Universal (metaphysics)
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Universals (used as a noun) are either properties, relations, or types. However, classes are not usually considered to be universals; however, some prominent philosophers, such as John Bigelow, do think that classes are universals. It is worth noting that all four items are generally considered abstract, nonphysical entities. They are at least so considered by Platonic realists; there are others who use the terminology of properties, relations, etc., but who do not wish to be realists. Part of the difficulty, indeed, of understanding this problem is understanding the complex and confusing relations between theory and language, and what the use of language does, or does not, imply.
Universals are contrasted with individuals. 'Universal' used as an adjective is contrasted with particular -- and sometimes with concrete, although this contrast may be confusing since Hegelian and neo-Hegelian (e.g. British idealist) philosophy speak of a 'concrete universal'.
Consider some examples of universals: there are types, like dog or "doghood"; properties, like red or redness; and relations, like betweenness or "being between"; those are all universals. Any particular dog, particular red thing, or particular object that is between other objects is not a universal, but a particular, and instances of universals (or objects that somehow bear universals). Doghood, redness, and betweenness are common to many different things. So a universal is something that can have instances; but it does not make sense to talk about an instance of a particular.
Realists invite us to think of universals as the referents of general terms. In other words, they are what we refer to, when we use general words like "doghood," "redness," and "betweenness." By contrast, we refer to particulars by using proper names, like "Fido," or definite descriptions that pick out just one thing, like "that apple on the table."
There is an ancient problem in metaphysics concerning what universals are supposed to be, or (alternatively characterized) whether they exist; this is called the problem of universals.et:Universaalid