Buch, Englisch, 192 Seiten, Format (B × H): 156 mm x 234 mm, Gewicht: 4439 g
Reihe: Applied Quantitative Finance
Theory and Cases
Buch, Englisch, 192 Seiten, Format (B × H): 156 mm x 234 mm, Gewicht: 4439 g
Reihe: Applied Quantitative Finance
ISBN: 978-1-137-41296-6
Verlag: Palgrave MacMillan UK
presents both theoretical elements and practical examples for solving energy optimization issues in gas and power markets. Starting with the theoretical framework and the basic business and economics of power and gas optimization, it quickly moves on to review the mathematical optimization problems inherent to the industry, and their solutions – all supported with examples from the energy sector. Coverage ranges from very long-term (and capital intensive) optimization problems such as investment valuation/diversification to asset (gas and power) optimization/hedging problems, and pure trading decisions.
This book first presents the readers with various examples of optimization problems arising in power and gas markets, then deals withgeneral optimization problems and describes the mathematical tools useful for their solution. The remainder of the book is dedicated to presenting a number of key business cases which apply the proposed techniques to concrete market problems. Topics include static asset optimization, real option evaluation, dynamic optimization of structured products like swing, virtual storage or virtual power plant contracts and optimal trading in intra-day power markets. As the book progresses, so too does the level of mathematical complexity, providing readers with an appreciation of the growing sophistication of even common problems in current market practice.
provides a valuable quantitative guide to the technicalities of optimization methodologies in gas and power markets; it is essential reading for practitioners in the energy industry and financial sector who work in trading, quantitative analysis and energy risk modeling.
Zielgruppe
Research
Autoren/Hrsg.
Fachgebiete
- Wirtschaftswissenschaften Wirtschaftssektoren & Branchen Energie- & Versorgungswirtschaft Öl- und Gasindustrie
- Wirtschaftswissenschaften Wirtschaftssektoren & Branchen Energie- & Versorgungswirtschaft Elektroindustrie
- Mathematik | Informatik Mathematik Numerik und Wissenschaftliches Rechnen Angewandte Mathematik, Mathematische Modelle
Weitere Infos & Material
1. Optimization in Energy Markets
1.1 Classification of optimization problems
1.1.1 Linear versus Nonlinear Problems
1.1.2 Deterministic versus Stochastic Problems
1.1.3 Static versus Dynamic Problems
1.2 Optimal portfolio selection among different investment alternatives
1.3 Energy Asset Optimization
1.3.1 Generation Asset Investment Valuation with Real Option Methodology
1.3.2 Generation, Transportation and Storage Asset Operational Optimization and Valuation
1.4 Energy Trading and Optimization
1.4.1 Asset allocation with Capital Constraints
1.4.2 Intraday trading
2. Optimization Methods
2.1 Linear Optimization
2.1.1 LP problems
2.2 Nonlinear Optimization
2.2.1 Unconstrained problem
2.2.2 Constrained Problems with Equality Constraints
2.2.3 Constrained Problems with Inequalities Constraints
2.3 Pricing financial assets
2.3.1 Pricing in energy markets
2.3.2 Pricing in incomplete markets
2.3.3 A motivating example: utility indifference pricing
2.4 Deterministic Dynamic Programming
2.5 Stochastic Dynamic Programming, discrete time
2.5.1 A motivating example
2.5.2 The general case
2.5.3 Tree methods
2.5.4 Least Square Monte Carlo methods
2.5.5 Naïve Monte Carlo with Linear Programming
2.6 Stochastic Dynamic Programming, continuous time
2.6.1 The Hamilton-Jacobi-Bellman equation
2.7 Deterministic numerical methods
2.7.1 Finite Difference Method for HJB equation
2.7.2Boundary conditions
2.8 Probabilistic numerical methods
2.8.1 Tree methods, continuous time
2.8.2 Computationally simple trees in dimension 1
2.8.3 Lattice of trees
2.8.4 Monte Carlo methods
3. Cases on Static Optimization
3.1 Case A: investment alternatives
3.2 Case B: Optimal generation mix for an electricity producer: a mean-variance approach
3.3 Conclusions
4. Valuing project's exibilities using the diagrammatic approach
4.1 Introduction
4.2 Description of the Investment Problem
4.3 Traditional evaluation Methods
4.4 Modelling Electricity Price Dynamics
4.5 Valuing Investment Flexibilities By Means Of The Lattice Approach
4.5.1 Investment alternative A
4.5.2 Investment alternative B
4.5.3 Investment alternative C
4.6 Conclusions
5. Virtual Power Plant Contracts
5.1 Introduction
5.2 Valuation Problem
5.2.1 Example
6. Algorithms comparison
The Swing Case
6.1 Introduction
6.2 Swing contracts
6.2.1 Indexed strike price modelling for gas swing contracts
6.2.2 The stochastic control problem
6.2.3 Dynamic Programming
6.3 Finite difference algorithm
6.3.1 Boundary conditions
6.3.2 The algorithm
6.4 Least Square Monte Carlo algorithm
6.4.1 The algorithm, and a reduction to one dimension
6.5 Naïve Monte Carlo with Linear Programming
6.6 Numerical Experiments
6.6.1 Finite differences
6.6.2 Least Square Monte Carlo
6.6.3 One year contract
6.7 Conclusions
7.Storage contracts
7.1 The contract
7.2 The evaluation problem
7.3 The optimal strategy (in the case of a physical gas storage)
7.4 The implementation
7.4.1 The gas cave
7.4.2 The gas spot price
7.4.3 The boundary conditions
7.4.4 Numerical experiment, no-penalty case
7.4.5 Numerical experiment, penalty case
8. Optimal Trading Strategies in Intraday Power Markets
8.1 Intraday power markets
8.1.1 Intraday power price features
8.1.2 Conclusions
8.2 Optimal Algorithmic Trading in Auction-Based Intraday Power Markets
8.2.1 The optimization problem
8.2.2 Example: Italian intra-day market
8.3 Optimal Algorithmic Trading in Continuous Time Power Markets
8.3.1 The optimization problem
8.3.2 Example: EPEX Spot market
