (actively producing electricity). These parasitic loads may be reduced during extended scheduled maintenance periods.
- Active parasitic power: systems which are required while the plant is producing electricity. In magnetic fusion devices the amount of power required for these systems is likely nearly independent of the power level of the plant. Therefore in this model the active parasitic power depends on the commitment state of the plant, not the power level.
- Pulse start power and pulse start energy. Magnetic fusion devices may require a large amount of power to start the plasma pulse. This can be up to hundreds of MW, but only for a few seconds to minutes. GenX is an hourly electricity systems model, so this behavior cannot be resolved in detail. Instead, the peak power draw from the grid and the time-integral of the power draw (pulse start energy) are input parameters.
The pulse start power is used as part of the capacity reserve margin formulation, and the pulse start energy is used elsewhere. (In practical designs this power draw would largely be buffered on-site, so the external grid would not see a sudden spike.)
Pulsed tokamaks (as opposed to steady-state tokamaks) often call for an operational cycle where the plasma is on for 30 minutes to a few hours before carefully being drawn down. The maximum pulse length is typically limited by the engineering of the "central solenoid", one of the large magnets. A dwell time of a few minutes to 30 minutes is taken to allow various systems to be reset and readied for the next plasma pulse; during this time there is no plasma and no fusion occuring. Restarting the plasma may require a significant amount of parasitic power draw, described above.
Starting a plasma pulse stresses the central solenoid (for pulsed tokamaks), magnets more generally (in other designs), first wall components, and other systems. Concerns of cyclic thermal fatigue may limit the number of pulse starts.
This module implements a limit expressed in maximum starts per year.
Maintenance is likely more lengthy (and therefore more economically significant) for fusion than for existing types of power plants. This fusion module is fully compatible with the scheduled maintenance module. There also also three fusion-specific aspects.
- The reduction of passive parasitic power during scheduled maintenance (mentioned above),
- the constraint on the maximum pulse starts per year (mentioned above).
- In many designs, neutrons damage the first wall, blanket, and/or vacuum vessel of the plant and they eventually need to be replaced. This can be expressed as a limit on the total (gross) energy produced by the plant between maintenance cycles. This module implements a constraint that can limit the total energy production (as measured in full-power-years) over a year.
A fusion plant is a type of Thermal resource. In addition to the standard Thermal columns (cost, up time, down time, ramp rates, min power) there is one required fusion
column and nine optional columns in Thermal.csv
file:
fusion
should be 1
for fusion plants and 0
otherwise.parasitic_passive
.parasitic_active
.parasitic_start_energy
.parasitic_start_power
.dwell_time
.max_up_time
.max_starts
.max_fpy_per_year
.parasitic_passive_maintenance_remaining
.
The purpose, defaults, units, and valid ranges for these parameters are described below.
The parameters parasitic_passive
, parasitic_active
, parasitic_start_energy
, and parasitic_start_power
must have values of zero or more. These values are expressed as fractions of the plant's gross capacity. For example, if vCAP
is 1000 MW and parasitic_passive
is 0.1, the plant would require a 100 MW parasitic power draw. The maximum gross output of the plant is 1000 MW, and the maximum net output is 900 MW. By default these four parasitic load parameters are $0$.
The parasitic_start_energy
and parasitic_start_power
are related, as described above. If starting a plasma pulse in a 1000-MW-gross plant requires a draw of 500 MW for 3 minutes, then parasitic_start_power
would be $0.5$ and parasitic_start_energy
would be $(500/1000) * (3/60) = 0.025$, where 60 is the number of minutes in an hour. The plasma startup sequence is assumed to be shorter than an hour: while this is not checked programatically, the parasitic_start_power
should, logically, always be equal to or larger than the parasitic_start_energy
.
The dwell_time
parameter is expressed in fractions of an hour. It must be between $0$ and $1$. The default is $0$.
The dwell time is counted in the same hour as the start of a plasma pulse. Therefore the pulse start hour may have less net generation due to the parasitic_start_energy
as well as the dwell time.
Nota bene: while at first blush the dwell time and parastic_start_energy
might seem interchangeable as ways to reduce the net power output during the start hour, a dwell time does not contribute to the accumulated gross power generation as is constrained by max_fpy_per_year
.
