Infinite Regress Arguments (eBook)
XII, 211 Seiten
Springer Netherland (Verlag)
978-90-481-3341-3 (ISBN)
Infinite regress arguments are part of a philosopher's tool kit of argumentation. But how sharp or strong is this tool? How effectively is it used? The typical presentation of infinite regress arguments throughout history is so succinct and has so many gaps that it is often unclear how an infinite regress is derived, and why an infinite regress is logically problematic, and as a result, it is often difficult to evaluate infinite regress arguments. These consequences of our customary way of using this tool indicate that there is a need for a theory to re-orient our practice.
My general approach to contribute to such a theory, consists of collecting and evaluating as many infinite regress arguments as possible, comparing and contrasting many of the formal and non-formal properties, looking for recurring patterns, and identifying the properties that appeared essential to those patterns. Two very general questions guided this work: (1) How are infinite regresses generated in infinite regress arguments? (2) How do infinite regresses logically function as premises in an argument? In answering these questions I clarify the notion of an infinite regress; identify different logical forms of infinite regresses; describe different kinds of infinite regress arguments; distinguish the rhetoric from the logic in infinite regress arguments; and suggest ways of improving our discussion and our practice of constructing and evaluating these arguments.
Infinite regresses (e.g., event3 caused event2, event2 caused event1, ad infinitum; statement3 justifies statement2, statement2 justifies statement1, ad infinitum) have been used as premises in arguments on a great variety of topics in both Eastern and Western philosophy since ancient times. They are part of a philosopher's tool kit of argumentation. But how sharp or strong is this tool? How effectively is it used? The typical presentation of infinite regress arguments throughout history is so succinct and has so many gaps that it is often unclear how an infinite regress is derived, and why an infinite regress is logically problematic, and as a result, it is often difficult to evaluate infinite regress arguments. These prevalent consequences indicate that there is a need for a theory to re-orient our practice. After well over two thousand years of using infinite regresses as premises, one would have expected that at least some theory of infinite regress arguments would have emerged. None exists. There have been only a few articles on infinite regress arguments, but they are based on the examination of only a small number of examples, discuss only a few logical or rhetorical aspects of infinite regress arguments, and so they help to meet the need for a theory in only a limited way. Given the situation, I examined many infinite regress arguments to clarify the various aspects of the derivation of infinite regresses, and explain the different ways in which certain infinite regresses are unacceptable. My general approach consisted of collecting and evaluating as many infinite regress arguments as possible, comparing and contrasting many of the formal and non-formal properties, looking for recurring patterns, and identifying the properties that appeared essential to those patterns. The six chapters of this book gradually emerged from this approach. Two very general questions guided this work: (1) How are infinite regresses generated in infinite regress arguments? (2) How do infinite regresses logically function in an argument? In answering these questions I avoided as much as possible addressing the philosophical content and historical background of the arguments examined. Due to the already extensive work done on causal regresses and regresses of justification, only a few references are made to them. However, the focus is on other issues that have been neglected, and that do contribute to a general theory of infinite regress arguments: I clarify the notion of an infinite regress; identify different logical forms of infinite regresses; describe different kinds of infinite regress arguments; distinguish the rhetoric from the logic in infinite regress arguments; and discuss the function of infinite regresses in arguments. The unexamined derivation of infinite regresses is worth deriving - to discover what we have kept hidden from ourselves, improve our ways of constructing and evaluating these arguments, and sharpen and strengthen one of our argumentative tools. This work is one example of empirical logic applied to infinite regress arguments: "e;the attempt to formulate, to test, to clarify, and to systematize concepts and principles for the interpretation, the evaluation, and the sound practice of reasoning"e; (Finocchiaro, M. Arguments about Arguments, Systematic, Critical and Historical Essays in Logical Theory. P48).
