The Great Formal Machinery Works - Jan Von Plato

The Great Formal Machinery Works

Theories of Deduction and Computation at the Origins of the Digital Age

(Autor)

Buch | Hardcover
392 Seiten
2017
Princeton University Press (Verlag)
978-0-691-17417-4 (ISBN)
39,90 inkl. MwSt
The information age owes its existence to a little-known but crucial development, the theoretical study of logic and the foundations of mathematics. The Great Formal Machinery Works draws on original sources and rare archival materials to trace the history of the theories of deduction and computation that laid the logical foundations for the digital revolution. Jan von Plato examines the contributions of figures such as Aristotle; the nineteenth-century German polymath Hermann Grassmann; George Boole, whose Boolean logic would prove essential to programming languages and computing; Ernst Schroder, best known for his work on algebraic logic; and Giuseppe Peano, cofounder of mathematical logic. Von Plato shows how the idea of a formal proof in mathematics emerged gradually in the second half of the nineteenth century, hand in hand with the notion of a formal process of computation. A turning point was reached by 1930, when Kurt Godel conceived his celebrated incompleteness theorems.
They were an enormous boost to the study of formal languages and computability, which were brought to perfection by the end of the 1930s with precise theories of formal languages and formal deduction and parallel theories of algorithmic computability. Von Plato describes how the first theoretical ideas of a computer soon emerged in the work of Alan Turing in 1936 and John von Neumann some years later. Shedding new light on this crucial chapter in the history of science, The Great Formal Machinery Works is essential reading for students and researchers in logic, mathematics, and computer science.

Jan von Plato is professor of philosophy at the University of Helsinki. His books include Elements of Logical Reasoning and Structural Proof Theory.

Preface ix

Prologue: Logical Roots of the Digital Age 1

1. An Ancient Tradition 5

1.1. Reduction to the Evident 5

1.2. Aristotle's Deductive Logic 7

1.3. Infinity and Incommensurability 16

1.4. Deductive and Marginal Notions of Truth 21

2. The Emergence of Foundational Study 29

2.1. In Search of the Roots of Formal Computation 31

2.2. Grassmann's Formalization of Calculation 40

2.3. Peano: The Logic of Grassmann's Formal Proofs 50

2.4. Axiomatic Geometry 57

2.5. Real Numbers 69

3. The Algebraic Tradition of Logic 81

3.1. Boole's Logical Algebra 81

3.2. Schroeder's Algebraic Logic 83

3.3. Skolem's Combinatorics of Deduction 86

4. Frege's Discovery of Formal Reasoning 94

4.1. A Formula Language of Pure Thinking 94

4.2. Inference to Generality 110

4.3. Equality and Extensionality 112

4.4. Frege's Successes and Failures 117

5. Russell: Adding Quantifiers to Peano's Logic 128

5.1. Axiomatic Logic 128

5.2. The Rediscovery of Frege's Generality 131

5.3. Russell's Failures 137

6. The Point of Constructivity 140

6.1. Skolem's Finitism 140

6.2. Stricter Than Skolem: Wittgenstein and His Students 151

6.3. The Point of Intuitionistic Geometry 167

6.4. Intuitionistic Logic in the 1920s 173

7. The Goettingers 185

7.1. Hilbert's Program and Its Programmers 185

7.2. Logic in Goettingen 191

7.3. The Situation in Foundational Research around 1930 210

8. Goedel's Theorem: An End and a Beginning 230

8.1. How Goedel Found His Theorem 230

8.2. Consequences of Goedel's Theorem 243

8.3. Two "Berliners" 248

9. The Perfection of Pure Logic 255

9.1. Natural Deduction 256

9.2. Sequent Calculus 286

9.3. Logical Calculi and Their Applications 303

10. The Problem of Consistency 318

10.1. What Does a Consistency Proof Prove? 319

10.2. Gentzen's Original Proof of Consistency 326

10.3. Bar Induction: A Hidden Element in the Consistency Proof 343

References 353

Index 373

Erscheinungsdatum
Verlagsort New Jersey
Sprache englisch
Maße 152 x 235 mm
Gewicht 680 g
Themenwelt Geisteswissenschaften Philosophie Logik
Mathematik / Informatik Informatik Theorie / Studium
Mathematik / Informatik Mathematik Logik / Mengenlehre
Naturwissenschaften
ISBN-10 0-691-17417-2 / 0691174172
ISBN-13 978-0-691-17417-4 / 9780691174174
Zustand Neuware
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