The max_up_time
constraint is activated by entering an integer denoting the length of the pulse in hours. The value must logically be positive and less than the number of hours in the simulation. A max_up_time
of 1
will result in a new pulse starting every hour. A max_up_time
of 0
is not well defined; the default of no restriction is entered with -1
.
Note: if the dwell_time
is nonzero, the actual pulse length always will be shorter than the max_pulse_length
here.
The max_starts
constraint is activated by entering a positive integer denoting the maximum number of starts per year. A max_starts
of 0
would prevent the plant from starting; the default of no restriction is entered with -1
.
The max_fpy_per_year
constraint is activated by entering a fraction between $0$ and $1$. This constrains the total gross power production as a fraction of the gross capacity measured in full-power years (FPY). The default of no restriction is entered with -1
. Note that if the plant has a dwell time $t_\mathrm{dw} > 0$ and a maximum up time, the theoretical maximum gross power production is already less than one full-power year per year. For example, if there is a 0.5 hour dwell time and a max up time of 2 hours, then the plant can operate at peak power for 1.5 hours out of every 2, which yields a theoretical maximum throughput of 0.75 FPY per year. In this case a max_fpy_per_year
of 0.75 or more would have no effect.
The parasitic_passive_maintenance_remaining
parameter is only used for plants also using the scheduled maintenance module (maint = 1
). The value must be between $0$ and $1$. The default is $0$; in this case there is no parasitic power during scheduled maintenance periods. With a value of $1$ the parasitic power does not decrease during maintenance. With a value of $0.5$ it is reduced by half, and so on.
Use of the fusion module leads to two new outputs files, and changes to existing output files.
fusion_pulse_starts
. This file is similar to start/commit/shutdown.csv
for unit committment.
There is a column for each fusion resource component and a row for each timestep. Values are number of plant units (of a given resource component) starting a fusion pulse in each timestep.
fusion_parasitic_power
. This file is similar to charge.csv
.
There is a column for each fusion resource component and a row for each timestep. Values are the parasitic energy in MWh drawn by each resource component in each timestep. This is the sum of the passive parasitic power, the active parasitic power, and the pulse start energy. Values are always nonnegative. Positive values represent power flowing from the grid to the plant.
fusion_net_capacity_factor
. This is the ratio of the net power production (gross - parasitic) to the annual net capacity of the plant. The numerator here is always smaller than that of the standard capacity factor and could even be negative if the parasitic power is very large and the plant is not used often. The denominator is also smaller than that in the standard capacity factor because it accounts for parasitic power and dwell time.
capacity_factor
: This standard output file reports the gross capacity factor for the plant:
The ratio of the gross power produced to (the gross capacity * one year). Compare with the fusion_net_capacity_factor
above.
charge
: fusion parasitic power is reported in this file.
There are two new variables, representing the number of pulse starts ($\chi^{pulse}_{y,z,t}$) and pulses underway ($\nu^{pulse}_{y,z,t}$). These are similar to the conventional unit commitment start $\chi$ and commit status $\nu$.
\[\begin{align*}
+0 & \le \chi^{pulse}_{y,z,t} \le \overline{\Omega}^{size}_{y,z} \cdot \Delta^\mathrm{total}_{y,z} \\
+0 & \le \nu^{pulse}_{y,z,t} \le \overline{\Omega}^{size}_{y,z} \cdot \Delta^\mathrm{total}_{y,z}
+\end{align*}\]
The two pulse variables are linked using $\tau^{pulse,up}_{y,z}$, the max_up_time
:
\[\nu^{pulse}_{y,z,t} \le \sum_{\hat{t} = t - (\tau^{pulse,up}_{y,z} -1)}^{t} \chi^{pulse}_{y,z,\hat{t}}\]
They are further constrained by the plant's conventional commitment state,
\[\begin{align*}
+\nu^{pulse}_{y,z,t} & \le \nu_{y,z,t} \\
+\quad \quad \chi^{pulse}_{y,z,t} & \le \nu_{y,z,t}.
