Zeno's arguments are divided into two different types: his arguments againstplurality, or the existence of multiple objects, and his arguments against motion. Those against plurality suggest that for anything to exist, it must be divisible infinitely, meaning it would necessarily have both infinite mass and no mass simultaneously. Those against motion invoke the idea that distance must be divisible infinitely, meaning infinite steps would be required to cross any distance.
Zeno's philosophy is still debated in the present day, and no solution to his paradoxes has been agreed upon by philosophers. His paradoxes have influenced philosophy and mathematics, both in ancient and modern times. Many of his ideas have been challenged by modern developments in physics and mathematics, such asatomic theory,mathematical limits, andset theory.
Zeno was bornc. 490 BC.[1][2][3] Little about his life is known for certain, except that he was fromElea and that he was a student ofParmenides.[1] Zeno is portrayed in the dialogueParmenides byPlato, which takes place when Zeno is about 40 years old.[4] InParmenides, Zeno is described as having once been a zealous defender of his instructor Parmenides; this younger Zeno wished to prove that belief in the physical world as it appears is more absurd than belief in the Eleatic idea of a single entity ofexistence.[5] By the time thatParmenides takes place, Zeno is shown to have matured and to be more content to overlook challenges to his instructor's Eleatic philosophy.[6] Plato also has Socrates hint at a previous romantic or sexual relationship between Parmenides and Zeno.[6][7] It is unknown how accurate the depiction inParmenides is to reality, but it is agreed that it bears at least some truth.[3][1]
Zeno died c. 430 BC.[8][2] According toDiogenes Laertius, Zeno was killed while he was engaged in a plot to overthrow the tyrantNearchus. This account tells that he was captured, and that he was killed after he refused to give the names of his co-conspirators.[3][8] Before his death, Zeno is said to have asked to whisper the names into Nearchus's ear, only to bite the ear when Nearchus approached, holding on until he was killed.[3]
The writings of Zeno have been lost; no fragments of his original thoughts exist. Instead, modern understanding of Zeno's philosophy comes through recording by subsequent philosophers.[2][4] Zeno is only known to have written one book, most likely in the 460s BC.[1] This book is told of inParmenides, when the character of Zeno describes it as something that he wrote in his youth.[5] According to Plato's account, the book was stolen and published without Zeno's permission.[3]Zeno's paradoxes were recorded by Aristotle in his bookPhysics.[9]Simplicius of Cilicia, who lived in the 6th century AD, is another one of the main sources of present day knowledge about Zeno.[2][3]
Zeno is one of three major philosophers in the Eleatic school, along with Parmenides andMelissus of Samos.[10] This school of philosophy was a form ofmonism, following Parmenides' belief that all of reality is one single indivisible object.[11][2] Both Zeno and Melissus engaged in philosophy to support the ideas of Parmenides. While Melissus sought to build on them, Zeno instead argued against opposing ideas.[12] Such arguments would have been constructed to challenge the ideas ofpluralism, particularly those of thePythagoreans.[2]
Zeno was the first philosopher to use argumentative rather than descriptive language in his philosophy. Previous philosophers had explained their worldview, but Zeno was the first one to create explicit arguments that were meant to be used for debate. Aristotle described Zeno as the "inventor ofdialectic".[13] To disprove opposing views about reality, he wrote a series of paradoxes that usedreductio ad absurdum arguments, or arguments that disprove an idea by showing how it leads to illogical conclusions.[12] Furthermore, Zeno's philosophy makes use ofinfinitesimals, or quantities that are infinitely small while still being greater than zero.[14]
Criticism of Zeno's ideas may accuse him with usingrhetorical tricks andsophistry rather than cogent arguments.[5][15] Critics point to how Zeno describes the attributes of different ideas as absolutes when they may be contextual.[5] He may be accused of comparing similarities between concepts, such as attributes that physical space shared with physical objects, and then assuming that they be identical in other ways.[16]
Zeno rejected the idea ofplurality, or that more than one thing can exist.[8] According toProclus, Zeno had forty arguments against plurality.[1]
In one argument, Zeno proposed that multiple objects cannot exist, because this would require everything to be finite and infinite simultaneously.[1][11] He used this logic to challenge the existence of indivisible atoms.[17] Though the first part of this argument is lost, its main idea is recorded by Simplicius. According to him, Zeno began the argument with the idea that nothing can have size because "each of the many is self-identical and one".[18] Zeno argued that if objects have mass, then they can be divided.[11] The divisions would in turn be divisible, and so on, meaning that no object could have a finite size, as there would always be a smaller part to take from it.[19] Zeno also argued from the other direction: if objects do not have mass, then they cannot be combined to create something larger.[11][19]
In another argument, Zeno proposed that multiple objects cannot exist, because it would require an infinite number of objects to have a finite number of objects; he held that in order for there to be a finite number of objects, there must be an infinite number of objects dividing them. For two objects to exist separately, according to Zeno, there must be a third thing dividing them, otherwise they would be parts of the same thing. This dividing thing would then itself need two dividing objects to separate it from the original objects. These new dividing objects would then need dividing objects, and so on.[20]
As with all other aspects of existence, Zeno argued that location andphysical space are part of the single object that exists as reality.[11] Zeno believed that for all things that exist, they must exist in a certain point in physical space. For a point in space to exist, it must exist in another point in space.[21] This space must in turn exist in another point in space, and so on.[11] Zeno was likely the first philosopher to directly propose that being is incorporeal rather than taking up physical space.[22]
Zeno's arguments against motion contrast the actual phenomena of happenings and experience with the way that they are described and perceived.[23] The exact wording of these arguments has been lost, but descriptions of them survive throughAristotle in hisPhysics.[24] Aristotle identified four paradoxes of motion as the most important.[25] Each paradox has multiple names that it is known by.[26]
The dichotomy,the racetrack, orthe stadium[9] argues that no distance can be traveled. To cross a certain distance, one must first cross half of that distance, and to cross that distance, one must first cross half of that distance, and so on. This appears to make crossing any distance impossible, as an infinite number of acts are required to do it.[25] The argument contends that any appearance of movement is simply an illusion.[27] It is unknown whether Zeno intended for it to be impossible to start or finish crossing a certain distance.[3]
Achilles and the tortoise, or simplyAchilles,[9] argues that a swift runner such asAchilles can never catch up to a slow runner, such as a tortoise. Every time Achilles goes to where the tortoise was, the tortoise will have moved ahead, and when Achilles reaches that next point, then the tortoise will have moved ahead again, and so on. This makes it seem that Achilles can never reach the tortoise.[28]The dichotomy andAchilles are two variations of the same argument, and they effectively come to the same conclusions.[26]
The flying arrow, or simplythe arrow,[9] argues that all objects must be motionless in space. If an arrow is in the air, it is stationary at any given instant by occupying a specific area in space.[28]
The moving rows, also sometimes calledthe stadium,[9] argues that periods of time can be both halved and doubled simultaneously. It describes a row of objects passing beside other rows of objects in a stadium. If one of the opposing rows is stationary and the other is moving, then it will take a different amount of time to pass them.[29]
Zeno shows the Doors to Truth and Falsity (Veritas et Falsitas). Fresco in the Library ofEl Escorial, Madrid.
