Optimal Planning for Deepwater Oilfield Development Under Uncertainties of Crude Oil Price and Reservoir

3.1. Objective function

The discrete-time representation is adopted in this model. Suppose s ∈ S stands for the set that considers uncertainties; r ∈ R stands for the set of reservoirs; t ∈ T stands for the set of years; i ∈ I_r stands for the set of predrilling of reservoir r; l ∈ L stands for the set of available FPSO; and a ∈ A stands for the set of accumulated output ranges. Since multiple uncertainties are involved in the model, the maximum mean NPV of various conditions is taken as the objective function. The income is related to the annual crude oil price and output in this year. The expenditure is related to the construction and purchase cost of FPSO, daily maintenance cost, drilling cost, and diesel consumption cost.

where N _S represents the number of the considered uncertainties; N _{L l} represents the construction time for FPSO _l ; N _D represents the drilling time; I_t represents the discount rate in the year t; INC _s, t represents the total income in the year t under the specified scenario s, $/y; COS _s, t represents the total expenditure in the year t under the specified scenario s, $/y; C _PERs, t represents the crude oil price per unit volume in the year t under the specified scenario s, $/m³; C _BTLPl represents the construction cost for FPSO _l , $; C _FMOl represents the daily maintenance cost for FPSO _l , $/y; C _DIT represents the unit price of drilling cost, $; C _Ds, t represents the diesel price unit under the scenario s, $/m³; Q _{OPs, r, t, i} represents the crude oil output from the predrilling well i of the reservoir r in the year t under the specified scenario s, m³/y; Q _Ds, t, l represents the consumption diesel for FPSO _l electricity generation in the year t under the specified scenario s, m³/y; B _BTLPt, l represents a binary variable, if FPSO _l needs to be put into production in the year t, B _BTLPt, l  = 1, otherwise B _BTLPt, l  = 0; B _{DITr, t, i} represents a binary variable, if the predrilling well i of the reservoir r is drilled in the year t, B _{DITr, t, i}  = 1, otherwise B _{DITr, t, i}  = 0.

3.2. Drilling constraint

There are two states for all the predrilling wells: development or not.

where H _DITr, i represents a binary variable, if the drilling operation for the predrilling well of the reservoir r has been finished before the start time of the study, H _DITr, i  = 1, otherwise H _DITr, i  = 0; other variables are defined the same as before.

The drilling number of drilling vessels should be less than the maximum drilling capacity per year.

where N _CF max t represents the maximum drilling number of the year t; other variables are defined the same as before.

3.3. Output constraint

The accumulated output of each reservoir equals to that of the last year plus all the output of this reservoir in this year.

where V _{APs, r, t} represents the accumulated crude output of the reservoir r in the year t under the specified scenario s, m³; other variables are defined the same as before.

Binary variables can be divided by ranges to determine the range that accumulated output belongs to. When B _{APs, r, t, a}  = 1, V _AP min a  < V _{APs, r, t}  ≤ V _AP max a should be met.

where V _{APmins, r,a} represents the minimum value of the accumulated crude output range a in the reservoir r under the specified scenario s, m³; V _{APmaxs, r,a} represents the maximum value of the accumulated crude output range a in reservoir r under the specified scenario s, m³; M represents a positive maxima; B _{APs, r, t, a} represents a binary variable, if the accumulated crude output of the reservoir r in the year t belongs to the range a under the specified scenario s, B _{APs, r, t, a}  = 1, otherwise B _{APs, r, t, a}  = 0; other variables are defined the same as before.

The accumulated output must only exist in one set of range.

After the accumulated output range is determined, the maximum output of single well can be obtained by the linear fitting formula between the maximum output of single well and the accumulated output in the range. If the accumulated output locates in range a, B _{APs, r, t, a}  = 1, and then, Q _{UWPMs, r, t}  = ω _s, r, a V _{APs, r, t}  + μ _s, r, a .

where ω _{s, r, a, i} and μ _{s, r, a, i} represent the coefficients of the linear fitting formula for the maximum output of single well and the accumulated crude output; Q _{UWPMs, r, t, i} represents the maximum output of the predrilling i of the reservoir r in the year t under the scenario s, m³/y; other variables are defined the same as before.

The single well output needs to be less than the maximum output of the single well.

If drilling operation does not begin, the well output should be zero.

3.4. Production facility constraint

If one predrilling well is to be developed, one FPSO should be determined to be connected.

where B _{OITr, i, l} is a binary variable, if the predrilling well i of the reservoir r is connected to FPSO _l , B _{OITr, i, l}  = 1, otherwise B _{OITr, i, l}  = 0; other variables are defined the same as before.

If predrilling wells need to be connected to one FPSO, the FPSO should be put into production before being connected.

where H _HTLPl is a binary variable, if the FPSO _l has been put into production before the start time of the study, H _HTLPl  = 1, otherwise H _HTLPl  = 0; other variables are defined the same as before.

All the available FPSO can be put into production or not.

The predrilling wells to be developed can only be connected to one FPSO, and the transportation flow to the FPSO should be equal to the well output. If the predrilling wells to be developed do not connect to an FPSO, the transportation flow must be zero.

where Q _{OPLs, r, t, i, l} is the transportation flow from the predrilling well i of the reservoir r to the in FPSO _l the year t under the specified scenario s, m³/y; other variables are defined the same as before.

