Zenos paradoxes are a set of philosophical problems generally thought to have been devised by Greek philosopher Zeno of Elea to support Parmenides doctrine that contrary to the evidence of ones senses, the belief in plurality and change is mistaken, and in particular that motion is nothing but an illusion. It is usually assumed, based on Platos Parmenides, that Zeno took on the project of creating these paradoxes because other philosophers had created paradoxes against Parmenides view. Thus Plato has Zeno say the purpose of the paradoxes "is to show that their hypothesis that existences are many, if properly followed up, leads to still more absurd results than the hypothesis that they are one." Plato has Socrates claim that Zeno and Parmenides were essentially arguing exactly the same point.

Some of Zenos nine surviving paradoxes preserved in Aristotles Physics and Simpliciuss commentary thereon are essentially equivalent to one another. Aristotle offered a refutation of some of them. Three of the strongest and most famous - that of Achilles and the tortoise, the Dichotomy argument, and that of an arrow in flight - are presented in detail below.

Zenos arguments are perhaps the first examples of a method of proof called reductio ad absurdum also known as proof by contradiction. They are also credited as a source of the dialectic method used by Socrates.

Some mathematicians and historians, such as Carl Boyer, hold that Zenos paradoxes are simply mathematical problems, for which modern calculus provides a mathematical solution. Some philosophers, however, say that Zenos paradoxes and their variations see Thomsons lamp remain relevant metaphysical problems.

The origins of the paradoxes are somewhat unclear. Diogenes Laertius, a fourth source for information about Zeno and his teachings, citing Favorinus, says that Zenos teacher Parmenides was the first to introduce the Achilles and the tortoise paradox. But in a later passage, Laertius attributes the origin of the paradox to Zeno, explaining that Favorinus disagrees.

** 1.1. Paradoxes of motion Dichotomy paradox **

That which is in locomotion must arrive at the half-way stage before it arrives at the goal.

Suppose Atalanta wishes to walk to the end of a path. Before she can get there, she must get halfway there. Before she can get halfway there, she must get a quarter of the way there. Before traveling a quarter, she must travel one-eighth; before an eighth, one-sixteenth; and so on.

The resulting sequence can be represented as:

{ ⋯, 1 16, 1 8, 1 4, 1 2, 1 } {\displaystyle \left\{\cdots,{\frac {1}{16}},{\frac {1}{8}},{\frac {1}{4}},{\frac {1}{2}},1\right\}}

This description requires one to complete an infinite number of tasks, which Zeno maintains is an impossibility.

This sequence also presents a second problem in that it contains no first distance to run, for any possible finite first distance could be divided in half, and hence would not be first after all. Hence, the trip cannot even begin. The paradoxical conclusion then would be that travel over any finite distance can neither be completed nor begun, and so all motion must be an illusion.

This argument is called "the Dichotomy" because it involves repeatedly splitting a distance into two parts. It is also known as the Race Course paradox.

** 1.2. Paradoxes of motion Achilles and the tortoise **

In a race, the quickest runner can never overtake the slowest, since the pursuer must first reach the point whence the pursued started, so that the slower must always hold a lead.

In the paradox of Achilles and the tortoise, Achilles is in a footrace with the tortoise. Achilles allows the tortoise a head start of 100 meters, for example. Supposing that each racer starts running at some constant speed, one faster than the other. After some finite time, Achilles will have run 100 meters, bringing him to the tortoises starting point. During this time, the tortoise has run a much shorter distance, say 2 meters. It will then take Achilles some further time to run that distance, by which time the tortoise will have advanced farther; and then more time still to reach this third point, while the tortoise moves ahead. Thus, whenever Achilles arrives somewhere the tortoise has been, he still has some distance to go before he can even reach the tortoise. As Aristotle noted, this argument is similar to the Dichotomy. It lacks, however, the apparent conclusion of motionlessness.

** 1.3. Paradoxes of motion Arrow paradox Fletchers paradox **

If everything when it occupies an equal space is at rest, and if that which is in locomotion is always occupying such a space at any moment, the flying arrow is therefore motionless.