Zeno's greatest influence was within the thought of the Eleatic school, as his arguments built on the ideas of Parmenides,[22] though his paradoxes were also of interest toAncient Greek mathematicians.[30] Zeno is regarded as the first philosopher who dealt with attestable accounts of mathematicalinfinity.[31] Zeno was succeeded by theGreek Atomists, who argued against the infinite division of objects by proposing an eventual stopping point: the atom. ThoughEpicurus does not name Zeno directly, he attempts to refute some of Zeno's arguments.[22]
Zeno appeared in Plato's dialogueParmenides, and his paradoxes are mentioned inPhaedo.[8] Aristotle also wrote about Zeno's paradoxes.[25] Plato looked down on Zeno's approach of making arguments through contradictions.[7] He believed that even Zeno himself did not take the arguments seriously.[5] Aristotle disagreed, believing them to be worthy of consideration.[7] He challenged Zeno's dichotomy paradox through his conception of infinity, arguing that there are two infinities: an actual infinity that takes place at once and a potential infinity that is spread over time. He contended that Zeno attempted to prove actual infinities using potential infinities.[25][3] He also challenged Zeno's paradox of the stadium, observing that it is fallacious to assume a stationary object and an object in motion require the same amount of time to pass.[29] The paradox of Achilles and the tortoise may have influenced Aristotle's belief that actual infinity cannot exist, as this non-existence presents a solution to Zeno's arguments.[22]
Zeno's paradoxes are still debated, and they remain one of the archetypal examples of arguments to challenge commonly held perceptions.[13][14] The paradoxes saw renewed attention in 19th century philosophy that has persisted to the present.[3] Zeno's philosophy shows a contrast between what one knows logically and what one observes with the senses with the goal of proving that the world is an illusion; this practice was later adopted by the modern philosophic schools of thought,empiricism andpost-structuralism.Bertrand Russell praised Zeno's paradoxes, crediting them for allowing the work of mathematicianKarl Weierstrass.[7]
Scientific phenomena have been named after Zeno. The hindrance of a quantum system by observing it is usually called theQuantum Zeno effect as it is strongly reminiscent of Zeno's arrow paradox.[32][33] In the field of verification and design oftimed andhybrid systems, the system behavior is calledZeno if it includes an infinite number of discrete steps in a finite amount of time.[34]
Zeno's arguments against plurality have been challenged by modernatomic theory. Rather than plurality requiring both a finite and infinite amount of objects, atomic theory shows that objects are made from a specific number ofatoms that form specific elements.[11] Likewise, Zeno's arguments against motion have been challenged by modern mathematics and physics.[28] Mathematicians and philosophers continued studying infinitesimals until they came to be better understood throughcalculus andlimit theory. Ideas relating to Zeno's plurality arguments are similarly affected byset theory andtransfinite numbers.[14] Modern physics has yet to determine whether space and time can be represented on a mathematical continuum or if it is made up of discrete units.[3]
Zeno's argument of Achilles and the tortoise can be addressed mathematically, as the distance is defined by a specific number. His argument of the flying arrow has been challenged by modern physics, which allows the smallest instants of time to still have a minuscule non-zero duration.[28] Other mathematical ideas, such asinternal set theory andnonstandard analysis, may also resolve Zeno's paradoxes.[35] However, there is no definitive agreement on whether solutions to Zeno's arguments have been found.[14]
In the realm ofmetaphysics, the scholarLewis White Beck has also observed that Zeno's utilization of a "skeptical method" may have influenced the development of several paradoxes andantimonies byImmanuel Kant. Beck notes that by adopting Zeno's methodology, Kant avoided the apparent contradiction between two opposing philosophical arguments by calling into question the legitimacy of the apparent disagreement itself, while judiciously declining to support either of the two opposing arguments. In the process, he established a metaphysical foundation for his claim that, "the world we experience is not and does not contain athing in itself but is onlyphenomenal."[36]
^Boyer, Carl B.;Merzbach, Uta C. (2011).A History of Mathematics (Third ed.). Hoboken, New Jersey: John Wiley & Sons. p. 538.ISBN978-0-470-52548-7.Ever since the days of Zeno, men had been talking about infinity,...
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