+\end{align*}\]
The optional constraint on the maximum number of pulses per year, max_starts
$\overline{\chi}^{pulse}_{y,z}$ is formulated as
\[\sum_{t \in \mathcal{T}} \chi^{pulse}_{y,z,t} \cdot \omega_t \cdot \overline{\Omega}^{size}_{y,z} \le \overline{\chi}^{pulse}_{y,z} \cdot \Delta^{\mathrm{total}}_{y,z}.\]
During the hours when the plant starts, the power generation $\Theta_{y,z,t}$ is limited due to the dwell_time
$\tau^{dwell}_{y,z}$ by the constraint
\[\Theta_{y,z,t} \le \overline{\Omega}^{size}_{y,z} \cdot \left(\nu^{pulse}_{y,z,t} - \tau^{dwell}_{y,z} \chi^{pulse}_{y,z,t}\right).\]
Optionally, the gross power generation during the year is limited by the maximum-FPY-per-year parameter $\overline{\Theta}^{FPY}_{y,z}$
\[\sum_{t \in \mathcal{T}} \Theta_{y,z,t} \le T \cdot \Delta^{\mathrm{total}}_{y,z} \cdot \overline{\Theta}^{FPY}_{y,z}\]
where $T$ is the number of hours in the year.
The passive parasitic power is
\[\Pi^{parasitic,pass}_{y,z,t} = f^{parasitic,pass}_{y,z} \cdot \left(\Delta^{total}_{y,z} - \chi^{maint}_{y,z,t} \left(1 - f^{parasitic,pass,maint}_{y,z}\right) \overline{\Omega}^{size}_{y,z}\right)\]
where $\chi^{maint}_{y,z,t}$ is the number of units under maintenance and $f^{parasitic,pass,maint}_{y,z}$ is fraction of passive parasitic power which remains during maintenance.
The active parasitic power is
\[\Pi^{parasitic,act}_{y,z,t} = \left(\nu^{pulse}_{y,z,t} - \chi^{pulse}_{y,z,t} \cdot \tau^{dwell}_{y,z}\right) \cdot f^{parasitic,act}_{y,z} \cdot \overline{\Omega}^{size}_{y,z}\]
and the parasitic pulse start energy is
\[\Pi^{parasitic,pulse,energy}_{y,z,t} = \chi^{pulse}_{y,z,t} \cdot f^{parasitic,pulse,energy}_{y,z} \cdot \overline{\Omega}^{size}_{y,z}.\]
The total parasitic power from each technology $y$ in zone $z$ is
\[\Pi^{parasitic,total}_{y,z,t} = \Pi^{parasitic,pass}_{y,z,t} + \Pi^{parasitic,act}_{y,z,t} + \Pi^{parasitic,pulse,energy}_{y,z,t};\]
the sum of the parasitic power across all fusion technologies $y$ in zone $z$ is subtracted from the power balance in that zone.
The parasitic pulse start power, used for the capacity reserve margin formulation, is
\[\Pi^{parasitic,pulse,power}_{y,z,t} = \chi^{pulse}_{y,z,t} \cdot f^{parasitic,pulse,power}_{y,z} \cdot \overline{\Omega}^{size}_{y,z}.\]
The capacity
As a reminder, for standard thermal plants the capacity reserve margin contribution is $\epsilon^{CRM}_{y,z,p} \cdot \Delta^{total}$.
For fusion plants, the contribution depends on $\nu^{pulse}_{y,z,t}$ rather than $\Delta^{\mathrm{total}}_{y,z}$.
\[
+\epsilon^{CRM}_{y,z,p} \left(\nu^{pulse}_{y,z,t}
+- \chi^{pulse}_{y,z,t} \cdot \tau^{dwell}_{y,z}
+\right) \overline{\Omega}^{size}_{y,z}
+
+- \epsilon^{CRM}_{y,z,p} \left(\Pi^{parasitic,act}_{y,z,t} + \Pi^{parasitic,pulse,power}_{y,z,t}\right) - \Pi^{parasitic, pass}_{y,z,t}
+\]
The first term is gross power production possible during an hour, depending on the pulse state. The second term subtracts the parasitic active and start power. The last term subtracts the passive parasitic power. Unlike the first two it is not subject to the reliability derating $\epsilon^{CRM}$ because passive power is assumed to be drawn even during unscheduled downtime.
