Electricity market mechanisms designed to steer sustainable generation of electricity play an important role for the energy transition intended to mitigate climate change. One of the major problems is to complement volatile renewable energy sources by operationally flexible capacity reserves. In this paper , a proposal is given to determine prices on electricity markets taking into account the operational flexibility of power plants, such that the costs of long-term capacity reserves can be paid by short-term electricity spot markets. For this purpose, a measure of operational flexibility is introduced enabling to compute an inflexibility fee charging each individual power plant on a wholesale electricity spot market. The total sum of inflexibility fees is accumulated on the spot markets and then can be used to finance a capacity mechanism keeping the necessary reserves to warrant grid reliability. Here each reserve power plant then gets a reliab le payment depending on its operational flexibility. The proposal is applied to a n exemplary small grid, illustrating its main idea and also revealing the caveat that too high fees paradoxically could create incentives to employ highly flexible power plants on the spot market rather than to run them as backup capacity.
To mitigate the global climate change, it is commonly agreed that greenhouse gas emissions, and in particular emissions of CO2, have to be reduced substantially [
If generation and distribution of electricity is to be organized by market principles, a preeminent challenge of a future electricity market mechanism design is to set effective price signals to reward the introduction and the use of renewable energy sources for the generation of electricity, and simultaneously to penalize fossil fuel power plants. However, the physical requirements of electricity grids and the necessities of public life in present societies impose special restrictions on electricity markets. In particular, a necessary condition for grid stability is the reliability of electricity generation and the immediate equality of supply and demand at any instant of time. It is expected that the biggest contribution of renewable energy sources in electricity grids will come from wind turbines and photovoltaic cells [
Cramton and Ockenfels [
the second option is technologically not realizable to date. For more details see [
Besides these theoretical arguments there also exist empirical clues to doubt that current electricity markets encourage investments in operationally flexible power plants or in the provision of power reserves for cases of emergency or maintenance [
The main goal of this paper is to propose a solution to the economic problem of financing the necessary capacity reserves guaranteeing grid stability by market principles. One necessary property of a power plant for being part of a capacity reserve is a fast guaranteed operational flexibility. In our opinion the main problem of current market mechanism designs is the fact that market prices do not regard operational flexibility, being determined solely by the marginal costs of electricity generation. Thus the costs of operational inflexibility are market externalities [
By contrast, a sustainable electricity market mechanism design should induce market prices which take into account both the direct variable production costs and the external ecological costs of electricity production, but also the costs caused by operational inflexibility of each individual power plant. Due to emissions trading [
The paper is organized as follows. We first summarize the specialties of electricity markets and its market deficiencies when a pure market mechanism is established. After some capacity mechanisms are listed which ensure grid reliability, we present a new market mechanism giving rational incentives to maintain capacity reserves. A short discussion concludes the paper.
An electricity market is a mechanism by which suppliers and demanders of electricity interact to determine price and quantity of electrical energy or electrical power. Due both to the physical requirements and the historical evolution, an electricity market consists of four types of participants, forming the four stages generation, transmission, distribution, and consumption (
utilities and finally the consumers, usually households, firms, or transport companies.
In most electricity markets, the power plant operators sell electric energy to big consumers or utilities via contracts, usually OTC forwards, or via a spot market to utilities. The utilities, in turn, sell the electricity to the consumers. The task of the transmission system operator is to coordinate the dispatch of generating units to meet the expected demand of the system across the transmission grid and to warrant the stability of the system. Such electricity markets therefore are partitioned into wholesale markets where the power plant operators offer electricity to retailers, and a retail market where the retailers themselves re-price electricity and sell it on the market to consumer, or use it in case of big industry companies.
Trading electricity has several specialties in comparison to trade other goods, resulting from its physical properties [
・ The number N > 1 of agents is fixed, known to all agents, and all agents produce the same homogeneous good;
・ the agents do not cooperate, i.e., there is no collusion, and have market power, i.e., each agent’s output decision affects the good’s price;
・ agents compete in quantities and choose them simultaneously; in particular, firm i chooses quantity qi;
・ the market-clearing price p of the good is a commonly known decreasing function p(q) of the total output quantity q = q 1 + ⋯ + q N .
