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Extension of the Markov Chain Property

COROLLARY 4 : D is an I-map of P iff each variable X is conditionally independent in P of all its non-descendants, given its parents. Proof  : X is d-separated of all its non-descendants, given its parents. Since D is an I-map, by the soundness theorem the claim holds.

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Extension of the Markov Chain Property

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  1. COROLLARY 4: D is an I-map of P iff each variable X is conditionally independent in P of all its non-descendants, given its parents. Proof : X is d-separated of all its non-descendants, given its parents. Since D is an I-map, by the soundness theorem the claim holds. Proof : Each variable X is conditionally independent of all its non-descendants, given its parents implies using decomposition that it is also independent of its predecessors in a particular order d.

  2. COROLLARY 5: If D=(U,E) is a boundary DAG of P constructed in some order d, then any topological order d’ of U will yield the same boundary DAG of P. (Hence construction order can be forgotten). Proof : Each variable X is d-separated of all its non-descendants, given its parents in the boundary DAG of P. In particular, due to decomposition, X is independent given its parents from all previous variables in any topological order d’.

  3. Extension of the Markov Chain Property I(Xk, Xk-1, X1 … Xk-2)  I(Xk, Xk-1 Xk+1, X1 … Xk-2 Xk+2… Xn ) Holds due to the soundness theorem. Converse holds when Intersection is assumed. Markov Blankets in DAGs

  4. Consequence: There is no improvement to d-separation and no statement escapes graphical representation. Reasoning: (1) If there were an independence statement  not shown by d-separation, then  must be true in all distributions that satisfy the basis. But Theorem 10 states that there exists a distribution that satisfies the basis and its consequences but violates . (2) Same argument. [Note that (2) is a stronger claim.]

  5. Bayesian Networks Background Readings: An Introduction to Bayesian Networks, Finn Jensen, UCL Press, 1997. Some slides have been edited from Nir Friedman’s lectures which is available at www.cs.huji.ac.il/~nir. Changes made by Dan Geiger. .

  6. Smoking Visit to Asia Tuberculosis Lung Cancer Abnormality in Chest Bronchitis Dyspnea X-Ray The “Visit-to-Asia” Example What are the relevant variables and their dependencies ?

  7. S V L T B A X D Verifying the (in)Dependencies • We can now ask the expert: do the following assertion hold? • I( S; V ) • I( T; S | V ) • I( l; {T,V} | S ) • … • I( X; {V,S,T,L,B,D} |A) Alternative verification: Is each variable becoming independent of the rest, given its Markov boundary ? Take-Home Question: Are other variable construction orders as good ?

  8. S V L T B A X D Quantifying the Bayesian Network p(s) p(v) p(t|v) p(l|s) p(b|s) p(a|t,l) p(d|a,b) p(x|a) Bayesian network = Directed Acyclic Graph (DAG), annotated with conditional probability distributions.

  9. L (Yes/No) T (Yes/No) p(A|T,L) A (Yes/no) Local distributions Conditional Probability Table: p(A=y|L=n, T=n) = 0.02 p(A=y|L=n, T=y) = 0.60 p(A=y|L=y, T=n) = 0.99 p(A=y|L=y, T=y) = 0.99 Asymmetric independence in the CPT

  10. Queries There are several types of queries. Most queries involve evidence An evidence e is an assignment of values to a set E ofvariables in the domain Example, A Posteriori belief: P(D=yes| V = yes ) Or in general: P(H=h| E = e ) where H and E are subsets of variables. Equivalent to computing P(H=h, E = e ) and then dividing.

  11. S V L T B A X D A posteriori belief This query is useful in many cases: • Prediction: what is the probability of an outcome given the starting condition • Diagnosis: what is the probability of disease/fault given symptoms

  12. S V L T B A X D Example: Predictive+Diagnostic Probabilistic inference can combine evidence form all parts of the network, Diagnostic and Predictive, regardless of the directions of edges in the model. P(T = Yes | Visit_to_Asia = Yes, Dyspnea = Yes )

  13. Queries: MAP • Find the maximum a posteriori assignment for some variable of interest (say H1,…,Hl ) • That is, h1,…,hl maximize the conditional probabilityP(h1,…,hl | e) • Equivalent to maximizing the joint P(h1,…,hl, e)

  14. D2 D1 D4 D3 S2 S1 S4 S3 Bad alternator Bad magneto Not charging Bad battery Dead battery Queries: MAP We can use MAP for: • Explanation • What is the most likely joint event, given the evidence (e.g., a set of likely diseases given the symptoms) • What is the most likely scenario, given the evidence (e.g., a series of likely malfunctions that trigger a fault).

