Hedging Quantity Risks with Standard Power Options in a Competitive Electricity Market

Hedging Quantity Risks with Standard Power Options in a Competitive Electricity Market Yumi Oum, University of California at Berkeley Shmuel Oren, University of California at Berkeley Shijie Deng, Georgia Institute of Technology Eleventh Annual POWER Research Conference Berkeley, CA, March 24, 2006 Oum, Oren and Deng, March 24, 2006

Electricity Supply Chain Customers (end users served at fixed regulated rate) Generators Wholesale electricity market (spot market) LSE (load serving entity) Oum, Oren and Deng, March 24, 2006

Volumetric Risk for Load-Serving Entities • Properties of electricity demand (load) • Uncertain and unpredictable • Weather-driven  volatile • Sources of LSEs exposure • Highly volatile spot price • Flat (regulated) retail rates & limited demand response • Electricity is non-storable (no inventory) • Electricity demand has to be served (no “busy signal”) • Adversely correlated wholesale price and demand Covering expected load with forward contracts will result in a contract deficit when prices are high and contract excess when prices are low so the LSE faces net revenue exposure due to demand fluctuations Oum, Oren and Deng, March 24, 2006

Price and Demand Correlation Correlation coefficients: 0.539 for hourly price and load from 4/1998 to 3/2000 at Cal PX 0.7, 0.58, 0.53 for normalized average weekday price and load in Spain, Britain, and Scandinavia, respectively Oum, Oren and Deng, March 24, 2006

Tools for Volumetric Risk Management • Electricity derivatives • Forward or futures • Plain-Vanilla options (puts and calls) • Swing options (options with flexible exercise rate) • Temperature-based weather derivatives • Heating Degree Days, Cooling Degree Days • Power-weather Cross Commodity derivatives • Payouts when two conditions are met (e.g. both high temperature & high spot price) • Demand response Programs • Interruptible Service Contracts • Real Time Pricing Oum, Oren and Deng, March 24, 2006

Scope of This Work • Finding an optimal net revenue-hedging strategy for an LSE using plain electricity derivatives and forward contracts • Exploit the correlation between electricity spot price and power demand in volumetric risk management • Characterize an “optimal” exotic hedging instrument • Demonstrate the exposure reduction with an optimal exotic hedge • Replication of the optimal hedge with forward contracts and standard European call and put options • Sensitivity analysis with respect to model parameters. Oum, Oren and Deng, March 24, 2006

Model Setup • One-period model • At time 0: construct a portfolio with payoff x(p) • At time 1: hedged profit Y(p,q,x(p)) = (r-p)q+x(p) • Objective • Find a zero cost portfolio with exotic payoff which maximizes expected utility of hedged profit under no credit restrictions. r Load (q) p Spot market LSE x(p) Portfolio for a delivery at time 1 Oum, Oren and Deng, March 24, 2006

Mathematical Formulation • Objective function • Constraint: zero-cost constraint Utility function over profit Joint distribution of p and q ! A contract is priced as an expected discounted payoff under risk-neutral measure Q: risk-neutral probability measure B : price of a bond paying $1 at time 1 Oum, Oren and Deng, March 24, 2006

Optimality Condition The Lagrangian multiplier is determined so that the constraint is satisfied • Utility functions we examine • CARA (constant absolute risk aversion) utility function: • Mean-variance utility function: Oum, Oren and Deng, March 24, 2006

Optimal Payoff Functions Obtained • With a CARA utility function • With a Mean-variance utility function: Oum, Oren and Deng, March 24, 2006

Assumptions on distributions • We consider two different joint distributions for price and demand: • Bivariate lognormal-normal distribution: • Bivariate lognormal distribution: Oum, Oren and Deng, March 24, 2006

Optimal Exotic Payoff • Bivariate lognormal-normal distribution: • For a CARA utility • For a mean-variance utility Oum, Oren and Deng, March 24, 2006

Optimal Exotic Payoff • Bivariate lognormal distribution: • For a mean-variance utility Oum, Oren and Deng, March 24, 2006

Illustrations of Optimal Exotic Payoffs • Bivariate lognormal-normal distribution Dist’n of profit Dist’n of p Optimal exotic payoff CARA Mean-Var r Oum, Oren and Deng, March 24, 2006

Illustrations of Optimal Exotic Payoffs Bivariate lognormal distribution: Dist’n of profit Optimal exotic payoff Mean-Var Mean-Var Note: For the mean-variance utility, the optimal payoff is linear in p when correlation is 0, E[p] Oum, Oren and Deng, March 24, 2006

Volumetric-hedging effect on profit dist’n • Comparison of profit distribution for an LSE with mean-variance utility (ρ=0.8) • Price hedge: optimal forward hedge • Price and quantity hedge: optimal exotic hedge Bivariate lognormal for (p,q) Bivariate lognormal-normal for (p,q) Oum, Oren and Deng, March 24, 2006

Sensitivity to market risk premium With Mean-variance utility (a =0.0001) With CARA utility Oum, Oren and Deng, March 24, 2006

Sensitivity to risk-aversion • Optimal payoffs by risk aversion (Bigger ‘a’ = more risk-averse) with mean-variance utility(m2 = m1+0.1) with CARA utility Note: if m1 = m2 (i.e., P=Q), ‘a’ doesn’t matter for the mean-variance utility. Oum, Oren and Deng, March 24, 2006

Replication with Standard Instruments • We’ve obtained an exotic payoff function that we like to replicate with standard forward contracts plus a portfolio of call and put options. • Carr and Madan(2001) showed any twice continuously differentiable function can be written as: • Replication ( s  forward price F) Strike > F Bond payoff Forward payoff Put option payoff Call option payoff Strike < F Payoff Payoff Payoff p K F K Forward price Strike price Strike price Oum, Oren and Deng, March 24, 2006

Strike < F Strike > F Bond payoff Forward payoff Put option payoff Call option payoff Replication of Exotic Payoffs • Thus, exact replication can be obtained from • a long cash position of size x(F) • a long forward position of size x’(F) • long positions of size x’’(K) in puts struck at K, for a continuum of K which is less than F (i.e., out-of-money puts) • long positions of size x’’(K) in calls struck at K, for a continuum of K which is larger than F (i.e., out-of-money calls) • Q: How to determine the options position given a limited number of available strike prices? Oum, Oren and Deng, March 24, 2006

Discretization • For put options with available strikes K1<K2<…<Kn Thus, use size of long put position for strike price Ki • Similarly, for call options with available strikes k1<k1<…<kn, Thus, use size of long call position for strike price ki Payoff of put option struck at Ki Oum, Oren and Deng, March 24, 2006

Replicating Portfolio (CARA/lognormal-normal) puts calls F Payoffs from discretized portfolio Oum, Oren and Deng, March 24, 2006

Replicating Portfolio(MV/lognormal-normal) puts calls F Payoffs from discretized portfolio Oum, Oren and Deng, March 24, 2006

Replicating Portfolio(MV/lognormal-lognormal) puts calls F Payoffs from discretized portfolio Oum, Oren and Deng, March 24, 2006

Conclusion • We have constructed an optimal portfolio for hedging the increased exposure due to correlated price and volumetric risk for LSEs • Forward contracts plus a spectrum of call and put options • We have shown a good way of replicating exotic options with available call and put options given discrete strike prices. • The results obtained with an optimal hedging portfolio provide a useful benchmark for simpler hedging strategies. • Extensions • Decide the best hedging timing • Use Value-at-Risk measure • Optimal hedging under credit limit constraints Oum, Oren and Deng, March 24, 2006

Hedging Quantity Risks with Standard Power Options in a Competitive Electricity Market