Well Placement Optimization under Uncertainty with CMA-ES Using the Neighborhood

Abstract: In the well placement problem, as well as in many other field development optimization problems, geological uncertainty is a key source of risk affecting the viability of field development projects. Well placement problems under geological uncertainty are formulated as optimization problems in which the objective function is evaluated using a reservoir simulator on a number of possible geological realizations. The existing approaches to cope with geological uncertainty require multiple reservoir simulations (o… Show more

“…, 𝑦 𝑠 } by discretizing the space Y. In this case, the min-max problem can be formulated as min 𝑥 ∈X max 𝑦 ∈𝑆 𝑓 (𝑥, 𝑦), and this formulation is employed in many applications, particularly in geo-science field [Bouzarkouna 2012;Miyagi et al 2019Miyagi et al , 2023Yeten et al 2003]. However, in this formulation, the worst-case function 𝐹 𝑠 := max 𝑦 ∈𝑆 𝑓 (𝑥, 𝑦) significantly depends on the discretization method of the space Y and the number of scenarios |𝑆 |.…”

“…In other words, a simulator such that ℎ sim (𝑥) ≈ ℎ real (𝑥) must be developed. However, owing to some real-world uncertainties, the predetermined conditions often contain errors and hence ℎ sim (𝑥) does not approximate ℎ real (𝑥) well [Bouzarkouna 2012;Chen et al 2013;Oberkampf et al 2002;Scheidegger et al 2018;Walker et al 2003]. In such situations, there is a risk that the optimal solution obtained in simulation-based optimization, 𝑥 sim = argmin 𝑥 ∈X ℎ sim (𝑥), does not perform well in the real-world and results in ℎ real (𝑥 sim ) ≫ ℎ sim (𝑥 sim ).…”

Covariance Matrix Adaptation Evolutionary Strategy with Worst-Case Ranking Approximation for Min--Max Optimization and its Application to Berthing Control Tasks

“…, 𝑦 𝑠 } by discretizing the space Y. In this case, the min-max problem can be formulated as min 𝑥 ∈X max 𝑦 ∈𝑆 𝑓 (𝑥, 𝑦), and this formulation is employed in many applications, particularly in geo-science field [Bouzarkouna 2012;Miyagi et al 2019Miyagi et al , 2023Yeten et al 2003]. However, in this formulation, the worst-case function 𝐹 𝑠 := max 𝑦 ∈𝑆 𝑓 (𝑥, 𝑦) significantly depends on the discretization method of the space Y and the number of scenarios |𝑆 |.…”

“…In other words, a simulator such that ℎ sim (𝑥) ≈ ℎ real (𝑥) must be developed. However, owing to some real-world uncertainties, the predetermined conditions often contain errors and hence ℎ sim (𝑥) does not approximate ℎ real (𝑥) well [Bouzarkouna 2012;Chen et al 2013;Oberkampf et al 2002;Scheidegger et al 2018;Walker et al 2003]. In such situations, there is a risk that the optimal solution obtained in simulation-based optimization, 𝑥 sim = argmin 𝑥 ∈X ℎ sim (𝑥), does not perform well in the real-world and results in ℎ real (𝑥 sim ) ≫ ℎ sim (𝑥 sim ).…”

Covariance Matrix Adaptation Evolutionary Strategy with Worst-Case Ranking Approximation for Min--Max Optimization and its Application to Berthing Control Tasks

“…This problem in petroleum community has been considered by selecting a finite number of N r realizations and modeling the objective function as below (Bouzarkouna et al, 2012):…”

An efficient optimization process for hydrocarbon production in presence of geological uncertainty using a clustering method: A case study on Brugge field

Multi-objective optimization for rapid and robust optimal oilfield development under geological uncertainty