Optimal Water Storage Management in Multireservoir Hydroelectric Power SystemsInstitute in Engineering-Economic Systems, Stanford University, 1967 - Hydroelectricc power plants - 99 pages |
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Arrow Lake Chapter classes of energy Columbia River composite model formulation computational technique concave function convex function convex set cost function cost incurred cost of operation COST RATE discharge dynamic programming energy in storage evaluated expected marginal future expected total cost final total storage finding the optimal firm energy firm requirements functional equation future operation Hence hydroelectric power systems hydrogeneration initial storage marginal future cost mean annual inflow minimizes the expected multireservoir systems MW hr MWhr optimal allocation rule optimal operation policy optimal policy optimal reserve level penalty cost planning horizon planning interval policy of operation Pr{R probability density function probability distribution function R₁ R₂ secondary energy secondary load shown in Fig single-reservoir systems statistically independent stochastic streamflows thermal total energy total storage level transition probability United Arab Republic variable water in storage