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Copyright © Norman Swartz 1997 URL http://www.sfu.ca/~swartz/definitions.htm This revision: November 8, 2010. Copyright © 2010. Department of Philosophy Simon Fraser University |
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Definitions, Dictionaries, and Meanings
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Contents | |||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||
1 INTRODUCTIONThere is a well known motto to the effect that we ought to define our terms. We are often warned that in discussing technical matters it is of the utmost importance to begin by defining the specialized words we will be using. | |||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||
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Few persons ever call that particular advice into question. There seems to be a self-obviousness to it. Even so, this apparent self-evidence may be nothing more than an outgrowth of our having been taught the adage at a young age before we became philosophically critical. Most of us have, in due course, come to be suspicious of – and, if not completely reject, then at least circumscribe – a great number of similar pieces of advice. Few of us as adults are likely to offer unqualified allegiance to such maxims as "Obey the Law" or "Work hard". As mature, reflective adults we have come to see that there are certain circumstances in which these are bad pieces of advice: you should not obey an immoral law, particularly if it is egregiously immoral; and you should not always work hard, if, for example, to do so without overriding need would jeopardize your health or happiness. Far too much stock has been placed in the supposed efficacy and utility of defining our terms. Students often approach philosophy with beliefs about definition which border on the magical. Students mistakenly believe that defining one's terms will usually have a powerful, beneficial payoff; but the actual dividend earned in defining one's terms is typically fairly meager. For example, suppose a philosophy instructor were to ask the philosophical question: "Can negative events be causes?" There are two ways one might think to invoke definitions in embarking on seeking an answer. The first is completely straightforward and unproblematic. A student might (indeed probably would) be unfamiliar with the technical terminology. A student might never before have heard the expression "negative event" and not know what it is supposed to mean. In such a situation, it would be perfectly appropriate for the student to ask "What does 'negative event' mean?" And the instructor might reply in this sort of way: "By 'negative event' I mean these sorts of things: abstaining from acting; failing to act; neglecting to see, hear, or do something; etc." So far, so good. The reply offered suffices to identify the subject of discourse. But having got that far, a new, much more difficult problem arises. Should abstainings, failures to act, neglected actions, etc. properly be regarded as causes? Are causes to be conceived of as being only classes of actions (or events) or are causes to be conceived of as including certain non-actions (or negative events)? Many students will be quick to answer: "Well, it all depends on one's definition of 'cause'." Does it? Where does one 'find' such a definition? If one were to propose a definition, what are the criteria for having got the definition 'right'? If two philosophers were to offer opposed, or incompatible, definitions how is one to adjudicate between them? Surely it would be arbitrary simply to choose one of them. The problem "Can negative events be causes?" like virtually all interesting, challenging problems – both inside philosophy and outside (psychology, biology, economics, history, literary criticism, etc.) – cannot be resolved by offering definitions. The question "Can negative events be causes?" cannot be answered by assuming that there is some 'objective' definition of "cause" against which we can hold up such things as failures to act to see whether or not they qualify as being causes. The actual procedure is, surprisingly, much the reverse. It is, rather, that by looking at problematic cases (such as failures to act) and asking probing questions about how we want to handle such cases, and by offering theories about the nature of causality, that we may come in time to agree upon a 'definition' of "cause". In philosophy, as in many other disciplines, good definitions are the product of lengthy debate, not the starting point. Now this may seem exceedingly odd. It may even strike one as paradoxical in the extreme. So wedded have some persons become to the mistaken dictum that they ought to define their terms, that they find it hard to imagine how it is even possible to get started without having first offered a set of definitions. As it turns out, not only is it possible to do so, it is necessary to do so. To see this, we must turn away from sloganizing and begin to examine the modern theory of definition. And as we usually discover when we abandon convenient slogans, we find that the truth of the matter is vastly more complicated than we might ever have imagined. We will begin by introducing some of the technical concepts we will need in our studies. [ Return to Table of Contents ]  2 USE AND MENTION1. Science begins with curiosity.Sentence 1 is perfectly sensible (even if what it expresses may be false). But sentence 