In the

philosophy of mathematics Philosophy of mathematics is the branch of philosophy that deals with the nature of mathematics and its relationship to other areas of philosophy, particularly epistemology and metaphysics. Central questions posed include whether or not mathem ...

, the

abstraction Abstraction is a process where general rules and concepts are derived from the use and classifying of specific examples, literal (reality, real or Abstract and concrete, concrete) signifiers, first principles, or other methods. "An abstraction" ...

of actual infinity, also called completed infinity, involves infinite entities as given, actual and completed objects. The concept of actual infinity was introduced into

mathematics Mathematics is a field of study that discovers and organizes methods, Mathematical theory, theories and theorems that are developed and Mathematical proof, proved for the needs of empirical sciences and mathematics itself. There are many ar ...

near the end of the 19th century by

Georg Cantor Georg Ferdinand Ludwig Philipp Cantor ( ; ; – 6 January 1918) was a mathematician who played a pivotal role in the creation of set theory, which has become a foundations of mathematics, fundamental theory in mathematics. Cantor establi ...

with his theory of

infinite set In set theory, an infinite set is a set that is not a finite set. Infinite sets may be countable or uncountable. Properties The set of natural numbers (whose existence is postulated by the axiom of infinity) is infinite. It is the only set ...

s, and was later formalized into

Zermelo–Fraenkel set theory In set theory, Zermelo–Fraenkel set theory, named after mathematicians Ernst Zermelo and Abraham Fraenkel, is an axiomatic system that was proposed in the early twentieth century in order to formulate a theory of sets free of paradoxes suc ...

. This theory, which is presently commonly accepted as a foundation of mathematics, contains the

axiom of infinity In axiomatic set theory and the branches of mathematics and philosophy that use it, the axiom of infinity is one of the axioms of Zermelo–Fraenkel set theory. It guarantees the existence of at least one infinite set, namely a set containing ...

, which means that the

natural number In mathematics, the natural numbers are the numbers 0, 1, 2, 3, and so on, possibly excluding 0. Some start counting with 0, defining the natural numbers as the non-negative integers , while others start with 1, defining them as the positive in ...

s form a set (necessarily infinite). A great discovery of Cantor is that, if one accepts infinite sets, then there are different sizes ( cardinalities) of infinite sets, and, in particular, the cardinal of the continuum of the

real number In mathematics, a real number is a number that can be used to measure a continuous one- dimensional quantity such as a duration or temperature. Here, ''continuous'' means that pairs of values can have arbitrarily small differences. Every re ...

s is strictly larger than the cardinal of the natural numbers. Actual infinity is to be contrasted with potential infinity, in which an endless process (such as "add 1 to the previous number") produces a sequence with no last element, and where each individual result is finite and is achieved in a finite number of steps. This type of process occurs in mathematics, for instance, in standard formalizations of the notions of an

infinite series In mathematics, a series is, roughly speaking, an addition of infinitely many terms, one after the other. The study of series is a major part of calculus and its generalization, mathematical analysis. Series are used in most areas of mathemati ...

infinite product In mathematics, for a sequence of complex numbers ''a''1, ''a''2, ''a''3, ... the infinite product : \prod_^ a_n = a_1 a_2 a_3 \cdots is defined to be the limit of the partial products ''a''1''a''2...''a'n'' as ''n'' increases without bound ...

, or limit.

Anaximander

The ancient Greek term for the potential or improper infinite was ''

apeiron ''Apeiron'' (; ) is a Greek word meaning '(that which is) unlimited; boundless; infinite; indefinite' from ''a-'' 'without' and ''peirar'' 'end, limit; boundary', the Ionic Greek form of ''peras'' 'end, limit, boundary'. Origin of everything ...

'' (unlimited or indefinite), in contrast to the actual or proper infinite ''aphorismenon''. ''Apeiron'' stands opposed to that which has a ''peras'' (limit). These notions are today denoted by ''potentially infinite'' and ''actually infinite'', respectively.

Anaximander Anaximander ( ; ''Anaximandros''; ) was a Pre-Socratic philosophy, pre-Socratic Ancient Greek philosophy, Greek philosopher who lived in Miletus,"Anaximander" in ''Chambers's Encyclopædia''. London: George Newnes Ltd, George Newnes, 1961, Vol. ...

(610–546 BC) held that the'' apeiron'' was the principle or main element composing all things. Clearly, the 'apeiron' was some sort of basic substance.