・ the agents are economically rational and act strategically, seeking to maximize profit; agent i has a marginal cost function ci(qi) increasing on its chosen quantity qi, and agent i’s total profit is
u i ( q 1 , ⋯ , q N ) = q p ( q ) − c i ( q i ) . (1)
For more details see [
q i * = a − c b ( N + 1 ) , p = a − N c N + 1 , u i = ( a − c ) 2 b ( N + 1 ) 2 . (2)
Furthermore, since demand and supply vary continuously, there is a physical requirement for a controlling agency, the transmission system operator, to coordinate the dispatch of generating units to meet the expected demand of the system across the transmission grid. There are some commonly accepted and empirically founded design structures for electricity markets, namely to separate the potentially competitive functions of generation and retail from the natural monopoly functions of transmission and distribution; and to establish a wholesale electricity market and a retail electricity market (
The role of the wholesale market is to allow trading between generators, retailers and other electricity markets have been implemented in regions all over the world, some of them listed in
Electricity Market | Region | Model |
---|---|---|
APX | Netherlands | open |
EEX | Central Europe | open |
GME | Italy | open |
Powernet | France | open |
CCE | Brazil | pool-based |
NEMMCO | Australia | pool-based |
NordPool | Scandinavia | pool-based |
Omel | Spain | pool-based |
PJM | USA | pool-based |
functional experiences, especially the Californian electricity crisis in 2000/2001 and the New York blackout in 2003 damped the initial political enthusiasm for reform [
An open electricity market consists of an open competitive wholesale market and a competitive retail market. Often the notion of open electricity market is understood in the narrower sense of meaning only a competitive wholesale market [
Nearly all important short-term decisions for power plant generation, however, are made at the day-ahead market. Here electricity for single hours of the next day and at a minimum of 0.1 MW can be traded, for instance a volume of 2 MW for the period from 8 to 11 pm.
Besides these hourly contracts there are also traded block contracts ranging over several hours. Block contracts are particularly appropriate for suppliers and demanders with great inertia, i.e., in case of a steady electricity demand or of power plants being not capable to vary the output.
The system price in the spot markets is the market-clearing price and therefore determined by matching offers from generators to bids from consumers at each node to develop a supply and demand equilibrium price, usually on an hourly interval, and is calculated separately for subregions in which the system operator’s load flow model indicates that constraints will bind transmission imports. On the day-ahead market, the market-clearing prices are determined by
the clearing house once in an hour.
Long-term contracts are traded in normed and standardized form on a future exchange, or as individual forward contracts over the counter between a generator company and a utility or a big consumer. The trading on a future exchange is organized as a continuous open auction.
Locational Marginal Pricing (LMP)Locational marginal pricing (LMP), or nodal pricing is an algorithm which first calculates a shadow price at each node on the network, resulting from the optimized redispatch of available units considered as the hypothetical production costs of the additional electricity quantity demanded by the node. The hypothetical redispatch calculation must respect security constraints determined by ancillary services, and must leave sufficient margin to maintain system stability. If the grid consists of a great part of volatile wind turbines and photovoltaic sources, the production costs must regard weather forecasts.
A pool-based electricity market is managed and controlled by an independent central pool manager, or market operator. In a pool-based market generating companies and consumer or energy service companies submit bids for selling and buying electric energy for the next 24 hours. The market operator is in charge of clearing the market, determining the accepted and rejected buying and selling bids. The market clearing procedure also provides the market clearing price for every period. Then the market operator decides which power plants are deployed at which time.
Therefore, the price determination in principle is the same as at an open market by calculating a merit order and a demand curve. However, the price includes the costs of grid bottlenecks and of externalities [
The merit order is a ranking of available sources of energy in ascending order of their short-run marginal costs of production [
power system is called the merit order effect [
A series of studies covering Germany, Britain, Ontario, Spain, the US and Australia confirms the merit order effect by the observation that, as more renewable resources are added to an existing grid, the more there exists a downward pressure on wholesale prices, see [
The zero marginal cost of wind energy does not, however, translate, into zero marginal cost of peak load electricity in a competitive open electricity market system as wind supply cannot be dispatched to meet peak demand. The purpose of the merit order was to enable the lowest net cost electricity to be dispatched first thus minimizing overall electricity system costs to consumers. Intermittent wind might be able to supply this economic function provided peak wind supply and peak demand coincide both in time and quantity. On the other hand, solar energy tends to be most abundant during peak energy demand, maximizing its ability to displace coal and natural gas power.
