The Tree of Porphyry (also known as ''scala praedicamentalis'') is a classic device for illustrating what is also called a "scale of being". It was suggested—if not first, then most famously in the European philosophical tradition—by the 3rd century CE Greek

neoplatonist Neoplatonism is a strand of Platonic philosophy that emerged in the 3rd century AD against the background of Hellenistic philosophy and religion. The term does not encapsulate a set of ideas as much as a chain of thinkers. But there are some ide ...

philosopher and logician Porphyry and revived through the translations of

Boethius Anicius Manlius Severinus Boethius, commonly known as Boethius (; Latin: ''Boetius''; 480 – 524 AD), was a Roman senator, consul, ''magister officiorum'', historian, and philosopher of the Early Middle Ages. He was a central figure in the tr ...

. Porphyry suggests the Porphyrian tree in his introduction (in Greek, "''Isagoge''") to

Aristotle Aristotle (; grc-gre, Ἀριστοτέλης ''Aristotélēs'', ; 384–322 BC) was a Greek philosopher and polymath during the Classical period in Ancient Greece. Taught by Plato, he was the founder of the Peripatetic school of phil ...

Categories Category, plural categories, may refer to: Philosophy and general uses *Categorization, categories in cognitive science, information science and generally *Category of being *Categories (Aristotle), ''Categories'' (Aristotle) *Category (Kant) ...

. Porphyry presented Aristotle's classification of categories in a way that was later adopted into tree-like diagrams of two-way divisions, which indicate that a species is defined by a genus and a differentia and that this logical process continues until the lowest species is reached, which can no longer be so defined. No illustrations or diagrams occur in editions of Porphyry's original work. But, diagrams were eventually made, and became associated with the scheme that Porphyry describes, following Aristotle. Porphyry's ''Isagoge'' was originally written in Greek, but was translated into Latin in the early 6th century CE by

. Boethius's translation became the standard philosophical logic textbook in the Middle Ages. Until the late 19th century, theories of categories based on Porphyry's work were still being taught to students of

logic Logic is the study of correct reasoning. It includes both formal and informal logic. Formal logic is the science of deductively valid inferences or of logical truths. It is a formal science investigating how conclusions follow from premises ...

. The following passage by philosopher James Franklin gives some hint as to the history of the Porphyrian tree: :In medieval education, the standard introduction to Aristotle's works was via Porphyry's ''Isagoge'', and division entered the educated consciousness in the form of 'Porphyry's Tree'. It is not clear that Porphyry himself, in the relevant passage, went any further than Aristotle in recommending division. But his brief comment was developed into the Tree by medieval logicians. It appears in William of Sherwood's ''Introduction to Logic'' and is given the name arbor Porphyrii in the most popular medieval logic,

Peter of Spain __NOTOC__ Peter of Hispania ( la, Petrus Hispanus; Portuguese and es, Pedro Hispano; century) was the author of the ', later known as the ', an important medieval university textbook on Aristotelian logic. As the Latin ''Hispania'' was consider ...

's ''Summulae Logicales''. Linnaeus's system of static and discrete species was simply the result of filling in the abstract Tree with the names of actual species. Thus, the notion of the Porphyrian tree as an actual diagram comes later than Porphyry himself. Still, scholars do speak of Porphyry's tree as in the ''Isagoge'' and they mean by this only that the idea of dividing genera into species via differentiae is found in the ''Isagoge''. But, of course, Porphyry was only following what was already in Aristotle, and Aristotle was following what was already in his teacher,

Plato Plato ( ; grc-gre, Πλάτων ; 428/427 or 424/423 – 348/347 BC) was a Greek philosopher born in Athens during the Classical period in Ancient Greece. He founded the Platonist school of thought and the Academy, the first institution ...

Example

The following Porphyrian tree consists of three columns of words; the middlemost (in boldface) contains the series of

genera Genus ( plural genera ) is a taxonomic rank used in the biological classification of living and fossil organisms as well as viruses. In the hierarchy of biological classification, genus comes above species and below family. In binomial nomenclat ...

and

species In biology, a species is the basic unit of classification and a taxonomic rank of an organism, as well as a unit of biodiversity. A species is often defined as the largest group of organisms in which any two individuals of the appropriate s ...

, and we can take it as analogous to the trunk of a tree. The extremes (the terms that jut out to the left and right), containing the

differentia In scholastic logic, differentia is one of the predicables. It is that part of a definition which is predicable in a given genus only of the definiendum; or the corresponding " metaphysical part" of the object. Origin Plato implicitly employe ...

e, we can take as analogous to the branches of a tree: Porphyrian Tree

The diagram shows the highest genus to be substance. (Whether substance is a highest genus, really, is not in question here: right now we are only going to discuss what the diagram shows, not whether what it shows is true or false.) The technical term for a highest substance is ''

summum genus Summum is a religion and philosophy that began in 1975 as a result of American citizen Claude "Corky" Nowell's claimed encounter with beings he described as "Summa Individuals". According to Nowell, these beings presented him with concepts ...

''. So, substance is the ''summum genus'' as far as this diagram goes. The diagram shows that the genus substance has two differentia, namely, "thinking" and "extended". This indicates that there are two species of the genus substance, thinking substance and extended substance. The diagram does not give a term for the species of thinking substance (this would be "mind"), but it does give the term for the species of extended substance, namely, body. That is, body is a species of the genus substance; body is that species of the genus substance that is extended. Now that we have seen body as a species of substance, we treat body as a genus itself. As a genus, it has two differentia of its own, inanimate and animate. So, there are two species of body, inanimate body and animate body. The diagram does not tell us what the term for inanimate body is, but it indicates a term for animate body, namely, animal. Animal is an animate species of the genus body. And, again, now that we have looked at animal as a species of the genus body, we look at animal now as a genus and consider its differentia, which are shown on the diagram to be irrational and rational. Thus, according to the diagram there are two species of the genus animal, irrational animal and rational animal. We are not told by the diagram what a term for irrational animal is, but the diagram indicates that a rational animal is a human. Thus, human is a rational species of the genus animal. Beneath human, however, there are no further species. "This" and "that" if they are considered differentiae, are of a special kind that map the species human not onto a new species but onto particular humans.For a discussion of "this" and "that" as universals/differentia, see

G. W. F. Hegel Georg Wilhelm Friedrich Hegel (; ; 27 August 1770 – 14 November 1831) was a German philosopher. He is one of the most important figures in German idealism and one of the founding figures of modern Western philosophy. His influence extends a ...

, ''

Phenomenology of Spirit ''The Phenomenology of Spirit'' (german: Phänomenologie des Geistes) is the most widely-discussed philosophical work of Georg Wilhelm Friedrich Hegel; its German title can be translated as either ''The Phenomenology of Spirit'' or ''The Phenomen ...

'', "A. Consciousness", "I. Sense-Certainty: or the 'this' and 'meaning' einen, translated by A. V. Miller, Oxford University Press, pp. 58-66. The particular human Plato is named in the diagram. Plato is not a species (that is why his name is not in bold, unlike the species above). So, human is the lowest species in this diagram. The technical name for the lowest species in such a scheme is the ''

infima species In mathematics, the infimum (abbreviated inf; plural infima) of a subset S of a partially ordered set P is a greatest element in P that is less than or equal to each element of S, if such an element exists. Consequently, the term ''greatest l ...

''. So, for this diagram, human is the ''infima species''.

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* {{Commons category inline Aristotelianism Neoplatonism Concepts in logic Conceptual models Term logic Ontology

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