2 above is a piece of literal nonsense. It is not science itself which begins with a letter; rather it is the word, "science", that begins with a letter. Sentence 2 should be repaired to read: 1'. "Science" begins with the nineteenth letter of the English alphabet.To talk (in English) about science (as in sentence 1 above), we use the (English) word which refers to, or names, science, viz. the word comprised of the seven letters "s", "c", "i", "e", "n", "c", and "e". But suppose we want to talk, not about science, but about that very word in English which we use to refer to science. Suppose we wanted to say of that word that it contains seven letters. We might write: 3. The word "science" contains seven letters.Or, again, suppose now (just to make life complicated) we wanted to talk about the part in sentence 3 which occurs between the words "word" and "contains" (viz. the part with the quotation marks). To talk about that part, we would like a name for it. [Note 1] What is the name for the linguistic part of sentence which consists of the nine items: a left-quotation mark, the letters "s", "c", "i", "e", "n", "c", "e", and a right-quotation mark? In the last few hundred years we have developed a technique (effective procedure) in written English (and in many other modern written languages) whereby we can simply and automatically generate the name of any term whatsoever. (Ancient languages lacked this – or an equivalent – technique.) The modern convention in written English for forming the name of a term is to enclose that term in quotation marks. [Note 2] Thus """science""" refers to ""science"" [Note 3] which in turn refers to "science" which in turn refers to science, and at this latter point the relation of referring terminates. When we use the name of a term in accordance with the just-reported convention we are said to be mentioning the term. We mention a term, by using its name, where its name is formed by enclosing the term in quotation marks. In the first sentence of this paragraph I used the term "accordance" and it occurred there without quotation marks. And in writing what I just have (in the third sentence of this paragraph) I mentioned the term "accordance" and it occurred there with quotation marks. [Note 4] [ Return to Table of Contents ] 2.1 Iconographic and Non-iconographic Names When we form the names of terms by quoting them, we form their names iconographically. We literally picture them. We place a picture of the term to be named within quotation marks. This is an extraordinarily useful technique. It allows us immediately to learn the referent of an iconographic name of a symbol (or word or expression) simply by inspecting that name itself. Consider, for example, the first letter of the Greek alphabet. In English, it has two names, an iconographic one (devised in accord with modern rules for quotation) and an ancient one inherited from times when iconographic names were not available in English. The two names (quotation marks omitted!) are: | |||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||
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By inspecting the iconographic name we can learn immediately what the term refers to. No amount of inspection of a non-iconographic term will ever reveal its referent. (Incidentally, we can see in this example another device for quoting, viz. placing the expression in a box. [Yet another technique is to set-off the expression on a separate line and indent it.] If these latter conventions were not available, then properly both of the examples just cited would themselves have had to have been enclosed in quotation marks.) Just to test yourself, try to see that the following claims are correct and accord with the conventions just discussed:
This convention we have in English of forming the name of a term by the device of enclosing that term within quotation marks is just that, a convention. There is nothing sacred about it. We could if we wanted, agree to use some other device. If we were so inclined, we could agree that the name of George's name would be "Henry" instead of ""George"". There is a passage in Lewis Carroll's Through the Looking Glass where he chooses to use a nonstandard device for naming. At first what the Knight is saying to Alice may appear to be literal nonsense. But it is not; it is merely unconventional. However, in addition to adopting a nonstandard manner of naming, Carroll introduces the further complicating wrinkle of distinguishing between the name of an item and what that item is called. Normally we think of these as one and the same thing; persons and things tend to be called by their names. But not always. We do make a distinction between names and nicknames (i.e. what persons are called, if not by their names). For example, we might find ourselves saying, "His name actually is 'Richard', but he's called 'Dick'." [Note 5] When the Knight says (below) that the song is called (rather than named) "Ways and Means", he apparently means that this is the song's nickname. [Note 6] Finally, to make the passage as coherent as possible, we probably should want to understand the sentence "The song really is 'A-sitting On a Gate' " as the Knight's previewing a fragment (the fourth line) of the song that he is about to sing, rather than as an attempt at naming that song. "You are sad," the Knight said in an anxious tone: "let me sing you a song to comfort you."To sum up this passage: we have (1) the song itself ([part of which is] "... A-sitting On a Gate. ..."); (2) the (official) name, "The Aged Aged Man", of that song; (3) an (unofficial) nickname (i.e. what the song is called), "Ways and Means"; and finally (4) a nickname, "Haddocks' Eyes", of the name ("The Aged Aged Man"). In the popular press – newspapers, magazines, etc. – writers and editors will often drop quotation marks, e.g. "The word equality as used by Mr. Denktash is being misunderstood," responds Greek Cypriot president George Vassiliou. ([24], p. 20)A strict use of quotations marks, as insisted upon by most writers in philosophy, would require: "The word 'equality' as used by Mr. Denktash is being misunderstood," responds Greek Cypriot president George Vassiliou.Philosophers, too, sometimes omit quotation marks. For example, John Stuart Mill writes: "Virtuous, for example, is the name of a class ..." ([16], Book I, Chap. II, §5). Or, again: "Snow, and other objects, receive the name white, because they possess the attribute which is called whiteness" (Ibid). In the latter sentence, Mill omits two sets of quotation marks: one on the word "white"; the other on the word "whiteness". The use/mention distinction (as it has come to be called) is of particular relevance in the theory of definitions. For when we give the definition of a term, we mention the term, we do not use it. For example, the term, "pain", is defined, but pain itself is not defined. We define only terms, never their referents. [ Return to Table of Contents ] | |||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||
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2.2 Corner-quotes (Advanced material) Suppose you have written a paragraph on a word-processor in which the word "posit" occurs several times and you decide that you want to use your software to search and replace each occurrence of "posit" with the word "hypothesize". If you are not careful, you might create some particularly bizarre results, e.g. you might find that the word "opposite" has been changed into the nonsensical "ophypothesizee". Clearly, when we are substituting on a word-for-word basis, we do not want to substitute within words. In the example just given, we would not want to regard the sequence of letters "p", "o", "s", "i" and "t" occurring within the word "opposite" as a genuine occurrence of the word "posit". Quotation marks, as we have just seen in the previous section, create new names. And just as one would not want to substitute for fragments of words (e.g. "hypothesize" for "posit" occurring in "opposite"), one must not substitute for fragments within quotation marks, for to do so one would, in effect, be substituting for fragments within names. For example, suppose you had used the word "wonder" in a paragraph and later decide you want to change it to "awe". If you were not careful, your word-processor might change "She stayed home that evening to watch 'The Wonder Years' on television" to "She stayed home that evening to watch 'The Awe Years' on television". In general, substitution is not permitted within quotation marks. The result of using quotation marks is to create a single cohesive name whose internal fragments are not themselves symbols for which substitution is permitted. In certain technical contexts, this prohibition on substitution within quotation marks poses a problem. Suppose, for example, that we were trying to state the rules which stipulate the permissible expressions (so called 'well-formed formulas') of a system of logic. We might try writing: If P and Q are formulas, then "(P & Q)" is a formula.But this will not do. Suppose we try to substitute specific expressions for P and for Q, e.g. "A" and "~B" respectively. What we would like to obtain from our rule is the following: If A and ~B are formulas, then "(A & ~B)" is a formula.Unfortunately, we do not get this latter sentence at all. Since substitution is not permitted within quotation marks, we get instead: If A and ~B are formulas, then "(P & Q)" is a formula.To circumvent this problem, mathematicians and logicians have invented a special-duty set of quotation marks – "  " and " " – sometimes called "quasi-quotes" and sometimes called
"corner-quotes". Corner-quotes act pretty much like ordinary quotation
marks except that they do allow substitution in their midst. To capture
the intention of the rule discussed above, one would write:
If P and Q are formulas, thenFrom this latter rule, we could derive, as we want, the rule: If A and ~B are formulas, then "(A & ~B)" is a formula.(For more on the use of corner-quotes, see [17], pp. 63-66.) [ Return to Table of Contents ] | |||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||
3 MOTIVATION FOR DEFINING OUR TERMSLet us at the outset be very sure that we realize that we can use a term, and use it correctly, even though we cannot define it. Our ability to define terms comes rather late in our linguistic abilities. Children talk, and know what they are talking about, although they cannot define even one of the terms they use. Using and understanding a language does not involve being able to define its terms.Well, then, if we can use a language without being able to define its terms, why bother with definitions at all? The answer, put simply, is that language is a tool, and its uses can be extended and improved. Here definition plays a role; it allows us to improve our use of language. Specifically, in what ways can definitions refine language? I mention three.