Merit order paradox. The merit order effect leads to the paradox that the more renewably generated energy is fed into the system, the lower gets the wholesale market price of electricity, and thus the less renewables can be refinanced by the spot market [
The merit order paradox is even strengthened by feed-in tariffs [
1) Feed-in premium mechanism. Generators sell their renewably produced electricity on the electricity markets and receive a fixed bonus payment, a premium per kWh on top of the electricity price. A feed-in premium scheme is represented by the “market option” in Spain’s Real Decreto 661/2007 and formerly Real Decreto 436/2004 [
2) Quota scheme, based on quota obligations based on tradable green certificates. Generators sell their renewably produced electricity on the electricity markets and the “green value” of their production on special green certificate markets. The demand or green certificates is created by quota obligations for electricity suppliers. A quota scheme is represented by the UK “Renewables Obligation” (RO 2002). One advantage is cost saving since capital intensive technologies like photovoltaics are less implemented, a major disadvantage is a certain suppression of innovations because only mature technologies are supported.
3) Auction mechanism. In a series of competitive orders renewable energy generators submit bids specifying the energy price at which they would be prepared to develop a project and deliver energy. The central agency determines the level of capacity for different technology bands, and the bids that should be accepted and offered contracts to meet this capacity. The bidders are obliged to pay the contracted price. The difference between the contracted price and the market selling price, which represents the subsidy to renewable generation, is reimbursed using funds [
Electricity markets are not perfect efficient markets. They suffer from the flaw that both the demand and the supply are price inelastic, implying that a market clearing is not warranted: In case of demand excess and exhausted supply capacity a blackout occurs, see
Blackouts thus occur because of inelasticities of electricity markets. The main reason for the demand-side inelasticity is the lack of real-time meters and billing to allow consumers to respond to real-time prices. The supply side is inelastic because storage of electricity is costly or even impossible. An essential consequence is the following theorem, stating for short that electricity markets cannot optimize blackouts [
Theorem 1 (Adequacy Problem). If a competitive electricity market does not
prevent the possibility of blackouts, it cannot provide the amount of capacity which optimizes the duration of blackouts.
Proof. [
The theorem states the so-called “adequacy problem” saying that a competitive electricity market cannot resolve the trade-off between more capacity and more blackouts in principle. In particular, the price that is being paid to generators during blackouts must be set by administrative rules. The adequacy problem is a crucial challenge in electricity market theory. The duration of blackouts depends on the generation of capacity built to avoid them, and the incentive to build generation capacity to avoid blackouts depends on the price being paid during blackouts. Therefore the determination of the optimal price is critical. If the price is chosen too high, too much capacity is built, but if it is too low, the total duration of blackouts is too long.
Example 2. [
w bo * = RCC VoLL [ h yr ] . (3)
(Note that, if the units are chosen to be equal, then w bo * is in [0, 1], i.e., w bo * is a probability.) If, for instance, we have VoLL = $20,000/MW×h and RCC = $80,000/MW×yr, then the optimum average duration of blackouts is w bo * = 4 hours per year. If instead the actual average duration of blackouts is wbo = 5 h/yr, then the cost of blackouts is
C bo = w bo * ⋅ VoLL = $ 100000 MW ⋅ yr > RCC = w bo * ⋅ VoLL = $ 80000 MW ⋅ yr . (4)
In other words, any MW of capacity added to the system is worth $100,000 per year, but the rental cost RCC pays it only $80,000 per year. In general, the rental cost RCC of reliable capacity per power unit and year is determined by the expected duration of blackouts wbo and the consumers’ value of lost load VoLL through
RCC = w bo ⋅ VoLL [ $ yr ] . (5)
In particular, the rental cost of capacity vanishes if and only if the expected duration of blackout vanishes.
In principle, the only way to resolve the adequacy problem is to remove its logical premise, the market inelasticities. Hence there are two types of solutions addressing the adequacy problem. On the one hand, there are approaches to increase supply elasticity by building up and controlling capacity of electricity generation; they are usually subsumed under the category of capacity mechanisms. Another approach is to increase demand elasticity, by enabling real-time price response applying smart metering or smart grids, cf.
However, even though these approaches help to approximate to an efficient market, they do not necessarily solve the closely related problem of the “missing money.” The adequacy problem implies insufficient or inefficient incentives to build capacity and to provide reliability in electricity markets, possibly leading to underinvestment in generating capacity. As long as demand is below maximum available capacity, as depicted in
Theorem 3 (Missing Money Problem). In a competitive electricity market without blackouts, the prices are too low to pay for adequate capacity.
