Higher Order Logic and Hardware Verification.
Type de document | Site actuel | Cote | Statut | Date de retour prévue | Code à barres | Réservations |
---|---|---|---|---|---|---|
Livre | La bibliothèque des sciences de l'ingénieur | 621.392 MEL (Parcourir l'étagère) | Disponible | 0000000025931 |
Includes bibliographical references and index.
1. Hardware Verification. 1.1. The hardware verification method. 1.2. Limitations of hardware verification. 1.3. Abstraction. 1.4. Hardware verification using higher order logic -- 2. Higher Order Logic and the HOL System. 2.1. Types. 2.2. Terms. 2.3. Sequents, theorems and inference rules. 2.4. Constant definitions. 2.5. The primitive constant [epsilon]. 2.6. Recursive definitions. 2.7. Type definitions. 2.8. The HOL system -- 3. Hardware Verification using Higher Order Logic. 3.1. Specifying hardware behaviour. 3.2. Deriving behaviour from structure. 3.3. Formulating correctness. 3.4. An example correctness proof. 3.5. Other approaches -- 4. Abstraction. 4.1. Abstraction within a model. 4.2. Two problems. 4.3. Abstraction in practice. 4.4. Validity conditions. 4.5. A notation for correctness. 4.6. Abstraction and hierarchical verification. 4.7. Abstraction between models. 4.8. Other approaches -- 5. Data Abstraction. 5.1. Defining concrete types in logic. 5.2. An example: a transistor model.
5.3. An example of data abstraction. 5.4. Reasoning about hardware using bit-vectors. 5.5. Reasoning about tree-shaped circuits. 5.6. Other approaches -- 6. Temporal Abstraction. 6.1. Temporal abstraction by sampling. 6.2. An example: abstracting to unit delay. 6.3. A synchronizing temporal abstraction. 6.4. A case study: the T-ring. 6.5. Other approaches -- 7. Abstraction between Models. 7.1. Representing the structure of CMOS circuits. 7.2. Defining the semantics of CMOS circuits. 7.3. Defining satisfaction. 7.4. Correctness in the two models. 7.5. Relating the models. 7.6. Improving the results. 7.7. Other approaches.
This study describes solutions to the problem of ensuring the functional correctness of hardware. It considers the behaviour mathematically and verifies intended results by use of formal proof.
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