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Platonic realism is a philosophical term usually used to refer to the idea of realism regarding the existence of universals or abstract objects after the Greek philosopher Plato (c. 427–c. 347 BC), a student of Socrates. As universals were considered by Plato to be ideal forms, this stance is ambiguously also called Platonic idealism. This should not be confused with idealism as presented by philosophers such as George Berkeley: as Platonic abstractions are not spatial, temporal, or mental, they are not compatible with the later idealism's emphasis on mental existence. Plato's Forms include numbers and geometrical figures, making them a theory of mathematical realism; they also include the Form of the Good, making them in addition a theory of ethical realism.
In Platonic realism, universals do not exist in the way that ordinary physical objects exist, even though Plato metaphorically referred to such objects in order to explain his concepts. More modern versions of the theory seek to avoid applying potentially misleading descriptions to universals. Instead, such versions maintain that it is meaningless (or a category mistake) to apply the categories of space and time to universals.
Regardless of their description, Platonic realism holds that universals do exist in a broad, abstract sense, although not at any spatial or temporal distance from people's bodies. Thus, people cannot see or otherwise come into sensory contact with universals, but in order to conceive of universals, one must be able to conceive of these abstract forms.
Theories of universals
Theories of universals, including Platonic realism, are challenged to satisfy certain constraints on theories of universals.
Platonic realism satisfies one of those constraints, in that it is a theory of what general terms refer to. Forms are ideal in supplying meaning to referents for general terms. That is, to understand terms such as wikt:Applehood and redness, Platonic realism says that they refer to forms. Indeed, Platonism gets much of its plausibility because mentioning redness, for example, could be assumed to be referring to something that is apart from space and time, but which has lots of specific instances.
Some contemporary linguistic philosophers construe "Platonism" to mean the proposition that universals exist independently of particulars (a universal is anything that can be predicated of a particular). Similarly, a form of modern Platonism is found in the predominant philosophy of mathematics, especially regarding the foundations of mathematics. The Platonic interpretation of this philosophy includes the thesis that mathematics is not created but discovered.
Plato's interpretation of universals is linked to his Theory of Forms in which he uses both the terms εἶδος (eidos: "form") and ἰδέα (idea: "characteristic") to describe his theory. Forms are mind independent abstract objects or paradigms (παραδείγματα: patterns in nature) of which particular objects and the properties and relations present in them are copies. Form is inherent in the particulars and these are said to participate in the form. Classically idea has been translated (or transliterated) as "idea," but secondary literature now typically employs the term "form" (or occasionally "kind," usually in discussion of Plato's Sophist and Statesman) to avoid confusion with the English word connoting "thought".
Platonic form can be illustrated by contrasting a material triangle with an ideal triangle. The Platonic form is the ideal triangle — a figure with perfectly drawn lines whose angles add to 180 degrees. Any form of triangle that we experience will be an imperfect representation of the ideal triangle. Regardless of how precise your measuring and drawing tools you will never be able to recreate this perfect shape. Even drawn to the point where our senses cannot perceive a defect, in its essence the shape will still be imperfect; forever unable to match the ideal triangle.
In Platonic realism, forms are related to particulars (instances of objects and properties) in that a particular is regarded as a copy of its form. For example, a particular apple is said to be a copy of the form of applehood and the apple's redness is an instance of the form of Redness. Participation is another relationship between forms and particulars. Particulars are said to participate in the forms, and the forms are said to inhere in the particulars.
According to Plato, there are some forms that are not instantiated at all, but, he contends, that does not imply that the forms could not be instantiated. Forms are capable of being instantiated by many different particulars, which would result in the forms' having many copies, or inhering many particulars.
Two main criticisms with Platonic realism relate to inherence and difficulty of creating concepts without sense perception. Despite these criticisms, realism has strong defenders. Its popularity through the centuries has been variable.
Criticism of inherence
Critics claim that the terms "instantiation" and "copy" are not further defined and that participation and inherence are similarly mysterious and unenlightening. They question what it means to say that the form of applehood inheres a particular apple or that the apple is a copy of the form of applehood. To the critic, it seems that the forms, not being spatial, cannot have a shape, so it cannot be that the apple is the same shape as the form. Likewise, the critic claims it is unclear what it means to say that an apple participates in applehood.
Arguments refuting the inherence criticism, however, claim that a form of something spatial can lack a concrete (spatial) location and yet have in abstracto spatial qualities. An apple, then, can have the same shape as its form. Such arguments typically claim that the relationship between a particular and its form is very intelligible and easily grasped; that people unproblematically apply Platonic theory in everyday life; and that the inherence criticism is only created by the artificial demand to explain the normal understanding of inherence as if it were highly problematic. That is, the supporting argument claims that the criticism is with the mere illusion of a problem and thus could render suspect any philosophical concept.
Criticism of concepts without sense-perception
A criticism of forms relates to the origin of concepts without the benefit of sense-perception. For example, to think of redness in general, according to Plato, is to think of the form of redness. Critics, however, question how one can have the concept of a form existing in a special realm of the universe, apart from space and time, since such a concept cannot come from sense-perception. Although one can see an apple and its redness, the critic argues, those things merely participate in, or are copies of, the forms. Thus, they claim, to conceive of a particular apple and its redness is not to conceive of applehood or redness-in-general, so they question the source of the concept.
Plato's doctrine of recollection, however, addresses such criticism by saying that souls are born with the concepts of the forms, and just have to be reminded of those concepts from back before birth, when the souls were in close contact with the forms in the Platonic heaven. Plato is thus known as one of the very first rationalists, believing as he did that humans are born with a fund of a priori knowledge, to which they have access through a process of reason or intellection — a process that critics find to be rather mysterious.
A more modern response to this criticism of concepts without sense-perception is the claim that the universality of its qualities is an unavoidable given because one only experiences an object by means of general concepts. So, since the critic already grasps the relation between the abstract and the concrete, he is invited to stop thinking that it implies a contradiction. The response reconciles Platonism with empiricism by contending that an abstract (i.e., not concrete) object is real and knowable by its instantiation. Since the critic has, after all, naturally understood the abstract, the response suggests merely to abandon prejudice and accept it.
||This article includes a list of references, related reading or external links, but its sources remain unclear because it lacks inline citations. (June 2016) (Learn how and when to remove this template message)|
- Bharath Sriraman. (2004). The influence of Platonism on mathematics research and theological beliefs. Theology and Science, vol. 2, no.1, pp. 131–147
- Silverman, Allan. "Plato's Middle Period Metaphysics and Epistemology". Stanford Encyclopedia of Philosophy.
- Balaguer, Mark. "Platonism in Metaphysics". Stanford Encyclopedia of Philosophy.