Optimal entry to an irreversible investment plan with non convex costs

Abstract: A problem of optimally purchasing electricity at a real-valued spot price (that is, allowing negative prices) has been recently addressed in De Angelis et al. (SIAM J Control Optim 53(3), 1199-1223, 2015. The problem can be considered one of irreversible investment with a cost function which is non convex with respect to the control variable. In this paper we study optimal entry into the investment plan. The optimal entry policy can have an irregular boundary, with a kinked shape.Keywords Continuous-time inve… Show more

“…For example, in the option pricing problem, the pricing model for American backdated options can be described as a two-dimensional free boundary problem [29][30][31]. De Angelis et al [32] considered the problem of optimal entry into an irreversible investment scheme with a cost function that is non-convex for the control variables, where it is necessary to study optimal entry policies with an irregular boundary. If the state space is irregular, the special handling of region interiors and boundaries is required, which may increase some computational complexity [33].…”

A Generalized Finite Difference Method for Solving Hamilton–Jacobi–Bellman Equations in Optimal Investment

“…For example, in the option pricing problem, the pricing model for American backdated options can be described as a two-dimensional free boundary problem [29][30][31]. De Angelis et al [32] considered the problem of optimal entry into an irreversible investment scheme with a cost function that is non-convex for the control variables, where it is necessary to study optimal entry policies with an irregular boundary. If the state space is irregular, the special handling of region interiors and boundaries is required, which may increase some computational complexity [33].…”

A Generalized Finite Difference Method for Solving Hamilton–Jacobi–Bellman Equations in Optimal Investment