Verfügbarkeit: The foundations of computability theory

The foundations of computability theory:

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Bibliographische Detailangaben
Beteilige Person:	Robič, Borut 1960- (VerfasserIn)
Format:	Buch
Sprache:	Englisch
Veröffentlicht:	Heidelberg ; New York ; Dordrecht ; London ; Berlin Springer [2015]
Schriftenreihe:	Computer science
Schlagwörter:	Informatik Computermathematik Berechnungstheorie Graduate Computability theory Algorithms Models of computation Turing machine Oracles Relative computability
Links:	http://deposit.dnb.de/cgi-bin/dokserv?id=4748396&prov=M&dok_var=1&dok_ext=htm http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=028612127&sequence=000001&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
Beschreibung:	Literaturverzeichnis Seite 311 - 317
Umfang:	xx, 331 Seiten Illustrationen
ISBN:	9783662448076 9783662448083

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Datensatz im Suchindex

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adam_text	CONTENTS PART I THE ROOTS OF COMPUTABILITY THEORY 1 INTRODUCTION 3 1.1 ALGORITHMS AND COMPUTATION 3 1.1.1 THE INTUITIVE CONCEPT OF THE ALGORITHM AND COMPUTATION... 3 1.1.2 ALGORITHMS AND COMPUTATIONS BEFORE THE TWENTIETH CENTURY 5 1.2 CHAPTER SUMMARY 7 2 THE FOUNDATIONAL CRISIS OF MATHEMATICS 9 2.1 CRISIS IN SET THEORY 9 2.1.1 AXIOMATIC SYSTEMS 9 2.1.2 CANTOR S NAIVE SET THEORY 13 2.1.3 LOGICAL PARADOXES 17 2.2 SCHOOLS OF RECOVERY 19 2.2.1 SLOWDOWN AND REVISION 20 2.2.2 LNTUITIONISM 20 2.2.3 LOGICISM 23 2.2.4 FORMALISM 26 2.3 CHAPTER SUMMARY 29 3 FORMALISM 31 3.1 FORMAL AXIOMATIC SYSTEMS AND THEORIES 31 3.1.1 WHAT IS A FORMAL AXIOMATIC SYSTEM? 31 3.1.2 INTERPRETATIONS AND MODELS 35 3.2 FORMALIZATION OF LOGIC, ARITHMETIC, AND SET THEORY 39 3.3 CHAPTER SUMMARY 48 4 HILBERT S ATTEMPT AT RECOVERY 49 4.1 HILBERT S PROGRAM 49 4.1.1 FUNDAMENTAL PROBLEMS OF THE FOUNDATIONS OF MATHEMATICS . 49 4.1.2 HILBERT S PROGRAM 53 XV HTTP://D-NB.INFO/1054845239 XVI CONTENTS 4.2 THE FATE OF HILBERT S PROGRAM 54 4.2.1 FORMALIZATION OF MATHEMATICS: FORMAL AXIOMATIC SYSTEM M 54 4.2.2 DECIDABILITY OF M: ENTSCHEIDUNGSPROBLEM 55 4.2.3 COMPLETENESS OF M: GODEL S FIRST INCOMPLETENESS THEOREM 57 4.2.4 CONSEQUENCES OF THE FIRST INCOMPLETENESS THEOREM 58 4.2.5 CONSISTENCY OF M: GODEL S SECOND INCOMPLETENESS THEOREM 60 4.2.6 CONSEQUENCES OF THE SECOND INCOMPLETENESS THEOREM 61 4.3 LEGACY OF HILBERT S PROGRAM 63 4.4 CHAPTER SUMMARY 64 PROBLEMS 64 BIBLIOGRAPHIC NOTES 65 PART II CLASSICAL COMPUTABILITY THEORY 5 THE QUEST FOR A FORMALIZATION 69 5.1 WHAT IS AN ALGORITHM AND WHAT DO WE MEAN BY COMPUTATION? ... 