Proof. [
A crucial implication of this simple observation is that pure-market designs have an inherent tendency to produce scarcity sooner or later:
Corollary 4 (Capacity Dilemma of electricity markets). When generating
capacity is adequate in a competitive electricity market, electricity prices are too low to pay for adequate capacity.
Instead of trading solely energy quantities, on a market obeying a capacity mechanism the offering of capacity is paid [
The strategic reserve is a kind of insurance service for short-term emergencies in the electricity system by which electricity quantities are traded on a spot market. The plants warranting the availability of the strategic reserve do not participate at the market. Capacity markets trade capacities, distinguishable whether they are determined by a price mechanism or by a quantity mechanism [
In the mid-1990s, capacity markets were created in the restructured Northeastern US electricity markets in an attempt to provide sufficient remuneration for generators [
In the quantity-based approach to capacity markets, the regulator holds an auction where capacity suppliers bid for a capacity payment Cpay. The regulator then determines the optimum capacity C* from a target duration of blackouts. Since blackout probabilities depend on the amount of installed capacity, it is possible to back out the value C* that is the level of capacity that causes the de-
sired duration of blackouts.
A central capacity market complements the energy-only market such that the suppliers can gain revenues from both markets. The clearing price on the capacity markets is determined by multiple-round descending clock auctions. In a central capacity markets there exists a central system operator, or market manager. A decentral capacity market, on the other hand, is characterized by individual demand of reliable capacity. In central capacity markets the product “negative power” is part of a capacity auction, in decentral capacity markets the reduction of demand is a certified product, i.e., reduction of demand reduces the suppliers’ obligation to provide capacity [
By the capacity market design of [
Two major advantages of reliability options are that the capacity payment (a) hedges load from high spot prices and (b) reduces supplier risk by replacing peak energy rents, i.e., the rents derived from selling energy at high spot prices during periods of scarcity) with a constant capacity payment. At the same time, spot prices can be as volatile as is required for short-run economic efficiency, as all parties (including load) are exposed to the spot price on the margin. Market power that would emerge in times of scarcity in the spot market is reduced, since suppliers enter the spot market with a nearly balanced position whenever the spot price is above the strike price [
A focussed capacity market is similar to the Cramton-Ockenfels market with reliability options, however there are decentral auctions for various supply segments of the market, e.g., certain categories of power plants.
The integrated energy market design (iEMD) is a proposal for a sustainable
energy market commissioned by the German associations of local utilities, VKU [
Consumers with technology that enables demand flexibility will be able to reduce costs for power certificates by reducing their specific contribution to the system’s capacity reserves, for instance at peak load times. Demand flexibility will therefore become more attractive in economic terms.
Renewable support scheme. Herrmann and Ecke [
In this section we introduce a new market mechanism for electricity markets avoiding the market deficiencies mentioned above. It accounts for the operational flexibility of the participating power plants and resolves the missing money problem. It requires the precise definition of a measure of operational flexibility which will be given immediately.
We stipulate that the operational flexibility of a power plant depends on its guaranteed start-up time ts in [0, ∞) which is defined as the time that a power plant requires to supply a guaranteed power of electricity. Moreover, we claim that the measure should be a pure number expressing a degree of flexibility ranging from 0 to 1, with the property that the longer the guaranteed start-up time the smaller the value of flexibility. Consequently, we define a general measure of operational flexibility to be a strictly monotonically decreasing function φ : [ 0 , ∞ ) → [ 0 , 1 ] of a single variable satisfying the limit behavior
φ ( x ) → 1 as x → 0 , and φ ( x ) → 0 as x → ∞ (6)
Here the variable x represents the starting time of the power plant, measured in hours [h]. A simple example of such a measure is the differentiable function
φ ( x ) = 1 x + 1 . (7)
In the sequel we will use this function to measure the operational flexibility of a given power plant. In
On a wholesale electricity market, each participating power plant operator offers electric power with a sell bid for each of its power plant. The market maker collects all these sell bids and determines the market-clearing price in accordance to the buy bids and the merit order [
Power Plant | Guaranteed Cold Start-Up Time [h] | f | Marginal Costs pmc [?MWh] |
---|---|---|---|
wind turbine | ∞ | 0.000 | 1 |
hydroelectric power station | 0.02 | 0.980 | 1 |
gas turbine | 0.12 | 0.893 | 90 |
cogeneration plant (CHP) | 0.17 | 0.855 | 50 |
combined cycle gas turbine | 5 | 0.167 | 50 |
hard coal power plant | 6 | 0.143 | 60 |
lignite power plant | 9 | 0.100 | 40 |
nuclear power plant | 50 | 0.020 | 5 |
To be more precise, let pmc denote the marginal offer price per energy quantity of the power plant regarding only the marginal costs, including the variable costs of production and emissions trade certificates; this is the price which would be offered for the power plant on a current wholesale spot market [
p i = p i mc + ( 1 − φ i ) p 0 . (8)
Here p0 denotes a market-wide constant reference level price, set by the market authority. It therefore is a political or regulatory quantity, not a market-inherent value or immediately economically deducible. It is arbitrary in principle, but the higher its amount the heavier the effect of operational flexibility on the final spot market price.
