Given a convex stochastic programming problem with a discrete initial probability distribution, the problem of optimal scenario reduction is stated as follows: Determine a scenario subset of prescribed cardinality and a probability measure based on this set that is closest to the initial distribution in terms of a natural (or canonical) probability metric. Arguments from stability analysis indicate that Fortet-Mourier type probability metrics may serve as such canonical metrics. Efficient algorithms are developed that determine optimal reduced measures approximately. Numerical experience is reported for reductions of electrical load scenario trees for power management under uncertainty. For instance, it turns out that after a 50% reduction ...
Scenarios are indispensable ingredients for the numerical solution of stochastic optimization proble...
Discrete approximations to chance constrained and mixed-integer two-stage stochastic programs requir...
Discrete approximations to chance constrained and mixed-integer two-stage stochastic programs requir...
Given a convex stochastic programming problem with a discrete initial probability distribution, the ...
Given a convex stochastic programming problem with a discrete initial probability distribution, the ...
Given a convex stochastic programming problem with a discrete initial probability distribution, the ...
Given a convex stochastic programming problem with a discrete initial probability distribution, the ...
Given a convex stochastic programming problem with a discrete initial probability distribution, the ...
Given a convex stochastic programming problem with a discrete initial probability distribution, the ...
We consider convex stochastic programs with an (approximate) initial probability distribution P havi...
We consider convex stochastic programs with an (approximate) initial probability distribution P havi...
We consider convex stochastic programs with an (approximate) initial probability distribution P havi...
SIGLEAvailable from TIB Hannover: RR 6329(2000,9) / FIZ - Fachinformationszzentrum Karlsruhe / TIB -...
Scenarios are indispensable ingredients for the numerical solution of stochastic programs. Earlier a...
Discrete approximations to chance constraints and mixed-integertwo-stage stochastic programs require...
Scenarios are indispensable ingredients for the numerical solution of stochastic optimization proble...
Discrete approximations to chance constrained and mixed-integer two-stage stochastic programs requir...
Discrete approximations to chance constrained and mixed-integer two-stage stochastic programs requir...
Given a convex stochastic programming problem with a discrete initial probability distribution, the ...
Given a convex stochastic programming problem with a discrete initial probability distribution, the ...
Given a convex stochastic programming problem with a discrete initial probability distribution, the ...
Given a convex stochastic programming problem with a discrete initial probability distribution, the ...
Given a convex stochastic programming problem with a discrete initial probability distribution, the ...
Given a convex stochastic programming problem with a discrete initial probability distribution, the ...
We consider convex stochastic programs with an (approximate) initial probability distribution P havi...
We consider convex stochastic programs with an (approximate) initial probability distribution P havi...
We consider convex stochastic programs with an (approximate) initial probability distribution P havi...
SIGLEAvailable from TIB Hannover: RR 6329(2000,9) / FIZ - Fachinformationszzentrum Karlsruhe / TIB -...
Scenarios are indispensable ingredients for the numerical solution of stochastic programs. Earlier a...
Discrete approximations to chance constraints and mixed-integertwo-stage stochastic programs require...
Scenarios are indispensable ingredients for the numerical solution of stochastic optimization proble...
Discrete approximations to chance constrained and mixed-integer two-stage stochastic programs requir...
Discrete approximations to chance constrained and mixed-integer two-stage stochastic programs requir...