1 / 0

Ways to Incorporate Ontology and Bayesian Network

Ways to Incorporate Ontology and Bayesian Network. Presented By: Asma Sanam Larik. Three Approaches. Following ways have been applied to incorporate them: 1) Ontology Mapping Enhancement using BN 2) Extending Ontology queries by BN reasoning

mada
Download Presentation

Ways to Incorporate Ontology and Bayesian Network

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. Ways to Incorporate Ontology and Bayesian Network

    Presented By: AsmaSanamLarik
  2. Three Approaches Following ways have been applied to incorporate them: 1) Ontology Mapping Enhancement using BN 2) Extending Ontology queries by BN reasoning 3) Semi automated construction of BN from domain ontology
  3. Purpose of the Mapping Approach Mapping Approach Designers of Ontology apply different views of the same domain during ontology development. This yields heterogeneity at ontology level which is the main obstacle to semantic interoperability. Ontology mapping is the approach trying to solve this problem
  4. Research in Ontology Mapping 1. OMEN (Ontology Mapping ENhancer 2004) OMEN: A Probabilistic Ontology Mapping Tool by PrasenjitMitra, AnujJaiswal, Pennsylvania State University and Stanford University 2. BayesOWL (2005) A Bayesian Network Approach to Ontology mapping by Zhongli Ding, YunPeng, UMBC 3. OntoBayes (2006) OntoBayes:An Ontology driven Uncertainty Model by Yi Yang and Jacques Calmet, University of Karlsruhe, Germany
  5. Purpose of Extending Ontology reasoning Approach Extending Ontology Queries: Existing ontology query languages cannot provide answers to queries involving probabilities like the following ones: What is the likelihood of default of a company given that it is limited and has branches outside Europe? What is the likelihood of a particular project type given that it is led by male managers working for a ltd company? Thus BN are applied for this sort of probabilistic reasoning Proposed by Bellandi Andrea, Turini Franco April 2009, University of Pisa, Italy
  6. Purpose of automatic BN construction approach Automatic BN Construction: The creation of BN requires identifying variables of interest, their influence on each other and construction of CPT. Based on existing domain ontologies these methods propose methodology for Ontology based generation of Bayesian Networks
  7. Research on Automated BN Construction Stefan Fenz (University of Vienna, Austria) 2008 Ann Devitt and K. Mutosikova 2006 (Network Management Research Centre, Ireland) Hai-tao Zhang , B-Yoeng Kang (Soeul National University, Korea ) 2007
  8. Ontology Mapping with BN
  9. BayesOWL Approach Probabilistic Ontology is an Annotated Ontology that contains set of prior and Conditional Distributions This approach takes a simple Ontology file and a Probability file and maps both of them to generate a Bayesian Network Purpose of doing so is to use Bayesian Inference for OWL reasoning
  10. Purpose/ Direction of Approach In domain modeling I know that A is a subclass of B now one may wish to express the probability that an instance of B belongs to an instance of A Also if A and B are not logically related one may still wish to express how much A is overlapped with B In Ontology Reasoning one may wish to know degree of similarity of A to B even if A and B are not subsumed by each other
  11. Its purpose is in Concept Mapping between two ontologies where it is often the case that concept defined by one ontology has partial matching with concept in other Ontology
  12. How to Incorporate PO? Probabilistic Information Markups Structural translation Constructing CPT for L-Nodes Constructing CPT for Concept Nodes
  13. Structural Translation
  14. CPT for L-Nodes
  15. CPT for Concept NodesExample taken from Zhongli Ding’s Thesis Next a constraint on B is applied R1(B)=(0.61,0.39)
  16. Initial Knowledge Base Marginal on B Constraint on B New JPD From new JPD the constraint is satisfied. Next another constraint on C is applied R2(C)= (0.83,0.17) shown in next slide
  17. Initial Knowledge Base Marginal on C Constraint on C New JPD
  18. Reasoning The BayesOWL framework can support common ontology reasoning tasks as probabilistic reasoning in the translated BN Concept Overlapping Concept Subsumption
  19. Automated BN Construction