3.1 Exercise Write down at least two disambiguations (in the manner of d'. and d". above) of the sentence "Many studies have found that stereotypical assumptions are often made about women in the Canadian justice system" ("Clean sweep of sexism on agenda", in The Vancouver Sun [Aug. 17, 1992], p. A1). In each case, explain the source of the ambiguity, i.e. whether it arises in the grammatical construction of the original sentence, whether in the occurrence of an ambiguous term in that sentence, or whether from a combination of the two. [ Return to Table of Contents ] 4 SYMBOLIZATIONThe standard symbol used by philosophers, mathematicians, and logicians for "is [or means] by definition" is "=df". An example is:"a posteriori" =df "by experience"The term written to the left of the "=df"-symbol is known by the technical name, the "definiendum" ("that which is to be defined"). The expression occurring to the right, the expression which does the defining, is known as the "definiens". The symbol "=df" should be used only between quoted expressions (see the last paragraph in subsection 2.1 above). It would be a (syntactical) mistake, for example, to write: oxycodone =df dihydrohydroxycodeinoneRather one would write: "oxycodone" =df "dihydrohydroxycodeinone" [ Return to Table of Contents ] 5 SEVEN KINDS OF DEFINITIONSWhat kinds of definitions are there? I describe seven here, although I do not suggest that this list is complete.5.1 Stipulative Definitions Stipulative definitions stipulate, or specify, how a term is to be used. Sometimes stipulative definitions are used to introduce wholly new terms, othertimes to restrict (or narrow) a meaning in a particular context. The former use may be seen in the immediately preceding example, where the new term "oxycodone" is being introduced as an abbreviation (mercifully) for the mouthful "dihydrohydroxycodeinone". The latter use, where a stipulative definition narrows a use of a term, is found, for example, in some philosophy texts where an author may say something of this sort: In this book, I will use the term "entails" strictly in this way: to say that "x entails y " is to say that "y logically follows from x ". Other common uses, as – for example – when one says "A severe bout of flu entails a few days of bed rest", will not be used in this book. [Note 7]Occasionally authors will stipulate that they intend to use a term in a certain restricted fashion, but as their books unfold, careful readers will detect a reverting to more common meanings. This flaw frequently occurs in books treating such concepts as democracy, culture, perception, explanation, etc. The authors will initially announce that they intend to use a certain term in a restricted fashion, but sometimes within just a few pages they unwittingly fall back to using that term in its ordinary way(s). (The moral is that it is difficult to 'stick to' stipulative definitions of terms – e.g. "intention", "behavior", "meaning", "freedom", etc. – which have well-entrenched usages. There is the constant lure of lapsing into the prose of ordinary speech.) Although it is recognized that there are distinct snares in using stipulative definitions to narrow the meanings of common terms, some authors believe that using stipulative definitions to introduce new terms is unproblematic. Copi and Cohen, for example, (persisting with a sentence from earlier editions authored by Copi alone) write in the eighth edition of Introduction to Logic: "One who introduces a new symbol has complete freedom to stipulate what meaning is to be given to it" ([10], p. 132]). Actually, quite the opposite is true. Every time we introduce a new term via a stipulative definition we run the very real risk of introducing internal inconsistency into our language. Suppose we take it into our heads to introduce a new operation into arithmetic, an operation symbolized by a star "  ". We define the star-operation in this manner
