scholarly journals Jump-Diffusion Models for Valuing the Future: Discounting Under Extreme Situations

2021 ◽  
Author(s):  
Jaume Masoliver ◽  
Miquel Montero ◽  
Josep Perelló
Keyword(s):  
Random Walk ◽  
Diffusion Process ◽  
Discount Rate ◽  
Environmental Planning ◽  
Dynamical Evolution ◽  
Jump Diffusion ◽  
Economic Evolution ◽  
Discount Function ◽  
Long Run ◽  
Future Discounting

We develop the process of discounting when underlying rates follow a jump-diffusion process, that is, when, in addition of diffusive behavior, rates suffer a series of finite discontinuities located at random Poissonian times. Jump amplitudes are also random and governed by an arbitrary density. Such a model may describe the economic evolution specially when extreme situations occur (pandemics, global wars, etc.). When between jumps the dynamical evolution is governed by an Ornstein-Uhlenbeck diffusion process, we obtain exact and explicit expressions for the discount function and the long-run discount rate and show that the presence of discontinuities may drastically reduce the discount rate, a fact that has significant consequences for environmental planning. We also discuss as a specific example the case when rates are described by the continous time random walk.

scholarly journals Jump-Diffusion Models for Valuing the Future: Discounting under Extreme Situations

Mathematics ◽  
2021 ◽  
Vol 9 (14) ◽  
pp. 1589
Author(s):  
Jaume Masoliver ◽  
Miquel Montero ◽  
Josep Perelló
Keyword(s):  
Diffusion Process ◽  
Discount Rate ◽  
Continuous Time ◽  
Environmental Planning ◽  
Dynamical Evolution ◽  
Jump Diffusion ◽  
Economic Evolution ◽  
Discount Function ◽  
Long Run ◽  
Future Discounting

We develop the process of discounting when underlying rates follow a jump-diffusion process, that is, when, in addition to diffusive behavior, rates suffer a series of finite discontinuities located at random Poissonian times. Jump amplitudes are also random and governed by an arbitrary density. Such a model may describe the economic evolution, specially when extreme situations occur (pandemics, global wars, etc.). When, between jumps, the dynamical evolution is governed by an Ornstein–Uhlenbeck diffusion process, we obtain exact and explicit expressions for the discount function and the long-run discount rate and show that the presence of discontinuities may drastically reduce the discount rate, a fact that has significant consequences for environmental planning. We also discuss as a specific example the case when rates are described by the continuous time random walk.

A Dynamic Analysis of Child Labor with a Variable Rate of Discount: Some Policy Implications

2006 ◽  
Vol 5 (1) ◽  
Author(s):  
Satya P Das ◽  
Rajat Deb
Keyword(s):  
Discount Rate ◽  
Child Labor ◽  
Time Preference ◽  
Infinite Horizon ◽  
Policy Implications ◽  
Poverty Trap ◽  
Variable Rate ◽  
Lump Sum ◽  
Long Run ◽  
Short Run

AbstractThis paper analyzes the problem of child labor in an infinite-horizon dynamic model with a variable rate of time preference and credit constraints. The variability in the rate of time preference leads to the possibility of multiple steady states and a poverty trap. The paper considers the long-run and short-run effects of an array of policies like enrollment subsidy, improvement in primary education infrastructure, lump-sum subsidy, and variations in loan market parameters. We distinguish between policies that reduce child labor in the long run only in the presence of a variable discount rate and other policies which work whether or not the discount rate is variable. Credit-related policies belong to the former group. Policies that reduce child labor and increase family consumption in the long run may have an adverse effect of lowering consumption in the short run.

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