69 5.1.1 INTUITION AND DILEMMAS 70 5.1.2 THE NEED FOR FORMALIZATION 71 5.2 MODELS OF COMPUTATION 72 5.2.1 MODELLING AFTER FUNCTIONS 72 5.2.2 MODELLING AFTER HUMANS 80 5.2.3 MODELLING AFTER LANGUAGES 82 5.2.4 REASONABLE MODELS OF COMPUTATION 86 5.3 COMPUTABILITY (CHURCH-TURING) THESIS 87 5.3.1 HISTORY OF THE THESIS 87 5.3.2 THE THESIS 88 5.3.3 DIFFICULTIES WITH TOTAL FUNCTIONS 90 5.3.4 GENERALIZATION TO PARTIAL FUNCTIONS 93 5.3.5 APPLICATIONS OF THE THESIS 97 5.4 CHAPTER SUMMARY 97 PROBLEMS 98 BIBLIOGRAPHIC NOTES 99 6 THE TTARING MACHINE 101 6.1 TURING MACHINE 101 6.1.1 BASIC MODEL 102 6.1.2 GENERALIZED MODELS 107 6.1.3 EQUIVALENCE OF GENERALIZED AND BASIC MODELS 109 6.1.4 REDUCED MODEL 113 6.1.5 EQUIVALENCE OF REDUCED AND BASIC MODELS 114 6.1.6 USE OF DIFFERENT MODELS 114 6.2 UNIVERSAL TURING MACHINE 115 6.2.1 CODING AND ENUMERATION OF TURING MACHINES 115 6.2.2 THE EXISTENCE OF A UNIVERSAL TURING MACHINE 117 6.2.3 THE IMPORTANCE OF THE UNIVERSAL TURING MACHINE 119 CONTENTS XVII 6.2.4 PRACTICAL CONSEQUENCES: DATA VS. INSTRUCTIONS 119 6.2.5 PRACTICAL CONSEQUENCES: GENERAL-PURPOSE COMPUTER 119 6.2.6 PRACTICAL CONSEQUENCES: OPERATING SYSTEM 121 6.2.7 PRACTICAL CONSEQUENCES: RAM MODEL OF COMPUTATION 122 6.3 USE OF A TURING MACHINE 125 6.3.1 FUNCTION COMPUTATION 125 6.3.2 SET GENERATION 127 6.3.3 SET RECOGNITION 130 6.3.4 GENERATION VS. RECOGNITION 133 6.3.5 THE STANDARD UNIVERSES Z* AND N 136 6.3.6 FORMAL LANGUAGES VS. SETS OF NATURAL NUMBERS 137 6.4 CHAPTER SUMMARY 138 PROBLEMS 139 BIBLIOGRAPHIC NOTES 141 7 THE FIRST BASIC RESULTS 143 7.1 SOME BASIC PROPERTIES OF SEMI-DECIDABLE (C.E.) SETS 143 7.2 PADDING LEMMA AND INDEX SETS 145 7.3 PARAMETRIZATION (S-M-N) THEOREM 147 7.3.1 DEDUCTION OF THE THEOREM 148 7.4 RECURSION (FIXED-POINT) THEOREM 149 7.4.1 DEDUCTION OF THE THEOREM 150 7.4.2 INTERPRETATION OF THE THEOREM 151 7.4.3 FIXED POINTS OF FUNCTIONS 152 7.4.4 PRACTICAL CONSEQUENCES: RECURSIVE PROGRAM DEFINITION 153 7.4.5 PRACTICAL CONSEQUENCES: RECURSIVE PROGRAM EXECUTION 154 7.4.6 PRACTICAL CONSEQUENCES: PROCEDURE CALLS IN GENERAL- PURPOSE COMPUTERS 156 7.5 CHAPTER SUMMARY 158 PROBLEMS 159 BIBLIOGRAPHIC NOTES 160 8 INCOMPUTABLE PROBLEMS 161 8.1 PROBLEM SOLVING 161 8.1.1 DECISION PROBLEMS AND OTHER KINDS OF PROBLEMS 162 8.1.2 LANGUAGE OF A DECISION PROBLEM 163 8.1.3 SUBPROBLEMS OF A DECISION PROBLEM 165 8.2 