[Note 8]:
"(m / n)At first the definition seems innocent enough, but once we start substituting numbers for the variables, quite unacceptable things start to happen. Let m = 1; n = 1; p = 2; and q = 3. We then get: (1 / 1)But since 1 / 1 is equal to 2 / 2, we also are entitled to infer that the expression appearing to the left of the first equals-sign is equal to, (2 / 2)This latter expression, however, when spelled out in terms of "+", according to our definition of " ", becomes,
(2 + 2) / (2 + 3) = 4 / 5Thus we have the same expression, "(1 / 1) (2 / 3)"
equal both to 3 / 4 and to 4 / 5. Now, two things equal to the same thing
are equal to each other. Thus we can write,
3 / 4 = 4 / 5Multiplying both sides by 20 yields: 15 = 16And, finally, subtracting 14 from both sides gives us a logically impossible (i.e. a self-inconsistent) result: 1 = 2.A seemingly innocuous definition has led to a contradiction in our arithmetical system. The addition of this single, ill-chosen definition (of " "), has made arithmetic inconsistent.
This problem, whereby inconsistency was induced by a poorly chosen definition in (an attempt to extend) arithmetic, is not unique to mathematics or even for that matter just to formal systems in general. Stipulative definition carries with it just as much a risk when used in ordinary language. Suppose I introduce the following stipulative definition, "ramanda" =df "a house without walls".If, however, I already have in my language a definition of the following sort, "house" means by definition "a roofed domicile with four walls",then the term "ramanda" is (implicitly) self-contradictory; and if I were to go on to say, "Jim has built a ramanda", you would be entitled to infer that Jim has built something which both has four walls and does not have any walls – a conclusion which is patently logically impossible. An example of a correct use of stipulative definition may be found in "Causes and Conditions" by John Mackie: "INUS condition" means "an insufficient but necessary part of a condition which is itself unnecessary but sufficient for the result" ([14], p. 245. On p. 246, Mackie gives a more formal definition of "INUS condition".) [ Return to Table of Contents ] 5.2 Lexical Definitions Lexical, or dictionary, definitions are reports of common usage (or usages). Such definitions are said to be reportive (alternatively, reportative) definitions. They are true or false depending on whether they do or do not accurately report common usage. In addition, if the dictionary is published by a prestigious firm and is compiled by competent and respected lexicographers, then the definitions are normative (or regulatory): the definitions both report and regulate common usage. It thus becomes possible to say of a given person that s/he is misusing a particular term. If a person's use of a term is at great variance with how that term is standardly used, and if that person does not stipulate that the term is being used in a specialized nonstandard way, then s/he is using that term incorrectly. [Note 9] Let's look to see what one might actually find in a good modern dictionary.