Plato Plato ( ; Greek language, Greek: , ; born BC, died 348/347 BC) was an ancient Greek philosopher of the Classical Greece, Classical period who is considered a foundational thinker in Western philosophy and an innovator of the writte ...

's notion of the ''apeiron'' is more abstract, having to do with indefinite variability. The main dialogues where Plato discusses the 'apeiron' are the late dialogues ''Parmenides'' and the ''Philebus''.

Aristotle

Aristotle Aristotle (; 384–322 BC) was an Ancient Greek philosophy, Ancient Greek philosopher and polymath. His writings cover a broad range of subjects spanning the natural sciences, philosophy, linguistics, economics, politics, psychology, a ...

sums up the views of his predecessors on infinity as follows:

"Only the
Pythagoreans Pythagoreanism originated in the 6th century BC, based on and around the teachings and beliefs held by Pythagoras and his followers, the Pythagoreans. Pythagoras established the first Pythagorean community in the Ancient Greece, ancient Greek co ...
place the infinite among the objects of sense (they do not regard number as separable from these), and assert that what is outside the heaven is infinite. Plato, on the other hand, holds that there is no body outside (the Forms are not outside because they are nowhere), yet that the infinite is present not only in the objects of sense but in the Forms also." (Aristotle)

The theme was brought forward by Aristotle's consideration of the apeiron—in the context of mathematics and physics (the study of nature):

"Infinity turns out to be the opposite of what people say it is. It is not 'that which has nothing beyond itself' that is infinite, but 'that which always has something beyond itself'." (Aristotle)

Belief in the existence of the infinite comes mainly from five considerations: # From the nature of time – for it is infinite. # From the division of magnitudes – for the mathematicians also use the notion of the infinite. # If coming to be and passing away do not give out, it is only because that from which things come to be is infinite. # Because the limited always finds its limit in something, so that there must be no limit, if everything is always limited by something different from itself. # Most of all, a reason which is peculiarly appropriate and presents the difficulty that is felt by everybody – not only number but also mathematical magnitudes and what is outside the heaven are supposed to be infinite because they never give out in our thought. (Aristotle) Aristotle postulated that an actual infinity was impossible, because if it were possible, then something would have attained infinite magnitude, and would be "bigger than the heavens." However, he said, mathematics relating to infinity was not deprived of its applicability by this impossibility, because mathematicians did not need the infinite for their theorems, just a finite, arbitrarily large magnitude.

Aristotle's potential–actual distinction

handled the topic of infinity in ''Physics'' and in ''Metaphysics''. He distinguished between ''actual'' and ''potential'' infinity. ''Actual infinity'' is completed and definite, and consists of infinitely many elements. ''Potential infinity'' is never complete: elements can be always added, but never infinitely many. Aristotle distinguished between infinity with respect to addition and division.

"As an example of a potentially infinite series in respect to increase, one number can always be added after another in the series that starts 1,2,3,... but the process of adding more and more numbers cannot be exhausted or completed."

With respect to division, a potentially infinite sequence of divisions might start, for example, 1, 1/2, 1/4, 1/8, 1/16, but the process of division cannot be exhausted or completed. Aristotle also argued that Greek mathematicians knew the difference among the actual infinite and a potential one, but they "do not need the ctualinfinite and do not use it" (''Phys.'' III 2079 29).

Scholastic, Renaissance and Enlightenment thinkers

The overwhelming majority of

scholastic philosophers Scholasticism was a medieval European philosophical movement or methodology that was the predominant education in Europe from about 1100 to 1700. It is known for employing logically precise analyses and reconciling classical philosophy and C ...

adhered to the motto ''Infinitum actu non datur''. This means there is only a (developing, improper, "syncategorematic") ''potential infinity'' but not a (fixed, proper, "categorematic") ''actual infinity''. There were exceptions, however, for example in England.

It is well known that in the Middle Ages all scholastic philosophers advocate Aristotle's "infinitum actu non datur" as an irrefutable principle. ( G. Cantor)

Actual infinity exists in number, time and quantity. (J. Baconthorpe , p. 96

During the Renaissance and by early modern times the voices in favor of actual infinity were rather rare.