THERE IS AN INCOMPUTABLE PROBLEM * HALTING PROBLEM 166 8.2.1 CONSEQUENCES: THE BASIC KINDS OF DECISION PROBLEMS 169 8.2.2 CONSEQUENCES: COMPLEMENTARY SETS AND DECISION PROBLEMS 171 8.2.3 CONSEQUENCES: THERE IS AN INCOMPUTABLE FUNCTION 172 8.3 SOME OTHER INCOMPUTABLE PROBLEMS 172 8.3.1 PROBLEMS ABOUT TURING MACHINES 173 8.3.2 POST S CORRESPONDENCE PROBLEM 175 8.3.3 PROBLEMS ABOUT ALGORITHMS AND COMPUTER PROGRAMS 175 XVIII CONTENTS 8.3.4 PROBLEMS ABOUT PROGRAMMING LANGUAGES AND GRAMMARS .. 177 8.3.5 PROBLEMS ABOUT COMPUTABLE FUNCTIONS 179 8.3.6 PROBLEMS FROM NUMBER THEORY 180 8.3.7 PROBLEMS FROM ALGEBRA 180 8.3.8 PROBLEMS FROM ANALYSIS 182 8.3.9 PROBLEMS FROM TOPOLOGY 183 8.3.10 PROBLEMS FROM MATHEMATICAL LOGIC 184 8.3.11 PROBLEMS ABOUT GAMES 185 8.4 CAN WE OUTWIT INCOMPUTABLE PROBLEMS? 187 8.5 CHAPTER SUMMARY 189 PROBLEMS 189 BIBLIOGRAPHIC NOTES 190 9 METHODS OF PROVING INCOMPUTABILITY 191 9.1 PROVING BY DIAGONALIZATION 191 9.1.1 DIRECT DIAGONALIZATION 191 9.1.2 INDIRECT DIAGONALIZATION 194 9.2 PROVING BY REDUCTION 196 9.2.1 REDUCTIONS IN GENERAL 196 9.2.2 THE M-REDUCTION 197 9.2.3 UNDECIDABILITY AND M-REDUCTION 199 9.2.4 THE 1-REDUCTION 201 9.3 PROVING BY THE RECURSION THEOREM 204 9.4 PROVING BY RICE S THEOREM 205 9.4.1 RICE S THEOREM FOR FUNCTIONS 205 9.4.2 RICE S THEOREM FOR INDEX SETS 206 9.4.3 RICE S THEOREM FOR SETS 208 9.4.4 CONSEQUENCES: BEHAVIOR OF ABSTRACT COMPUTING MACHINES . 209 9.5 INCOMPUTABILITY OF OTHER KINDS OF PROBLEMS 210 9.6 CHAPTER SUMMARY 213 PROBLEMS 213 BIBLIOGRAPHIC NOTES 215 PART III RELATIVE COMPUTABILITY 10 COMPUTATION WITH EXTERNAL HELP 219 10.1 TURING MACHINES WITH ORACLES 219 10.1.1 TURING S IDEA OF ORACULAR HELP 220 10.1.2 THE ORACLE TURING MACHINE (O-TM) 223 10.1.3 SOME BASIC PROPERTIES OF O-TMS 225 10.1.4 CODING AND ENUMERATION OF O-TMS 226 10.2 COMPUTATION WITH ORACLES 228 10.2.1 GENERALIZATION OF CLASSICAL DEFINITIONS 228 10.2.2 CONVENTION: THE UNIVERSE N AND SINGLE-ARGUMENT FUNCTIONS231 10.3 OTHER WAYS TO MAKE EXTERNAL HELP AVAILABLE 231 CONTENTS XIX 10.4 RELATIVE COMPUTABILITY THESIS 232 10.5 PRACTICAL CONSEQUENCES: O-TM WITH A DATABASE OR NETWORK 232 10.6 PRACTICAL CONSEQUENCES: ONLINE AND OFFLINE COMPUTATION 233 10.7 CHAPTER SUMMARY 234 BIBLIOGRAPHIC NOTES 234 11 DEGREES OF UNSOLVABILITY 235 11.1 TURING REDUCTION 235 11.1.1 TURING REDUCTION OF A COMPUTATIONAL PROBLEM 236 11.1.2 SOME BASIC PROPERTIES OF THE TURING REDUCTION 237 11.2 TURING DEGREES 240 11.3 CHAPTER SUMMARY 243 PROBLEMS 244 BIBLIOGRAPHIC NOTES 