markov game analysis for attack and defense of power networks
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Markov Game Analysis for Attack and Defense of
Power NetworksChris Y. T. Ma, David K. Y. Yau,
Xin Lou, and Nageswara S. V. Rao
Power Networks are Important Infrastructures(And Vulnerable to Attacks)
• Growing reliance on electricity• Aging infrastructure• Introduced more connected digital sensing and
control devices (and attract attacks on cyber space)• Hard and expensive to protect• Limited budget• How to allocate the limited resources?– Optimal deployment to maximize long-term payoff
Modeling the Interactions – Game Theoretic Approaches
• Static game– Each player has a set of actions available– Outcome and payoff determined by action of all
players– Players act simultaneously
Static Game
• Example
Defend &Attack
Defend & No Attack
No defend& Attack
No defend & No Attack
Modeling the Interactions – Game Theoretic Approaches
• Leader-follower game (Stackelberg game)– Defender as the leader– Adversary as the follower– Bi-level optimization – minimax operation• Inner level: follower maximizes its payoff given a
leader’s strategy• Outer level: leader maximizes its payoff subject to the
follower’s solution of the inner problem
Stackelberg Game
• Example
Defend No defend
Attack NoAttack Attack No
Attack
Only model one-time interactions
Modeling the Interactions – Markov Decision Process
• Markov Decision Process (MDP)– System modeled as set of states with Markov
transitions between them– Transition depends on action of one player and
some passive disruptors of known probabilistic behaviors (acts of nature)
Markov Decision Process (MDP)
• Example (2 states, each has 2 actions available)
up down
Defend
No defend
Recover
No recover
0.9
0.6
0.1
0.9
0.1
0.4
0.9
0.1
Only models one intelligent player
Our Approach – Markov Game
• Generalizations of MDP to an adversarial setting– Models the continual interactions between
multiple players• Players interact in the new state with different payoffs
– Models probabilistic state transition because of inherent uncertainty in the underlying physical system (e.g., random acts of nature)
Problem Formulation
• Defender and adversary of a power network– Two-player zero-sum game
• Game formulation:– Adversary
• Actions: which link to attack• Payoff: cost of load shedding by the defender because of the
attack– Defender
• Actions: which (up) link to reinforce or which (down) link to recover
• Payoff: cost of load shedding because of the attack
Markov Game – Reward Overview• Assume five links; link 4 both attacked and defended
(u,u,u,u,u) (u,u,u,u,u)
(u,u,u,d,u)
(u,u,u,u,u)
(u,u,u,d,u)
p1
1-p1
• Immediate reward of such actions is the weighted sum of successful attack and successful defense
• Assume at state (u,u,u,d,u), link 4 both attacked and defended again
p2
1-p2
• Immediate reward at state (u,u,u,d,u) is then the weighted sum of successful recovery and failed recovery
• This immediate reward is further “propagated” back to the original state (u,u,u,u,u) with a discount factor
• Hence, actions taken in a state will accrue a long-term reward
Solving the Markov Game – Definitions
•
Finding the Optimal Strategy – Solving a Linear Program
•
Solving the Markov Game – Value Iteration
• Dynamic program (value iteration) to solve the Markov game
Experiment Results
Link diagram
State {u,u,u,u,u}
Links 4 and 5 both connect to generator, and generator at bus 4 has higher output
Experiment Results
Payoff Matrix of state {u,u,u,u,u} for the static game.
Payoff Matrix of state {u,u,u,u,u} for the Markov game. (ϒ = 0.3)
Conclusions
• Using Markov game to model the attack and defense of a power network between two players
• Results show the action of players depends not only on current state, but also later states– To obtain the optimal long term benefit
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