Acknowledgements 5
Introduction 9
1 What is an Infinite Regress Argument? 11
1.1 The General Structure of Infinite Regress Arguments 11
1.2 Boundaries of an Infinite Regress Argument 15
1.2.1 Boundaries when an Infinite Regress is Vicious 16
1.2.2 Boundaries when an Infinite Regress is Benign 19
1.3 A Hypothesis About the Nature of Infinite Regresses 22
1.4 Testing Hypothesis H 28
1.5 Testing Hypothesis H with Nonconcatenating Regresses 31
1.6 Potentially Infinite and Actually Infinite Regresses 35
1.7 The Necessary Quantity of Terms and Relations 38
1.8 Applications of Hypothesis H to Various Examples 41
1.8.1 Plato's Couch 41
1.8.2 Teachers Taught by Teachers 42
1.8.3 Gods Giving Meaning to Gods 43
1.8.4 Maps of Maps 45
1.8.5 Lewis Carroll''s ''What the Tortoise Said to Achilles'' 48
1.9 Logical Functions of Infinite Regresses 54
1.9.1 Benign Regresses 55
1.9.2 Superfluous Regresses 59
1.10 Cogency and Benign Regresses 62
2 The Formal and Nonformal Logic of Infinite Concatenating Regresses 67
2.1 Recurring Terms, Loops, and Regress Formulas 67
2.2 The Relation of Terms and Objects of an Infinite Regress 73
2.3 Applications 74
2.4 Recurring Terms, Loops, and Infinite Concatenating Regresses 78
2.5 Relations and Loops 82
2.6 Blocking All Possible Loops 85
2.7 Are Irreflexivity, or Asymmetry or Transitivity Necessary to Block Loops? 88
2.8 Concatenating Relations in Regress Formulas 91
2.9 Directions of Infinite Concatenating Regresses 92
2.9.1 The Importance of the Direction of an Infinite Regress 93
2.9.2 The Formal Direction of an Infinite Regress 94
2.9.3 The Semantic Direction of an Infinite Regress 96
2.10 Non-formal Considerations in Regress Formulas 97
2.10.1 Relations and Their Implications 98
2.10.2 Unstated Properties of Relations and Terms 99
2.10.3 Stated Properties of Objects or Conditions in a Regress Formula 100
2.10.4 Unstated Properties of Objects Designated by Terms 101
2.11 Summary 108
2.12 Evaluative Questions 109
3 Viciousness 111
3.1 Are There Inherently Vicious Regresses? 111
3.2 Clark on Viciousness 115
3.3 Johnstone and Viciousness 117
3.4 Uncompletability and Viciousness 121
3.5 Occams Razor: Ontological Extravagance 125
3.6 Blocking Vicious Infinite Regresses 129
3.6.1 Hume 130
3.6.2 Miller 133
3.6.3 Laurence and Margolis 135
3.6.4 The General form of the Argument for Blocking Regresses 137
4 Circular Definitions, Circular Explanations, and Infinite Regresses 141
4.1 A Formal Derivation of Infinite Regresses from Circular Definitions 141
4.2 Infinitely Many Infinite Regresses 144
4.3 Semantic Considerations 145
4.4 Regresses Independent of Circularity 148
4.5 The Viciousness of Infinite Regresses Entailed by Circular Definitions 149
4.6 The Derivation of Infinite Regresses from Circular Explanations 152
5 Infinite Regresses and Recurring Questions 157
5.1 Recurring Questions and the Derivation of Infinite Regresses 159
5.2 Recurring Questions and Vicious Regresses 163
6 Infinite Regresses of Recurring Problems and Responses 168
6.1 Platos Aviary in the Theatetus 169
6.2 McTaggarts Discontinual Regress 172
6.3 Mackies Discontinual Regress 176
6.4 Armstrongs Continual Regress 181
6.5 A Continual Regress in Defense of Cantors Diagonal Method 187
6.6 Lehrers Regress of Recurring Possible Problems and Possible Responses 191
6.7 Evaluative Questions 197
6.8 Summary of the Book 198
Appendix A 202
Appendix B 203
References 211
Index 1
Erscheint lt. Verlag | 15.12.2009 |
---|---|
Reihe/Serie | Argumentation Library | Argumentation Library |
Zusatzinfo | XII, 211 p. |
Verlagsort | Dordrecht |
Sprache | englisch |
Themenwelt | Geisteswissenschaften ► Philosophie ► Allgemeines / Lexika |
Geisteswissenschaften ► Philosophie ► Erkenntnistheorie / Wissenschaftstheorie | |
Geisteswissenschaften ► Philosophie ► Logik | |
Geisteswissenschaften ► Philosophie ► Metaphysik / Ontologie | |
Geisteswissenschaften ► Religion / Theologie | |
Schlagworte | benign regress • David Hume • empirical logic • Formal Logic • infinite regress • Logic • Philosophy • Plato • reason • Reasoning • recurrence • recurring problems • Regress • regress arguments • Regression • superflous regress • vicious regress |
ISBN-10 | 90-481-3341-6 / 9048133416 |
ISBN-13 | 978-90-481-3341-3 / 9789048133413 |
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