Uncritically, many persons suppose that dictionary definitions are all of a piece. In fact, however, as we have just seen, they are of a great many different sorts. One philosopher, Richard Robinson, has even gone so far as to suggest that a definition is anything in virtue of which we teach another person how to use a linguistic term. We need a name for the mere process of imparting the rule that this word means this thing ... And the name marked out for it by the history of language is "definition". Any teaching that a certain word is the name for a certain thing should be called "definition". ([18], pp. 48-49)Perhaps this is too liberal a proposal for the use of the word "definition". Perhaps the manner of teaching, or imparting, to another person the rule for the use of some term needs to be limited somewhat. Perhaps there are some ways of 'imparting rules' which we might be inclined not to regard as 'giving a definition'. If there are, we can, nonetheless, appreciate the insight which prompted Robinson's sweeping claim: there is no one formula – or even for that matter, just a few formulas – for giving definitions. Dictionaries are the handiwork of human beings trying to convey useful information to other human beings about how certain words are used (and, in some instances, misused). [Note 11] Like any other product of human labor, occasionally errors creep in. For example, in the 1974 edition of Webster's New Collegiate Dictionary ([22]) – one of the finest, and most prestigious, dictionaries in the United States – we find the following misbegotten pair of definitions:
Apart from the obvious inconsistency (corrected in more recent editions), there is a second problem as well. Note that the definition of "masseur" includes "and physiotherapy". Inasmuch as physiotherapy sometimes goes beyond massage, e.g. to include electrical stimulation of muscles, it is false that every masseur practices physiotherapy, or that practicing physiotherapy is a necessary condition [Note 12] for being a masseur. A masseur may practice physiotherapy, but then again, he may not. More properly, the first definition ought to have been only: "a man who practices massage". It bears mentioning that there is no such thing as the dictionary. There are a great many dictionaries on the market today, even more in libraries. Some (e.g. the Merriam-Webster, the New World, the Random House, and the Oxford English) are first-rate; some others are distinctly inferior. (Incidentally, the name "Webster's" is no guarantee of quality. "Webster's" is not a copyrighted name; anyone is free to name a dictionary a "Webster's dictionary". "Webster's" connotes only that a dictionary is one of American [U.S.] English.) However good or prestigious a dictionary, none of them is ultimately 'authoritative': whatever 'authority' any dictionary has is attributable only to the skill and diligence of the men and women who compiled it. Dictionaries do not define words; we do. Dictionaries report our standard usages. The definitions in dictionaries are usually little more than helpful 'hints' as to how words are used (i.e. are standardly used among educated speakers and writers of the language). Many persons, however, have misconceived notions of the contents and powers of dictionaries. How many of us have seen letters to editors of newspapers in which correspondents will jawbone opponents by invoking the seeming sanctity and authoritativeness of 'the' dictionary. They will write such things as "the [sic] dictionary defines democracy as 'that system of government in which the citizens vote on issues concerning them' and thus anything less than submitting tax bills to referendum is undemocratic". A case in point: The Canadian Charter of Rights and Freedoms appears to provide a good foundation for liberty, enshrining it as a right that cannot be infringed by the state unless the infringement is both reasonable and "demonstrably justified in a free and democratic society."Unfortunately, invoking "the[sic] dictionary" carries little weight in such a dispute. Dictionaries are not designed to adjudicate issues such as the limits of a citizenry's freedoms, nor, for example, whether a given policy is "democratic". Scholars and thinkers write volumes on such matters. It is naive to think that dictionaries, in which definitions are limited to some tens or hundreds of words, could have very much useful to offer on the genuinely weighty concerns of society. Just as no one would think to solve problems in physics or chemistry or medicine by consulting a dictionary, one ought not to believe that one can solve problems in, e.g., philosophy, political science, psychology, etc., by consulting a dictionary. [ Return to Table of Contents ] 5.3 Precising Definitions Precising definitions are used to refine the meaning of an established term whose meaning is vague in a context and which needs improving. What is a "public disturbance"? No definition covers all the possible circumstances that such a term might cover. The drafters of a law cannot be expected to be able to foresee all the ways it is possible to disturb the peace. Courts of law constantly refine the meaning of the term as new cases occur; they reduce the vagueness – and their decisions become precedents for future reference. Consider also such terms as "public interest", "obscenity", "intelligence", and "disease". A paradigm case-study of a precising-definition has been reported in Time magazine. The state of Iowa plans to take legal action early next year against any citizen who would 