The continuum actually consists of infinitely many indivisibles ( G. Galilei , p. 97

I am so in favour of actual infinity. ( G.W. Leibniz , p. 97

However, the majority of pre-modern thinkers agreed with the well-known quote of Gauss:

I protest against the use of infinite magnitude as something completed, which is never permissible in mathematics. Infinity is merely a way of speaking, the true meaning being a limit which certain ratios approach indefinitely close, while others are permitted to increase without restriction. ( C.F. Gauss n a letter to Schumacher, 12 July 1831

Modern era

Actual infinity is now commonly accepted in mathematics, although the term is no longer in use, being replaced by the concept of

s. This drastic change was initialized by Bolzano and Cantor in the 19th century, and was one of the origins of the

foundational crisis of mathematics Foundations of mathematics are the logical and mathematical framework that allows the development of mathematics without generating self-contradictory theories, and to have reliable concepts of theorems, proofs, algorithms, etc. in particul ...

Bernard Bolzano Bernard Bolzano (, ; ; ; born Bernardus Placidus Johann Nepomuk Bolzano; 5 October 1781 – 18 December 1848) was a Bohemian mathematician, logician, philosopher, theologian and Catholic priest of Italian extraction, also known for his liberal ...

, who introduced the notion of ''set'' (in German: ''Menge''), and Georg Cantor, who introduced

set theory Set theory is the branch of mathematical logic that studies Set (mathematics), sets, which can be informally described as collections of objects. Although objects of any kind can be collected into a set, set theory – as a branch of mathema ...

, opposed the general attitude. Cantor distinguished three realms of infinity: (1) the infinity of God (which he called the "absolutum"), (2) the infinity of reality (which he called "nature") and (3) the transfinite numbers and sets of mathematics.

A multitude which is larger than any finite multitude, i.e., a multitude with the property that every finite set
f members of the kind in question F, or f, is the sixth letter of the Latin alphabet and many modern alphabets influenced by it, including the modern English alphabet and the alphabets of all other modern western European languages. Its name in English is ''ef'' (pronounc ...
is only a part of it, I will call an infinite multitude. (B. Bolzano , p. 6

Accordingly I distinguish an eternal uncreated infinity or absolutum, which is due to God and his attributes, and a created infinity or transfinitum, which has to be used wherever in the created nature an actual infinity has to be noticed, for example, with respect to, according to my firm conviction, the actually infinite number of created individuals, in the universe as well as on our earth and, most probably, even in every arbitrarily small extended piece of space. (Georg Cantor) (G. Cantor , p. 252

The numbers are a free creation of human mind. ( R. Dedekind a, p. III

One proof is based on the notion of God. First, from the highest perfection of God, we infer the possibility of the creation of the transfinite, then, from his all-grace and splendor, we infer the necessity that the creation of the transfinite in fact has happened. (G. Cantor , p. 400

Cantor distinguished two types of actual infinity, the transfinite and the absolute, about which he affirmed:

These concepts are to be strictly differentiated, insofar the former is, to be sure, ''infinite'', yet capable of ''increase'', whereas the latter is ''incapable of increase'' and is therefore ''indeterminable'' as a mathematical concept. This mistake we find, for example, in ''
Pantheism Pantheism can refer to a number of philosophical and religious beliefs, such as the belief that the universe is God, or panentheism, the belief in a non-corporeal divine intelligence or God out of which the universe arisesAnn Thomson; Bodies ...
''. (G. Cantor, ''Über verschiedene Standpunkte in bezug auf das aktuelle Unendliche'', in ''Gesammelte Abhandlungen mathematischen und philosophischen Inhalts'', pp. 375, 378)

Current mathematical practice

Actual infinity is now commonly accepted in mathematics under the name "

". Indeed,

has been formalized as the

(ZF). One of the axioms of ZF is the

, that essentially says that the natural numbers form a set. All mathematics has been rewritten in terms of ZF. In particular, line,

curve In mathematics, a curve (also called a curved line in older texts) is an object similar to a line, but that does not have to be straight. Intuitively, a curve may be thought of as the trace left by a moving point. This is the definition that ...

s, all sort of

space Space is a three-dimensional continuum containing positions and directions. In classical physics, physical space is often conceived in three linear dimensions. Modern physicists usually consider it, with time, to be part of a boundless ...

s are defined as the set of their points. Infinite sets are so common, that when one considers finite sets, this is generally explicitly stated; for example

finite geometry A finite geometry is any geometry, geometric system that has only a finite set, finite number of point (geometry), points. The familiar Euclidean geometry is not finite, because a Euclidean line contains infinitely many points. A geometry based ...

finite field In mathematics, a finite field or Galois field (so-named in honor of Évariste Galois) is a field (mathematics), field that contains a finite number of Element (mathematics), elements. As with any field, a finite field is a Set (mathematics), s ...