It should be high enough to signal effective incentives to introduce and use operationally flexible power plants for scarcity situations and black-outs, but it must be low enough to avoid a too radical change of the merit order such that too many flexible power plants are operational on the spot market and thus unavailable for a capacity reserve (see
Example 5. Consider a small exemplary grid (called “toy grid” in the sequel) consisting of the eight power plants listed in
In our toy grid we can recognize that, if the amount of p0 is too high, the effect may be even counterproductive since the flexible gas turbine is in the money and thus operating at a normal quantity demand, leaving no power plant as a capacity reserve. In case of a sudden scarcity or of a blackout, the grid then would
Power Plant | Guaranteed Cold Start-Up Time [h] | φ | 1 - φ | Marginal Costs pimc [?MWh] | Offer Price pi [?MW] | |
---|---|---|---|---|---|---|
p0 = 10 | p0 = 70 | |||||
Wind turbine | ∞ | 0.000 | 1.000 | 1 | 11 | 71 |
Hydroelectric power station | 0.02 | 0.980 | 0.020 | 1 | 1 | 2 |
Gas turbine | 0.12 | 0.893 | 0.107 | 90 | 91 | 98 |
Cogeneration plant (CHP) | 0.17 | 0.855 | 0.145 | 50 | 51 | 60 |
Combined cycle gas turbine | 5 | 0.167 | 0.833 | 50 | 58 | 108 |
Hard coal power plant | 6 | 0.143 | 0.857 | 60 | 69 | 120 |
Lignite power plant | 9 | 0.100 | 0.900 | 40 | 49 | 103 |
Nuclear power plant | 50 | 0.020 | 0.980 | 5 | 15 | 74 |
perform worse than with the original merit order.
Moreover we observe that the higher the reference level price p0, the higher the spot market price. The amounts, however, are not related to each other in a linear manner, but depend discontinuously on the changes of the merit order. The total amount of inflexibility fees, at last, is directly calculated to be either 48.4 €/MWh in case of p0 = 10 €/MWh, or 339 €/MWh in case of p0 = 70 €/MWh.
We finally note that for the demanded quantity q* depicted in the scenarios in
Assume for simplicity that the demand remains constantly at q* during a certain hour and that all power plants yield the same power of 5 MW, say, and let be q* = 25 MW be the demanded electrical power for the hour considered (such that the consumed electricity energy during this period is E = 25 €/MWh). Then with
C f = ( 10 + 0 + 1 + 9 + 10 ) × 5 = 150 € / h , (9)
at a reference level price p0 = 10 €/MWh, and
C f = ( 70 + 1 + 8 + 10 + 69 ) × 5 = 790 € / h , (10)
at a reference level price p0 = 70 €/MWh. The total fee then can be distributed to the power plants participating at a capacity mechanism, paying their time of reliability.
The toy grid in Example 5 demonstrates the possible direct consequences of the inflexibility fee to the wholesale electricity market. In essence, by Equation (8) a power plant with a low operational flexibility is penalized more than one with a high operational flexibility. In the limit case that all power plants participating on the spot market are equally operationally flexible, i.e., φi = const, all sell bids are raised by the same amount and the merit order cannot change. On the other hand, if the power plants have different operational flexibilities and the reference price level p0 is chosen too high, the merit order changes the merit order such that all flexible power plants are operational on the spot market, such that no power plant is left for the capacity reserve necessary to warrant grid reliability.
The total amount of inflexibility fees paid for each power plants participating the spot market now is available for a capacity mechanism, as described in the following section.