  20. Ontology-based generation of Bayesian Networks By Stefan Fenz and Min Tjoa University of Vienna S.Fenz Ontology and Bayesian-based information security risk management PhD. Thesis, Vienna University of Technology, Oct 2008
  21. Motivation Creation of BN requires at least three challenging tasks: Determination of relevant influence factors Determination of relationships between identified influence factors Calculation of CPT’s Ontologies are a potential solution to address stated challenges
  22. Example Security Ontology 1) Security Attribute: Confidentiality Integrity Availability 2) Threat Source: Accidental Deliberate 3) Threat origin: Human Natural 4) Vulnerability: Physical Technical Administrative 5) Control Type: Preventive Corrective Recovery 6) Severity Level High, Medium, Low
  23. Methodology Proposed Concepts Nodes in BN Relations Links Axioms  Node states Instances  Findings
  24. Concept Nodes Following factors have been identified: 1) Predecessor Threats (PT1Ti , ……, PTnTi ) influence the considered threat Ti which influences it successor threats (ST1Ti , ……, STnTi)
  25. Continue.. 2) Each threat (Ti) requires one or more vulnerabilities (V1,….,Vn) to become effective
  26. Axiomsnode scales and weights Three point Likert scale (High, Medium) For CPT construction Severity rating Svi is defined for each vulnerability therefore a numerical weight Wppvi for each vulnerability is identified by dividing severity of vulnerability by the sum of all vulnerabilities relevant to the threat
  27. Continue.. 3) Controls can be used to mitigate identified vulnerabilities, mitigation depends on the effectiveness of a potential control combination (CCEvi) which again depends on the actual effectiveness of control implementation (CE1,…., CEn)
  28. Continue.. 4) a) Incase of deliberate threat sources, the vulnerability exploitation probability PPVi is determined by the effectiveness of a potential attacker (AEVi) which is again determined by the motivation (AMVi) and the capabilities of the attacker (ACVi) b) Incase of accidental threat sources (PPVi) is determined by a prior probability (APTi) of corresponding threat Ti
  29. Relations Links
  30. Limitations Functions for calculating CPT are not provided by Ontology and have to be modeled externally Human Intervention is necessary if the ontology provides a knowledge model that does not exactly fit the domain of interest
  31. Clinical CPG’s
  32. Extending Ontology Query with BN Inference
  33. Strategy Extracting the BN directly from the ontology: Definition of the ontology compiling process for extracting the Bayesian network structure directly from the schema of the knowledge base. Learning the initial probability distributions. Providing a Bayesian query language for answering queries involving probabilities Using inference over the BN for answering queries involving probabilities: Definition of the language operational semantics, based on the well-known Bayesian network reasoning schemas
  34. An example of Ontology Compiling Process
  35. Extracting a Bayesian network from an Ontology – An Example (1)‏ An Ontology O is a pair <T, R > where T = {T1,..,Ti,..,Tn} is a set of hierarchies called domain concepts R  Ti x Tj is a set of arcs binding elements of T such that the resulting graph is acyclic. is-a relation Object property T2 MAN T4 R1= T1 hasCeo R3= hasSector PERSON SECTOR WOMAN COMPANY R2= leads T3 PROJECT SERVICES FINANCIAL VENDOR JOINTVENTURE RESEARCH CREDITCARD LIFEINSURANCE COMPTETITOR SUPPLIER PATENT T1= COMPANY = {Company,Vendor, Jointv, Compet, Suplier} T2= PERSON = {Person, Man, Woman} R1 : COMPANY  PERSON R2 : PERSON  PROJECT T3= PROJECT = {Project, Research,PAtent} R3 : COMPANY  SECTOR T4= SECTOR = {Sector,Services,Financial,CreditCard,LifeIns}
  36. Extracting a Bayesian network from an Ontology – An Example (2)‏ P(COMPANY)‏ P(Company=c)‏ T1 COMPANY P(VENDOR|COMPANY)‏ P(JOINTVENTURE|COMPANY)‏ VENDOR JOINTVENTURE P(SUPPLIER|VENDOR) P(COMPETITOR|VENDOR)‏ P(Sector=s |hasSector Company=c)‏ SUPPLIER P(Person=p |hasCeo Company=c)‏ COMPETITOR R1 R3 T4 P(SECTOR)‏ T2 P(PERSON)‏ SECTOR P(FINANCIAL|SECTOR)‏ P(SERVICES|SECTOR)‏ PERSON SERVICES FINANCIAL P(WOMAN|PERSON)‏ P(MAN|PERSON)‏ P(CREDITCARD|FINANCIAL)‏ MAN WOMAN P(LIFEINSURANCE|FINANCIAL)‏ LIFEINSURANCE CREDIT CARD R2 P(Project=pr |leads Person=p)‏ P(PROJECT)‏ T3 PROJECT High Level Node P(PATENT|PROJECT)‏ P(RESEARCH|PROJECT)‏ High Level Relation RESEARCH PATENT Low Level Node Low Level Relation
  37. Ontology Compiling Process