The total oil flow of one reservoir received by an FPSO should equal to the total output of all the predrilling wells in the reservoir that are connected to the FPSO.

where Q _{LPRs, r, t, l} is the total flow of the reservoir r received by FPSO _l in the year t under the specified scenario s, m³/y; other variables are defined the same as before.

When the accumulated output range is determined, the total flow of water and gas of one reservoir received by an FPSO can be obtained from the range.

where R _{PGs, r, a} is the gas/oil ratio of the accumulated output range a in the reservoir r under the specified scenario s; R _{PWs, r, a} is the water/oil ratio of the accumulated output range a in the reservoir r under the specified scenario s; Q _{LWRs, r, t, l} is the transportation water flow from the predrilling well i of the reservoir r to the FPSO _l in the year t under the specified scenario s, m³/y; Q _{LGRs, r, t, l} is the transportation gas flow from the predrilling well i of the reservoir r to the FPSO _l in the year t under the specified scenario s, m³/y; other variables are defined the same as before.

The water and gas flow received by each FPSO should be less than the throughput.

where Q _LPmaxl is the maximum oil throughput of the FPSO _l , m³; Q _LWmaxl is the maximum water throughput of the FPSO _l , m³; other variables are defined the same as before.

The FPSO energy consumption in production is related to the received oil and water flow, which can be supplied by natural gas or diesel.

where α _PE is the energy consumption required for processing the oil of a unit volume, MJ/m³; α _WE is the energy consumption when the water of a unit volume is processed, MJ/m³; β _GE is the available energy produced by the gas of a unit volume, MJ/m³; β _DE is the available energy produced by the diesel of a unit volume, MJ/m³; Q _{LGPs, t, l} is the gas emitted from the FPSO _l in the year t under the specified scenario s, m³; other variables are defined the same as before.

If production wells are connected to FPSO before the start time of the study, it will be unnecessary to identify the connection relationship. In other words, when H _{OITr, i, l}  = 1, B _{OITr, i, l}  = 1.

where H _{OITr, i, l} is a binary variable, if the predrilling well i of the reservoir r has been connected to the FPSO _l before the start time of the study, H _{OITr, i, l}  = 1, otherwise H _{OITr, i, l}  = 0; other variables are defined the same as before.

5.1. Initial data

In this paper, an oilfield is presented as a case study. The water depth in the field comes up to 1350–1525 m, and the area is 10.5 km² or so. There are no other neighboring oilfields, and the field consists of A and B reservoir. It is evaluated that the geologic reserve of reservoirs A and B is about 1.9 × 107 m³ and 3.7 × 107 m³, respectively, and rich in the natural water. The mean and standard deviation of reservoir parameters are shown in Table 1 . Considering the top-priority economic benefit and quick cost recovery, the oilfield is to be developed depending on natural energy. The recovery cycle is 10 year. The predrilling wells of each reservoir are 15, and the drilling cycle is 1 year. At the beginning of development, there are 5 kinds of FPSO optional, as shown in Table 2 . FPSO lease preparation and construction cycle both are one year. The crude oil price forecast over the next decade is shown in Figure 2 , and the uncertain fluctuation range of the oil price is given as 2%. Several series of reservoir parameters that are selected stochastically are incorporated into the reservoir numerical model, to carry out the relationship between the recovery degree of each reserve and the maximum output of single well, as shown in Figure 3 .

5.2. Calculation result

The scenario number exerts great influence on the model solution since the smaller scenario number leads to poor convergence, while the bigger leads to low calculation speed. To explore the influence of scenario number on the model solution, the uncertain scenario number is increased successively and the MILP solver, GUROBI, is applied in MATLAB R2014a to solve the model. The implementation result is shown in Figure 4 . It can be seen that the model tends to be convergent when the number comes up to 40 and finally the net profit is 1.551 billion dollars for 10-year development of the oilfield. The NPV variation with years is shown in Figure 5 .

The final result shows 18 drilling wells and 1 FPSO converted from old oil tanks are required, and all the drilling and construction can be finished in the first three years. The detailed construction and drilling plans are shown in Table 3 . The annual oil, gas, and water production outputs of the oilfield are shown in Figure 6 . The annual diesel consumption of FPSO is shown in Figure 7 . In the first year, 10 wells are to be developed and one oil tank should be turned into the FPSO. In the next two years, six wells and two wells are required to be developed, respectively, in order to stabilize the production. Since there is higher crude output in the third and fourth years, resulting in the produced natural gas insufficient for FPSO energy supply, addictive diesel is necessary for FPSO.

To verify the solving effect of the proposed MS-MILP method, three different methods, namely the MILP method that does not involve uncertainty, the improved GA [21], and the multistage goal programming (MGP) method in literature, are determined to solve this case. In this paper, 45 groups of reservoir parameters and crude oil price are generated stochastically as the test group. Based on the field planning by each method, the field NPV of 45 groups is calculated and the result is shown in Figure 8 [25].

As seen from the Figure 8 , the improved GA has the lowest mean NPV because its self-limitation causes converging to locally optimal solution. Compare with the MILP method, the MGP method is better because it considers the situation changing with the field development and models are established corresponding to different periods. However, the involved factors of MGP are less than MS-MILP; thus, the mean NPV of the former is lower than the latter. Particularly, when the oil price is lower than the expected and the reservoir scale is smaller than the expected, the NPV by MS-MILP is far higher than the other. In this way, considering the complex uncertainties of reservoir and oil price, the oilfield planning by MS-MILP has higher rate of return and its anti-risk ability is superior to the other.