244 12 THE TURING HIERARCHY OF UNSOLVABILITY 245 12.1 THE PERPLEXITIES OF UNSOLVABILITY 245 12.2 THE TURING JUMP 246 12.2.1 PROPERTIES OF THE TURING JUMP OF A SET 247 12.3 HIERARCHIES OF T-DEGREES 249 12.3.1 THE JUMP HIERARCHY 250 12.4 CHAPTER SUMMARY 252 PROBLEMS 252 BIBLIOGRAPHIC NOTES 253 13 THE CLASS 2? OF DEGREES OF UNSOLVABILITY 255 13.1 THE STRUCTURE ( , . ) 255 13.2 SOME BASIC PROPERTIES OF (T , , ) 257 13.2.1 CARDINALITY OF DEGREES AND OF THE CLASS X 257 13.2.2 THE CLASS T AS A MATHEMATICAL STRUCTURE 258 13.2.3 INTERMEDIATE 7 -DEGREES 263 13.2.4 CONES 264 13.2.5 MINIMAL T-DEGREES 266 13.3 CHAPTER SUMMARY 267 PROBLEMS 267 BIBLIOGRAPHIC NOTES 267 14 C.E. DEGREES AND THE PRIORITY METHOD 269 14.1 C.E. TURING DEGREES 269 14.2 POST S PROBLEM 270 14.2.1 POST S ATTEMPT AT A SOLUTION TO POST S PROBLEM 271 14.3 THE PRIORITY METHOD AND PRIORITY ARGUMENTS 274 14.3.1 THE PRIORITY METHOD IN GENERAL 274 14.3.2 THE FRIEDBERG-MUCHNIK SOLUTION TO POST S PROBLEM 278 14.3.3 PRIORITY ARGUMENTS 279 14.4 SOME PROPERTIES OF C.E. DEGREES 279 XX CONTENTS 14.5 CHAPTER SUMMARY 280 PROBLEMS 280 BIBLIOGRAPHIC NOTES 281 15 THE ARITHMETICAL HIERARCHY 283 15.1 DECIDABILITY OF RELATIONS 283 15.2 THE ARITHMETICAL HIERARCHY 284 15.3 THE LINK WITH THE JUMP HIERARCHY 288 15.4 PRACTICAL CONSEQUENCES: PROVING THE INCOMPUTABILITY 290 15.5 CHAPTER SUMMARY 292 PROBLEMS 292 BIBLIOGRAPHIC NOTES 293 16 FURTHER READING 295 A MATHEMATICAL BACKGROUND 297 B NOTATION INDEX 305 REFERENCES 311 INDEX 319
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spellingShingle	Robič, Borut 1960- The foundations of computability theory Informatik (DE-588)4026894-9 gnd Computermathematik (DE-588)4788218-9 gnd Berechnungstheorie (DE-588)4005581-4 gnd
subject_GND	(DE-588)4026894-9 (DE-588)4788218-9 (DE-588)4005581-4
title	The foundations of computability theory
title_auth	The foundations of computability theory
title_exact_search	The foundations of computability theory
title_full	The foundations of computability theory Borut Robič
title_fullStr	The foundations of computability theory Borut Robič
title_full_unstemmed	The foundations of computability theory Borut Robič
title_short	The foundations of computability theory
title_sort	the foundations of computability theory
topic	Informatik (DE-588)4026894-9 gnd Computermathematik (DE-588)4788218-9 gnd Berechnungstheorie (DE-588)4005581-4 gnd
topic_facet	Informatik Computermathematik Berechnungstheorie
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