, etc.

Fermat's Last Theorem In number theory, Fermat's Last Theorem (sometimes called Fermat's conjecture, especially in older texts) states that no three positive number, positive integers , , and satisfy the equation for any integer value of greater than . The cases ...

is a theorem that was stated in terms of

elementary arithmetic Elementary arithmetic is a branch of mathematics involving addition, subtraction, multiplication, and Division (mathematics), division. Due to its low level of abstraction, broad range of application, and position as the foundation of all mathema ...

, which has been proved only more than 350 years later. The original

Wiles's proof of Fermat's Last Theorem Wiles's proof of Fermat's Last Theorem is a proof by British mathematician Sir Andrew Wiles of a special case of the modularity theorem for elliptic curves. Together with Ribet's theorem, it provides a proof for Fermat's Last Theorem. Both ...

, used not only the full power of ZF with the

axiom of choice In mathematics, the axiom of choice, abbreviated AC or AoC, is an axiom of set theory. Informally put, the axiom of choice says that given any collection of non-empty sets, it is possible to construct a new set by choosing one element from e ...

, but used implicitly a further axiom that implies the existence of very large sets. The requirement of this further axiom has been later dismissed, but infinite sets remains used in a fundamental way. This was not an obstacle for the recognition of the correctness of the proof by the community of mathematicians.

Opposition from the Intuitionist school

The mathematical meaning of the term "actual" in actual infinity is synonymous with definite, completed, extended or existential,Kleene 1952/1971:48. but not to be mistaken for ''physically existing''. The question of whether

natural Nature is an inherent character or constitution, particularly of the ecosphere or the universe as a whole. In this general sense nature refers to the laws, elements and phenomena of the physical world, including life. Although humans are part ...

real numbers In mathematics, a real number is a number that can be used to measurement, measure a continuous variable, continuous one-dimensional quantity such as a time, duration or temperature. Here, ''continuous'' means that pairs of values can have arbi ...

form definite sets is therefore independent of the question of whether infinite things exist physically in

nature Nature is an inherent character or constitution, particularly of the Ecosphere (planetary), ecosphere or the universe as a whole. In this general sense nature refers to the Scientific law, laws, elements and phenomenon, phenomena of the physic ...

. Proponents of

intuitionism In the philosophy of mathematics, intuitionism, or neointuitionism (opposed to preintuitionism), is an approach where mathematics is considered to be purely the result of the constructive mental activity of humans rather than the discovery of fu ...

, from Kronecker onwards, reject the claim that there are actually infinite mathematical objects or sets. Consequently, they reconstruct the foundations of mathematics in a way that does not assume the existence of actual infinities. On the other hand,

constructive analysis In mathematics, constructive analysis is mathematical analysis done according to some principles of constructive mathematics. Introduction The name of the subject contrasts with ''classical analysis'', which in this context means analysis done acc ...

does accept the existence of the completed infinity of the integers. For intuitionists, infinity is described as ''potential''; terms synonymous with this notion are ''becoming'' or ''constructive''. For example,

Stephen Kleene Stephen Cole Kleene ( ; January 5, 1909 – January 25, 1994) was an American mathematician. One of the students of Alonzo Church, Kleene, along with Rózsa Péter, Alan Turing, Emil Post, and others, is best known as a founder of the branch of ...

describes the notion of a

Turing machine A Turing machine is a mathematical model of computation describing an abstract machine that manipulates symbols on a strip of tape according to a table of rules. Despite the model's simplicity, it is capable of implementing any computer algori ...

tape as "a linear 'tape', (potentially) infinite in both directions." To access memory on the tape, a Turing machine moves a ''read head'' along it in finitely many steps: the tape is therefore only "potentially" infinite, since — while there is always the ability to take another step — infinity itself is never actually reached. Mathematicians generally accept actual infinities.Actual infinity follows from, for example, the acceptance of the notion of the integers as a set, see J J O'Connor and E F Robertson
"Infinity"

is the most significant mathematician who defended actual infinities. He decided that it is possible for natural and real numbers to be definite sets, and that if one rejects the axiom of Euclidean finiteness (that states that actualities, singly and in aggregates, are necessarily finite), then one is not involved in any

contradiction In traditional logic, a contradiction involves a proposition conflicting either with itself or established fact. It is often used as a tool to detect disingenuous beliefs and bias. Illustrating a general tendency in applied logic, Aristotle's ...