  38. Ontology Compiling Process It is composed of two phases: Phase one: compiling TBox ontology in a 2lBN structural part Phase two: compiling ABox ontology in a2lBN probabilistic part HLN_COMPANY LLRT HLR_Ceo HLRT LLN hasCeo Company Customer Partenrship Jointventure 0.56 0.86 0.36 0.29 0.44 0.14 0.64 0.71 1 1 1 1 Man Woman Person HLN_PERSON
  39. 2lBN structural part The compiling process of a TBox component maps: Each ontology class to a booelan random variable (LLN)‏ Each concept domain to a multi-valued random variable (HLN)‏ Each object property to a Bayesian arc (HLR)‏ 2lBN probabilistic part The initial probability distribution is computed on the basis of the distribution of the instances, that is the ABox component. Two kind of probability exists: Low Level Relation Probability Table (LLRT)‏ A Prior probability P(A) represents the probability that an arbitrary ontology instance belongs to theclass A. A Conditional Probability P(A|B) represents the probability that an arbitrary ontology instance belonging to the class B, belongs also to the class A. High Level Relation Probability Table (HLRT)‏ A Conditional Probability P(A|RB) represents the probability that it does exist a relation R (i.e., an object property or a path of object properties) between arbitrary ontology instances of A and arbitraryontology instances of B
  40. Low Level Relations probability distribution - example Starting from this table, we can compute the probability distribution by applying the Bayes formula in the following form:
  41. High Level Relations probability distribution - example Number of triples satisfying the TBox schema <Company, hasCeo, Person> Number of instances belonging to the sub-space of Company corresponding to “Company with a CEO”
  42. Inference over Bayesian network
  43. Inference over Bayesian network (1)‏ P(A)‏ Top-Down. Causal Reasoning P(D | A) = A P(B)‏ P(D,B | A) + P(D,B | A)‏ B Bottom-Up. Diagnostic Reasoning P(A | D) = P(C|B)‏ P(D | A) * P(A)‏ D C P(D)‏ P(D|A,B)‏ Top-Down/Bottom-Up. Explaining Away Reasoning P(A | B, D) = P(D | B,A) * P(B | A) * P(A)‏ P(D, B | A) * P(A)‏ = P(B,D)‏ P(B,D)‏ InferenceoverBayesiannetworksis, in general, NP-hard.
  44. Inference over Bayesian network (2)‏ Polytree is a class of Bayesian Networks that can efficiently be solved in timelinear in the number of nodes. Polytree property: Exists a unique path between each possible coupleof nodes. Fixed a node D, is always possible to partition all the other nodes into two disjoint sets: set over D, which is the set of nodes that are connected to D only by the fathers of D. set under D, which is the set of nodes that are connected to D only by the immediate descendents of D.
  45. Bayesian query structure The general structure of a probabilistic query is P(QUERY |pathEVIDENCE) where: QUERY is a node of the polytree EVIDENCE can be both one node over and one node under w.r.t query, one node over w.r.t. query, one node under w.r.t. query EVIDENCE can refer: is-a ontology relations (classical bayesian conditioning, that is path is empty)‏ object properties (bayesian conditioning is annotated with the path binding query to evidence)‏ EVIDENCE over QUERY (A, B, C, E)‏ QUERY node (D)‏ EVIDENCE under QUERY (F, G, H, I)‏
  46. P(COMPANY)‏ P(Company=c)‏ COMPANY P(VENDOR|COMPANY)‏ VENDOR JOINTVENTURE P(SUPPLIER|VENDOR)‏ P(JOINTVENTURE|COMPANY)‏ P(COMPETITOR|VENDOR)‏ hasCeo COMPETITOR SUPPLIER P(PERSON)‏ P(SECTOR)‏ PERSON SECTOR P(WOMAN|PERSON)‏ P(MAN|PERSON)‏ P(FINANCIAL|SECTOR)‏ P(SERVICES|SECTOR)‏ MAN WOMAN FINANCIAL SERVICES EVIDENCE FINANCIAL is underQUERY Company EVIDENCE FINANCIAL is overQUERY PATENT EVIDENCE FINANCIAL is overQUERY Person Bottom-Up Inference (Bayes Formula)‏ P(PROJECT)‏ Top Down Inference Top Down Inference PROJECT P(PATENT|PROJECT)‏ P(RESEARCH|PROJECT)‏ P(Company |(hasSector) FINANCIAL) = P(PATENT |(leads.hasCeo.hasSector) FINANCIAL)= P(PATENT |(leads)Person) *P(Person |(hasCeo.hasSector) S1) P(Person |(hasCeo.hasSector) FINANCIAL)= P(Person |(hasCeo) Company) *P(Company |(hasSector) FINANCIAL) P(FINANCIAL |(hasSector)Company) * P(Company)*1 RESEARCH PATENT P(FINANCIAL)‏ Normalisation factor Which is the probability that a Patent project is led by person which is CEO of a company operating in the financial sector ? P(PROJECT=patent|(leads.hasCeo.hasSector) SECTOR=financial)‏ COMPANY hasSector PERSON PERSON FINANCIAL leads PATENT
More Related