'allow, cause, or permit the emission of objectionable odors into the atmosphere.' But what is the legal definition of an objectionable odor? The six members of the state's air-pollution-control commission have been pondering that question, and at one meeting they even spent the better part of an hour debating whether an objectionable odor exists if no one is there to smell it. They decided that it does. [ Return to Table of Contents ] 5.4 Theoretical Definitions Some philosophers [Note 13], have portrayed theoretical definitions as if they were unique to science and philosophy and do not occur in ordinary prose. This is an overly restrictive analysis; theories are not unique to science but characterize virtually all our thinking. It is true that physicists have given the word "radiation" a heavy theoretical weight to bear – the definition is constructed in light of certain physical theories. But, then, so too is the common word "water". Our use of it is premised on (or alternatively, our use of it presupposes), the well-established belief, or theory, that a certain cluster of properties (e.g. liquidity, transparency, non-acidity, non-causticity, etc.) occur together regularly enough to merit their being given a name: "water". Further, just by calling something "water", we sanction the theoretical implication that the substance will turn to ice when it freezes. It is easy to overlook the presence of theoretical definitions in ordinary discourse, precisely because the theories we have at the common-sense level are so well established. But even at this level, theories do change, and consequently, so do meanings. A term such as "disease" simply does not mean the same to contemporary educated persons as it did to the witchcraft practitioners of only a few centuries ago. [ Return to Table of Contents ] 5.5 Operational Definitions In the first quarter of the twentieth century, there was an enormous conceptual fracture in physics. Einstein's special and general theories of relativity and the emerging theory of quantum mechanics challenged and eventually superseded the Newtonian view of the world. It is hard today for many persons to imagine how massive a shock the Einsteinian revolution was to scientists who had been taught, and who had done so much profitable work using, the Newtonian theory. To many of those scientists, the new theories seemed outlandish, patently false, and unacceptably counterintuitive. In 1927, the physicist Percy Bridgman (1882-1961) undertook a peculiar and ambitious task. He set about looking for a new way of doing physics, one which would prevent scientists from making the sorts of commitments – to one particular view of the world – which would make it difficult for them to accept new theories. He was convinced that there had been something profoundly wrong with the background assumptions in nineteenth-century physics, that the philosophical underpinnings of that earlier science were the cause of the profound difficulty that so many scientists experienced in being challenged by the 'new physics'. Bridgman wanted to create a new philosophy for physics so that scientists would never again have to face such a shift, that they should be able to accept in stride dramatic and radical changes in their theories. We should now make it our business to understand so thoroughly the character of our permanent mental relations to nature that another change in our attitude, such as that due to Einstein, shall be forever impossible. It was perhaps excusable that a revolution in mental attitude should occur once, because after all physics is a young science, and physicists have been very busy, but it would certainly be a reproach if such a revolution should ever prove necessary again. ([4], p. 2)Bridgman's proposal was that we should abandon the belief that the fundamental concepts of a science, e.g. length, time, mass (and by extension, anger, intelligence, profit, gross national product, etc.) each referred to a single, unique feature (or property) of things in the world. Instead, he argued, we should conceive of there being as many different, unique, properties as there are means (or techniques or operations) for measuring. For example, instead of conceiving of length as a single feature of physical objects, a feature (or property) which could be measured in a variety of ways, one should think of length-as-measured-by-technique1 (e.g. by a ruler), of length-as-measured-by-technique2 (e.g. by sonar), etc., etc. In short, Bridgman proposed that there is not one single property length, but a whole set of related properties, length1, length2, length3, length4, etc., each arising from a different manner of measurement. Why, exactly, Bridgman believed adopting such a revised view of measurement would forestall the very possibility of scientific upheavals is something it is impossible to pursue here. But it suffices to say that Bridgman's so-called 'operational definitions' which were adopted by a few physicists for a time, and by many more psychologists for a rather longer time, eventually came to be seen not only as sterile but as being stultifying to the progress of science. The trouble is fairly apparent. A great variety of physical laws in physics invoke the concept of length (just as many laws in economics invoke the concept of profit, or capital investment, etc.). If each technique for measuring, let us say, length were to produce not a measurement of length per se, but of a different, unique property, then in each instance where we formerly had one scientific law we would now