TY - JOUR
T1 - The risk-averse ultimate pit problem
AU - Canessa, Gianpiero
AU - Moreno, Eduardo
AU - Pagnoncelli, Bernardo K.
N1 - Publisher Copyright:
© 2020, The Author(s).
PY - 2021/12
Y1 - 2021/12
N2 - In this work, we consider a risk-averse ultimate pit problem where the grade of the mineral is uncertain. We derive conditions under which we can generate a set of nested pits by varying the risk level instead of using revenue factors. We propose two properties that we believe are desirable for the problem: risk nestedness, which means the pits generated for different risk aversion levels should be contained in one another, and additive consistency, which states that preferences in terms of order of extraction should not change if independent sectors of the mine are added as precedences. We show that only an entropic risk measure satisfies these properties and propose a two-stage stochastic programming formulation of the problem, including an efficient approximation scheme to solve it. We illustrate our approach in a small self-constructed example, and apply our approximation scheme to a real-world section of the Andina mine, in Chile.
AB - In this work, we consider a risk-averse ultimate pit problem where the grade of the mineral is uncertain. We derive conditions under which we can generate a set of nested pits by varying the risk level instead of using revenue factors. We propose two properties that we believe are desirable for the problem: risk nestedness, which means the pits generated for different risk aversion levels should be contained in one another, and additive consistency, which states that preferences in terms of order of extraction should not change if independent sectors of the mine are added as precedences. We show that only an entropic risk measure satisfies these properties and propose a two-stage stochastic programming formulation of the problem, including an efficient approximation scheme to solve it. We illustrate our approach in a small self-constructed example, and apply our approximation scheme to a real-world section of the Andina mine, in Chile.
KW - Integer programming
KW - Mining
KW - Risk-averse optimization
KW - Ultimate pit
UR - http://www.scopus.com/inward/record.url?scp=85089151512&partnerID=8YFLogxK
U2 - 10.1007/s11081-020-09545-4
DO - 10.1007/s11081-020-09545-4
M3 - Article
AN - SCOPUS:85089151512
SN - 1389-4420
VL - 22
SP - 2655
EP - 2678
JO - Optimization and Engineering
JF - Optimization and Engineering
IS - 4
ER -