A power plant serving as a power reserve for periods of scarcity or blackouts should have fast and guaranteed start-up times, i.e., should be operationally flexible to a high degree. There exist several proposed capacity mechanisms, for instance capacity markets or a strategic reserve determined by a grid agency. In either of these approaches, we therefore require a power plant to offer capacity reserves to have a high operational flexibility φ, say
φ > 1 2 (11)
This value means that the guaranteed start-up time of a power plant participating the capacity mechanism must be less than one hour. A further natural requirement is that a power plant offering its reliability on the capacity market cannot participate on the spot market.
Assume then that there are k power plants participating on the capacity market, each one established with a unique index i = 1 , ⋯ , k . Let φi and Pi denote the operational flexibility and the capacity (measured in MW) of power plant i, respectively, and let Cf be the total of inflexibility fees accumulated on the spot market in a certain past period, say, the day before. It has the dimension currency per time, for instance €/h. Then the reliability payment φi for power plant i in that period is defined as
ρ i = φ i P i P flex [ € h ] where P flex = ∑ j = 1 k φ j P j . (12)
Note that by construction ρ 1 + ⋯ + ρ k = C f , i.e., the sum over all reliability payments equals the total amount of the inflexibility fees. The quantity Pflex is the weighted sum of all available capacities, where the weights are precisely the respective operational flexibilities.
Example 6. Assume the toy grid from Example 5. Then by the requirement (11) only three power plants can participate at the capacity market, namely the hydroelectric power station, the CHP plant and the gas turbine. In
For calculational details refer to the Excel file http://math-it.org/climate/operational-flexibilities.xls.
In this paper, a proposal has been worked out to integrate operational flexibility into the sell bids of power plants participating wholesale electricity spot markets. The main idea is to calculate a fee for each power plant depending on its operational flexibility. For this purpose, the concept of a general measure of operational flexibility of a power plant is introduced here as a strictly monotonically decreasing function φ of the guaranteed start-up time, normed by condition (6). With such a measure, the inflexibility is priced in by Equation (8) to the margi- nal price determining the sell bid of each power plant at the spot market. The amount depends on a market-wide reference level price p0 which is set by the market authority or the state. The total operational inflexibility fee Cf is accumulated at the spot markets and then is spread on the power plants participating in a given capacity mechanism, depending on their operational flexibilities according to Equation (12). Here the power plants forming a capacity reserve should have a very high operational flexibility, to guarantee reliability and stability of the grid. A reasonable value is proposed by inequality (11). A simple example of a measure for operational flexibility is given by Equation (7). Using this
measure, the spot market and the corresponding payments to power plants participating in a capacity mechanism are applied to a simple but prototypical toy grid in Examples 5 and 6.
The most important consequence of our proposal, as viewed from an economic perspective, is the internalization of the negative externality of operational inflexibility of power plants. With the inflexibility fees determined as above, the currently external costs would thus be paid by the spot markets and could be used to pay capacity reserves, be it on a separate capacity market or another capacity mechanism such as a pool of power plants forming a strategic reserve. The inflexibility fee therefore increases welfare without necessarily decreasing
Power Plant | φ | Capacity [MW] | ρi [?h] | |||
---|---|---|---|---|---|---|
Cf = 205 ?h | Cf = 790 ?h | |||||
Hydroelectric power station | 0.980 | 5 | 74 | ? | 284 | |
Gas turbine | 0.893 | 5 | 67 | 105 | 259 | 404 |
Cogeneration plant (CHP) | 0.855 | 5 | 64 | 100 | 248 | 386 |
dispatch efficiency.
A critical point of our approach, however, is the determination of the reference level price p0. It is crucial since it can even change the merit order of electricity markets if it is set very high. Although a change of the merit order in itself does not necessarily imply severe problems, it could nonetheless lead to the paradox that operationally flexible power plants participate in a short-term spot market and therefore could not serve as a capacity reserve. An amount p0 too high would thus be adverse to the intention to pay a capacity mechanism and thus would even diminish welfare. We therefore are faced with the conflicting objectives of providing enough means to fund the reserves of a capacity mechanism, and of keeping suitable power plants with high operational flexibility as capacity reserve. Although this risk is calculable when choosing the amount for a given grid cautiously such that experiences could be gained over time, a comprehensive theoretical framework to illuminate effects and limits of inflexibility fees on electricity markets should be accomplished. Hints to tackle this problem may be indicated by the optimal taxation due to Ramsey [
Kiyak, C. and de Vries, A. (2017) Electricity Market Mecha- nism regarding the Operational Flexibility of Power Plants. Modern Economy, 8, 567- 589. https://doi.org/10.4236/me.2017.84043