Note that in this formulation, it is possible for CRM contribution to be negative (particularly, not not necessarily, if the plant is a net sink of electricity).
This formulation is cross-compatible with the maintenance module. If a plant is undergoing maintenance the first two terms will be zero, and the parasitic passive power will be reduced (see formula above).
The total parasitic power is subtracted from a plant's contribution to an energy share requirement. Thus for fusion the plant contributes its net energy production.
The Fusion module was written so that its constraints of the module could be "bolted on" to anything with
- a power-like expression (e.g.
vP[y,:]
or vP[y,:] + vREG[y,:] + vRSV[y,:]
), - a capacity-like expression (
eTotalCap
) and - a commitment-state expression (
vCOMMIT
).
So far it has only been attached to thermal plants with unit commitment, but it could be used in the future for more complicated entities like a heat source attached to a thermal storage unit and a generator. Like the maintenance
module, the constraints of the fusion module apply to one "resource component" at a time, rather than a "SET"
of resources. The time-series variables and expressions for each fusion component have unique base_name
s, like vFusionPulseStart_MA_fusion[t=1:T]
for a resource named MA_fusion
. This makes writing output slightly trickier, as the variables and expressions are evaluated (with JuMP.value
) one at a time.
Many of the functions below assume little about what they are attached to. Others act as the interface between fusion and a plant built with the thermal_commit
module.
_fusion_dwell_avoided_operation(dwell_time::Float64,
+ ePulseStart::AffExpr)
+
+dwell_time in fractions of a timestep
+ePulseStart is the number of MW starting. Typically component_size * vPulseStart
sourceensure_fusion_expression_records!(dict::Dict)
+
+dict: a dictionary of model data
+
+This should be called by each method that adds fusion formulations,
+to ensure that certain entries in the model data dict exist.
sourceensure_fusion_pulse_variable_records!(dict::Dict)
+
+dict: a dictionary of model data
+
+This should be called by each method that adds fusion formulations,
+to ensure that certain entries in the model data dict exist.
sourcefusion_parasitic_power_expressions(inputs::Dict, zone::Int)
+
+inputs: model inputs
+
+get listings of parasitic power expressions in a zone.
+This is available only after a `fusion_formulation_*!` has been called.
sourcefusion_parasitic_power_expressions(dict::Dict)
+
+dict: a dictionary of model data
+
+get listings of parasitic power expressions.
+This is available only after a `fusion_formulation_*!` has been called.
sourcefusion_pulse_start_expressions(dict::Dict)
+
+dict: a dictionary of model data
+
+get listings of pulse start expressions
+This is available only after a `fusion_formulation_*!` has been called.
sourcefusion_pulse_thermal_power_generation_constraint!(EP::Model,
+ inputs::Dict,
+ resource_component::AbstractString,
+ r_id::Int,
+ reactor::FusionReactorData,
+ vp::Symbol,
+ vcommit::Symbol)
+
+Add constraint which acts on the power-output-like variable.
sourcehas_fusion(dict::Dict)::Bool
+
+dict: a dictionary of model data
+
+Checks whether the dictionary contains listings of fusion-related expressions.
+This is true only after a `fusion_formulation_*!` has been called.
source_fusion_crm_parasitic_adjustment(derating_factor::Float64,
+ passive_power::AffExpr,
+ active_power::AffExpr,
+ start_power::AffExpr)
+
+Parasitic power for a fusion plant.
+Passive parasitic power is always on, even if the plant is undergoing maintenance,
+so this adjustment is independent of the CRM derating factor. Active and start power are associated
+with a plant being in working order, so they do get `derating_factor` applied.
+
+derating_factor: Factor associated with the reliability of a plant's ability to produce power.
+ Must logically be between 0 to 1.
+passive_power: Expression for parasitic passive recirculating power.
+active_power: Expression for parasitic active recirculating power.
+start_power: Expression for parasitic pulse start (peak) power.
sourcefusion_capacity_reserve_margin_adjustment!(EP::Model, inputs::Dict)
+
+Subtracts parasitic power from the capacity reserve margin.
source