  15. How Expressive are Bayesian Networks 1. Check the diamond example via all boundary bases. • The following property holds for d-separation • but does not hold for conditional independence: • ID(X,{},Y) and ID (X,,Y)  ID (X,{}, ) or ID (,{},Y)

  16. Drawback: Interpreting the Links is not simple Another drawback is the difficulty with extreme probabilities. There is no local test for I-mapness. Both drawbacks disappear in the class of decomposable models, which are a special case of Bayesian networks

  17. Decomposable Models Example: Markov Chains and Markov Trees Assume the following chain is an I-map of some P(x1,x2,x3,x4) and was constructed using the methods we just described. The “compatibility functions” on all links can be easily interpreted in the case of chains. Same also for trees. This idea actually works for all chordal graphs.

  18. Chordal Graphs

  19. Interpretation of the links Clique 1 Clique 3 Clique 2 A probability distribution that can be written as a product of low order marginals divided by a product of low order marginals is said to be decomposable.

  20. Importance of Decomposability When assigning compatibility functions it suffices to use marginal probabilities on cliques and just make sure to be locally consistent. Marginals can be assessed from experts or estimated directly from data.

  21. The Diamond Example – The smallest non chordal graph Adding one more link will turn the graph to become chordal. Turning a general undirected graph into a chordal graph in some optimal way is the key for all exact computations done on Markov and Bayesian networks.

  22. Complexity of Inference Theorem: Computing P(X = x) in a Bayesian network is NP-hard. Main idea: conditional probability tables with zeros and ones are equivalent to logical gates. Hence reducibility to 3-SAT is the easiest to pursue.

  23. Proof We reduce 3-SAT to Bayesian network computation Assume we are given a 3-SAT problem: • Q1,…,Qn be propositions, • 1 ,... ,k be clauses, such that i = li1 li2  li3 where each lij is a literal over Q1,…,Qn (e.g.,Q1 = true) •  = 1... k We will construct a Bayesian network s.t. P(X=t) > 0 iff  is satisfiable

  24. ... P(Qi = true) = 0.5, P(I = true| Qi , Qj , Ql ) = 1 iff Qi , Qj , Qlsatisfy the clause I A1, A2, …, are simple binary AND gates Q1 Q2 Q3 Q4 Qn ... k-1 k 1 2 3 ... X A2 Ak-2 A1

  25. ... Q1 Q2 Q3 Q4 Qn ... k-1 k 1 2 3 ... X A2 Ak-2 A1 • It is easy to check • Polynomial number of variables • Each Conditional Probability Table can be described by a small table (8 parameters at most) • P(X = true) > 0 if and only if there exists a satisfying assignment to Q1,…,Qn • Conclusion: polynomial reduction of 3-SAT

  26. Inference is even #P-hard • P(X = t) is the fraction of satisfying assignments to  • Hence 2nP(X = t) is the number of satisfying assignments to  • Thus, if we know to compute P(X = t), we know to count the number of satisfying assignments to. • Consequently, computing P(X = t) is #P-hard.

  27. Hardness - Notes • We need not use deterministic relations in our construction. • The construction shows that hardness follows even with a small degree graphs. • Hardness does not mean we cannot do inference • It implies that we cannot find a general procedure that works efficiently for all networks • For particular families of networks, we can have provably efficient procedures (e.g., trees, HMMs). • Variable elimination algorithms.

  28. Extra Slides with more details If times allows

  29. Chordal Graphs

  30. Example of the Theorem • Each cycle has a chord. • There is a way to direct edges legally, namely, AB, AC, BC, BD, CD, CE • Legal removal order (eg): start with E, than D, than the rest. • The maximal cliques form a join (clique) tree.

  31. Theorem X: Every undirected graph G has a distribution P such that G is a perfect map of P.

  32. Proof of Theorem X Given a graph G, it is sufficient to show that for an independence statement  = I(,Z,) that does NOT hold in G, there exists a probability distribution that satisfies all independence statements that hold in the graph and does not satisfy  = I(,Z,). Well, simply pick a path in G between  and  that does not contain a node from Z. Define a probability distribution that is a perfect map of the chain and multiply it by any marginal probabilities on all other nodes forming P . Now “multiply” all P (Armstrong relation) to obtain P. Interesting task (Replacing HMW #4): Given an undirected graph over binary variables construct a perfect map probability distribution. (Note: most Markov random fields are perfect maps !).

  33. Interesting conclusion of Theorem X: All independence statements that follow for strictly-positive probability from the neighborhood basis are derivable via symmetry, decomposition, intersection, and weak union. These axioms are (sound and) complete for neighborhood bases. These axioms are (sound and) complete also for pairwise bases. In fact for saturated statements conditional independence and separation have the same characterization. See paper P2 .

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