require several. Then, too, there could be no possibility of ever saying that one technique had revealed another one to be inaccurate. For example, suppose one were to proceed in this fashion (as indeed some psychologists did): "What I mean by 'intelligence' is nothing more or less than a subject's score on this particular test. That is, for the purposes of this research design I am stipulating that the operational definition of 'intelligence' just is the subject's score on this test." The trouble should be obvious: if one researcher defines (stipulates) "intelligence" to be (nothing more or less than) the score on one particular test xyz, and some other researcher defines (stipulates) "intelligence" to be (nothing more or less than) the score on some other particular test jkl, then there is no theoretical basis for comparing or contrasting their respective results. There is no overarching theory of intelligence, a single property of which each of these tests, xyz and jkl, are independent measures. There is no way to argue that one test of intelligence is superior to any other test of intelligence since in principle there could not be any two independent tests of the same thing. Similarly, there is no way to predict, on the basis of one of these tests, what it might be reasonable to assume the results of the other will be. In short, the effect of adopting operational definitions is to fragment science, to rend it into countless disparate, isolated facts about countless numbers of unique properties. The fabric of science is unraveled. The ability to generalize in science is destroyed. In time, Bridgman came to see the utter counterproductiveness of his proposal. In 1953, he wrote: "I ... have created a Frankenstein" ([5], p. 76). (He was somewhat confused about the monster and the monster's creator. What he obviously meant to say was: "I have created a monster, as did Dr. Frankenstein.") Operational definitions have disappeared in physics; occasionally, however, one will still find instances of them in psychology. Philosophically sophisticated researchers avoid them in their own work and know not to take them seriously in the work of others. [ Return to Table of Contents ] 5.6 Recursive Definitions (Advanced material) By a "direct ancestor" we mean one's "parents, grandparents, great-grandparents, etc." More formally, we might write: "x is a direct ancestor of y" =df "x is a parent of y; or x is a parent of a parent of y; or x is a parent of a parent of a parent of y; etc."It is clear enough what we mean in this instance, but the inclusion of "etc." in the definiens is regarded as unacceptable according to the standards demanded by mathematicians and logicians. (Even if mathematicians and logicians will occasionally permit themselves the convenience of "etc.", computer programmers can never avail themselves of such a luxury. For digital computers have no ability whatsoever to execute the instruction "etc.") Fortunately there is a way to avoid the problematic "etc.": one can take recourse to recursive definitions. The definiens in a recursive definition is (typically) in two parts: a so-called 'basis' clause in which the definiendum does not occur, and a so-called 'inductive step' in which the definiendum does occur. At first the definition may appear to be circular since the definiendum explicitly occurs in the definiens. But the circularity is only apparent, since the basis clause offers a non-circular entry to – not a circle – but a 'chain' of an indefinite number of 'links'. A recursive definition for "direct ancestor" might look like this: "x is a direct ancestor of y" =df "x is a parent of y, or x is a parent of a direct ancestor of y"The basis is "x is a parent of y" in which the definiendum "direct ancestor" does not occur; and the inductive step is "x is a parent of a direct ancestor of y". As an example, consider the case of Betty being Alfred's mother, and Carlo being Betty's father. According to the recursive definition just given, since Betty is a parent of Alfred, she is – on the basis clause – a direct ancestor of Alfred. But then it turns out, by a second application of the recursive definition, that Carlo, too, is a direct ancestor of Alfred. To derive the latter result, we use the inductive step in the definition: since Carlo is a parent of a direct ancestor (Betty) of Alfred, then he, too, is a direct ancestor of Alfred. (And similarly for Dorothy, if she were one of Carlo's parents. Etc.) Here are some other examples of recursive definitions: "x is a number" =df "x is zero, or x is the successor of a number" [Note 14](For a formal analysis of the concept of recursive definition, see [17], pp. 37-44.) [ Return to Table of Contents ] 5.7 Persuasive Definitions Finally we can distinguish persuasive definitions. These are simply intended to influence attitudes and generally do violence to the lexical definitions. When people begin to cite definitions in a heated argument, it is a good bet that they are making them up. "Democracy" is by definition "the system of government which produces the greatest good for the greatest number".Here is an example in which the authors inserted their own bit of editorializing in their definition.
The latter sentence expresses something highly debatable; the former sentence is readily open to counterexample: it is dubious that parents who love their infants are sexually attracted to them. [ Return to Table of Contents ] | |||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||||
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