In the arrow paradox, Zeno states that for motion to occur, an object must change the position which it occupies. He gives an example of an arrow in flight. He states that in any one duration-less instant of time, the arrow is neither moving to where it is, nor to where it is not. It cannot move to where it is not, because no time elapses for it to move there; it cannot move to where it is, because it is already there. In other words, at every instant of time there is no motion occurring. If everything is motionless at every instant, and time is entirely composed of instants, then motion is impossible.

Whereas the first two paradoxes divide space, this paradox starts by dividing time - and not into segments, but into points.

** 2.1. Three other paradoxes as given by Aristotle Paradox of Place **

From Aristotle:

If everything that exists has a place, place too will have a place, and so on ad infinitum.

** 2.2. Three other paradoxes as given by Aristotle The Moving Rows or Stadium **

From Aristotle:

. concerning the two rows of bodies, each row being composed of an equal number of bodies of equal size, passing each other on a race-course as they proceed with equal velocity in opposite directions, the one row originally occupying the space between the goal and the middle point of the course and the other that between the middle point and the starting-post. This.involves the conclusion that half a given time is equal to double that time.

For an expanded account of Zenos arguments as presented by Aristotle, see Simplicius commentary On Aristotles Physics.

** 3.1. Proposed solutions Diogenes the Cynic **

According to Simplicius, Diogenes the Cynic said nothing upon hearing Zenos arguments, but stood up and walked, in order to demonstrate the falsity of Zenos conclusions see solvitur ambulando. To fully solve any of the paradoxes, however, one needs to show what is wrong with the argument, not just the conclusions. Through history, several solutions have been proposed, among the earliest recorded being those of Aristotle and Archimedes.

** 3.2. Proposed solutions Aristotle **

Aristotle 384 BC−322 BC remarked that as the distance decreases, the time needed to cover those distances also decreases, so that the time needed also becomes increasingly small. Aristotle also distinguished "things infinite in respect of divisibility" such as a unit of space that can be mentally divided into ever smaller units while remaining spatially the same from things or distances that are infinite in extension "with respect to their extremities". Aristotles objection to the arrow paradox was that "Time is not composed of indivisible nows any more than any other magnitude is composed of indivisibles."

** 3.3. Proposed solutions Thomas Aquinas **

Thomas Aquinas, commenting on Aristotles objection, wrote "Instants are not parts of time, for time is not made up of instants any more than a magnitude is made of points, as we have already proved. Hence it does not follow that a thing is not in motion in a given time, just because it is not in motion in any instant of that time."

** 3.4. Proposed solutions Bertrand Russell **

Bertrand Russell offered what is known as the "at-at theory of motion". It agrees that there can be no motion "during" a durationless instant, and contends that all that is required for motion is that the arrow be at one point at one time, at another point another time, and at appropriate points between those two points for intervening times. In this view motion is just change in position over time.

** 3.5. Proposed solutions Hermann Weyl **

Another proposed solution is to question one of the assumptions Zeno used in his paradoxes particularly the Dichotomy, which is that between any two different points in space or time, there is always another point. Without this assumption there are only a finite number of distances between two points, hence there is no infinite sequence of movements, and the paradox is resolved. According to Hermann Weyl, the assumption that space is made of finite and discrete units is subject to a further problem, given by the "tile argument" or "distance function problem". According to this, the length of the hypotenuse of a right angled triangle in discretized space is always equal to the length of one of the two sides, in contradiction to geometry. Jean Paul Van Bendegem has argued that the Tile Argument can be resolved, and that discretization can therefore remove the paradox.

** 3.6. Proposed solutions Henri Bergson **

An alternative conclusion, proposed by Henri Bergson in his 1896 book Matter and Memory, is that, while the path is divisible, the motion is not. In this argument, instants in time and instantaneous magnitudes do not physically exist. An object in relative motion cannot have an instantaneous or determined relative position, and so cannot have its motion fractionally dissected.