. The present-day conventional finitist interpretation of ordinal and

cardinal number In mathematics, a cardinal number, or cardinal for short, is what is commonly called the number of elements of a set. In the case of a finite set, its cardinal number, or cardinality is therefore a natural number. For dealing with the cas ...

s is that they consist of a collection of special symbols, and an associated

formal language In logic, mathematics, computer science, and linguistics, a formal language is a set of strings whose symbols are taken from a set called "alphabet". The alphabet of a formal language consists of symbols that concatenate into strings (also c ...

, within which statements may be made. All such statements are necessarily finite in length. The soundness of the manipulations is founded only on the basic principles of a formal language:

term algebra Term may refer to: Language *Terminology, context-specific nouns or compound words **Technical term (or ''term of art''), used by specialists in a field ***Scientific terminology, used by scientists *Term (argumentation), part of an argument in d ...

term rewriting In mathematics, computer science, and logic, rewriting covers a wide range of methods of replacing subterms of a formula with other terms. Such methods may be achieved by rewriting systems (also known as rewrite systems, rewrite engines, or reduc ...

, and so on. More abstractly, both (finite)

model theory In mathematical logic, model theory is the study of the relationship between theory (mathematical logic), formal theories (a collection of Sentence (mathematical logic), sentences in a formal language expressing statements about a Structure (mat ...

and

proof theory Proof theory is a major branchAccording to , proof theory is one of four domains mathematical logic, together with model theory, axiomatic set theory, and recursion theory. consists of four corresponding parts, with part D being about "Proof The ...

offer the needed tools to work with infinities. One does not have to "believe" in infinity in order to write down algebraically valid expressions employing symbols for infinity.

Modern set theory

The philosophical problem of actual infinity concerns whether the notion is coherent and epistemically sound.

is presently the standard foundation of mathematics. One of its axioms is the

that states that there exist infinite sets, and in particular that the natural numbers form an infinite set. However, some finitist philosophers of mathematics and constructivists still object to the notion.

References

Sources

, ''Physics'

*

, 1851, ''Paradoxien des Unendlichen'', Reclam, Leipzig. * Bernard Bolzano 1837, ''Wissenschaftslehre'', Sulzbach. *

in E. Zermelo (ed.) 1966, ''Gesammelte Abhandlungen mathematischen und philosophischen Inhalts'', Olms, Hildesheim. *

Richard Dedekind Julius Wilhelm Richard Dedekind (; ; 6 October 1831 – 12 February 1916) was a German mathematician who made important contributions to number theory, abstract algebra (particularly ring theory), and the axiomatic foundations of arithmetic. H ...

in 1960 ''Was sind und was sollen die Zahlen?'', Vieweg, Braunschweig. * Adolf Abraham Fraenkel 1923, ''Einleitung in die Mengenlehre'', Springer, Berlin. * Adolf Abraham Fraenkel, Y. Bar-Hillel, A. Levy 1984, ''Foundations of Set Theory'', 2nd edn., North Holland, Amsterdam New York. *

Stephen C. Kleene Stephen Cole Kleene ( ; January 5, 1909 – January 25, 1994) was an American mathematician. One of the students of Alonzo Church, Kleene, along with Rózsa Péter, Alan Turing, Emil Post, and others, is best known as a founder of the branch of ...

1952 (1971 edition, 10th printing), ''Introduction to Metamathematics'', North-Holland Publishing Company, Amsterdam New York. . * H. Meschkowski 1981, ''Georg Cantor: Leben, Werk und Wirkung'' (2. Aufl.), BI, Mannheim. * H. Meschkowski, W. Nilson (Hrsg.) 1991, ''Georg Cantor – Briefe'', Springer, Berlin. *

Abraham Robinson Abraham Robinson (born Robinsohn; October 6, 1918 – April 11, 1974) was a mathematician who is most widely known for development of nonstandard analysis, a mathematically rigorous system whereby infinitesimal and infinite numbers were reincorp ...

1979, ''Selected Papers'', Vol. 2, W.A.J. Luxemburg, S. Koerner (Hrsg.), North Holland, Amsterdam. {{Infinity Concepts in metaphysics Infinity Philosophy of mathematics