** 3.7. Proposed solutions Peter Lynds **

In 2003, Peter Lynds put forth a very similar argument: all of Zenos motion paradoxes are resolved by the conclusion that instants in time and instantaneous magnitudes do not physically exist. Lynds argues that an object in relative motion cannot have an instantaneous or determined relative position for if it did, it could not be in motion, and so cannot have its motion fractionally dissected as if it does, as is assumed by the paradoxes. For more about the inability to know both speed and location, see Heisenberg uncertainty principle.

** 3.8. Proposed solutions Nick Huggett **

Nick Huggett argues that Zeno is assuming the conclusion when he says that objects that occupy the same space as they do at rest must be at rest.

** 4. Paradoxes in modern times **

Infinite processes remained theoretically troublesome in mathematics until the late 19th century. The epsilon-delta version of Weierstrass and Cauchy developed a rigorous formulation of the logic and calculus involved. These works resolved the mathematics involving infinite processes.

While mathematics can calculate where and when the moving Achilles will overtake the Tortoise of Zenos paradox, philosophers such as Kevin Brown and Moorcroft claim that mathematics does not address the central point in Zenos argument, and that solving the mathematical issues does not solve every issue the paradoxes raise.

Popular literature often misrepresents Zenos arguments. For example, Zeno is often said to have argued that the sum of an infinite number of terms must itself be infinite–with the result that not only the time, but also the distance to be travelled, become infinite. A humorous take is offered by Tom Stoppard in his play Jumpers 1972, in which the principal protagonist, the philosophy professor George Moore, suggests that according to Zeno’s paradox, Saint Sebastian, a 3rd Century Christian saint martyred by being shot with arrows, died of fright. However, none of the original ancient sources has Zeno discussing the sum of any infinite series. Simplicius has Zeno saying "it is impossible to traverse an infinite number of things in a finite time". This presents Zenos problem not with finding the sum, but rather with finishing a task with an infinite number of steps: how can one ever get from A to B, if an infinite number of non-instantaneous events can be identified that need to precede the arrival at B, and one cannot reach even the beginning of a "last event"?

Debate continues on the question of whether or not Zenos paradoxes have been resolved. In The History of Mathematics: An Introduction 2010 Burton writes, "Although Zenos argument confounded his contemporaries, a satisfactory explanation incorporates a now-familiar idea, the notion of a convergent infinite series.".

Bertrand Russell offered a "solution" to the paradoxes based on the work of Georg Cantor, but Brown concludes "Given the history of final resolutions, from Aristotle onwards, its probably foolhardy to think weve reached the end. It may be that Zenos arguments on motion, because of their simplicity and universality, will always serve as a kind of Rorschach image onto which people can project their most fundamental phenomenological concerns if they have any."

** 5. A similar ancient Chinese philosophic consideration **

Ancient Chinese philosophers from the Mohist School of Names during the Warring States period of China 479-221 BC developed equivalents to some of Zenos paradoxes. The scientist and historian Sir Joseph Needham, in his Science and Civilisation in China, describes an ancient Chinese paradox from the surviving Mohist School of Names book of logic which states, in the archaic ancient Chinese script, "a one-foot stick, every day take away half of it, in a myriad ages it will not be exhausted." Several other paradoxes from this philosophical school more precisely, movement are known, but their modern interpretation is more speculative.

** 6. Quantum Zeno effect **

In 1977, physicists E. C. George Sudarshan and B. Misra discovered that the dynamical evolution motion of a quantum system can be hindered or even inhibited through observation of the system. This effect is usually called the "quantum Zeno effect" as it is strongly reminiscent of Zenos arrow paradox. This effect was first theorized in 1958.

** 7. Zeno behaviour **

In the field of verification and design of timed and hybrid systems, the system behaviour is called Zeno if it includes an infinite number of discrete steps in a finite amount of time. Some formal verification techniques exclude these behaviours from analysis, if they are not equivalent to non-Zeno behaviour. In systems design these behaviours will also often be excluded from system models, since they cannot be implemented with a digital controller.