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Isn't a three state object immedately capable of holding more information and handling larger values? I know that processors currently use massive nets of XOR gates and that would need to be reworked.

Since we are at 64 bit (we can represent 2^63 possible states) computing the equivalent ternary generation could support number with 30 more tens places log(3^63-2^63).

I imagine it is as easy to detect the potential difference between +1 and 0 as it is between -1 and 0.

Would some compexity of the hardware, power consumption, or chip density offset any gains in storage and computing power?

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18 Answers 18

up vote 38 down vote accepted
  • It is much harder to build components that use more than two states/levels/whatever. For example, the transistors used in logic are either closed and don't conduct at all, or wide open. Having them half open would require much more precision and use extra power. Nevertheless, sometimes more states are used for packing more data, but rarely (e.g. modern NAND flash memory, modulation in modems).

  • If you use more than two states you need to be compatible to binary, because the rest of the world uses it. Three is out because the conversion to binary would require expensive multiplication or division with remainder. Instead you go directly to four or a higher power of two.

These are practical reasons why it is not done, but mathematically it is perfectly possible to build a computer on ternary logic.

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The play nice with the rest of the world is a great point. – ojblass Apr 19 '09 at 5:56
we're not talking about modern times here. At the time ternary computers were considered, the rest of the world was still (also) working on the binary computers – paweloque Apr 19 '09 at 10:50
Yes, modern hardware would be a problem but that would be why need new hardware, yes it would be expensive at first but much like current hardware price with fall with time. As another who is deeply involved with this topic, I say there is no good reason not to. – ars265 Dec 8 '11 at 16:27
Also: If a bit is a piece of binary data, what would a piece of ternary data be...? – Askanison4 Feb 5 '14 at 15:45
@Askan Pretty sure it's known as a trit. – Riking Apr 20 '14 at 7:46

Lots of misinformation here. Binary has a simple on/off switch. Trinary/Ternary can use one of 2 modes: Balanced aka -1, 0, +1, or unbalanced 0, 1, 2, but is not simply on or off, or more correctly, has 2 "on" states.

With the expansion of fiber optics and expansive hardware, ternary would actually take us to a much more expansive and faster state for a much lower cost. Modern coding could still be used (much like 32 bit software is still able to be used on 64 bit hardware) in combination with newer ternary codes, at least initially. Just need the early hardware to check which piece of info coming through, or the software to announce ahead of time if it is a bit or a trit. Code could be sent through 3 pieces at a time instead of the modern 2 for the same or less power.

With fiber optic hardware, instead of the modern on/off binary process, it would be determined by 0=off and the other 2 switches as orthogonal polarizations of light. As for security, this could actually be made massively more secure for the individual as each PC or even user is set to a specific polarization "specs" that is only to be sent/received between the user and the destination. The same would go for the "gates" with other hardware. They would not need to be bigger, just have the option for 3 possibilities instead of 2.

There has even been some theories and even possibly starting some tests on the Josephson Effect which would allow for ternary memory cells, using circulating superconducting currents, either clockwise, counterclockwise, or off.

When compared directly, Ternary is the integer base with the highest radix economy, followed closely by binary and quaternary. Even some modern systems use a type of ternary logic, aka SQL which implements ternary logic as a means of handling NULL field content. SQL uses NULL to represent missing data in a database. If a field contains no defined value, SQL assumes this means that an actual value exists, but that the value is not currently recorded in the database. Note that a missing value is not the same as either a numeric value of zero, or a string value of zero length. Comparing anything to NULL—even another NULL—results in an UNKNOWN truth state. For example, the SQL expression "City = 'Paris'" resolves to FALSE for a record with "Chicago" in the City field, but it resolves to UNKNOWN for a record with a NULL City field. In other words, to SQL, an undefined field represents potentially any possible value: a missing city might or might not represent Paris. This is where trinary logic is used with modern day binary systems, albeit crude.

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This is a late response that probably won't do anyone any good, but I contend that your comparison of the binary/trinary transition being analogous to the 32-bit/64-bit transition is fallacious. In the latter case, nothing truly changed about the function of the hardware at a fundamental level; the instruction mov eax, ebx will do precisely the same thing in either instruction set. With the trinary/binary distinction, this is no longer a reasonable guarantee: a trinary register may look very different from a binary register; mov eax ebx might not mean the same thing to both encodings. – bionicOnion Aug 25 at 20:01

Of course we'd be able to hold more data per bit, just like our decimal number system can hold far more data in a single digit.

But that also increases complexity. Binary behaves very nicely in many cases, making it remarkably simple to manipulate. The logic for a binary adder is far simpler than one for ternary numbers (or for that matter, decimal ones).

You wouldn't magically be able to store or process more information. The hardware would have to be so much bigger and more complex that it'd more than offset the larger capacity.

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Does that come from actual experience designing hardware or simply a gut instinct? – ojblass Apr 18 '09 at 23:47
ojblass: It comes from people actually making decimal computers in the 1940s onwards. There are also ternary logic gates around, but very few ternary computers. See for example Wikipedia's article on the history of computing hardware:,http://…, and – Doug Apr 19 '09 at 0:40
By definition the logic for trits is more complicated than bits. In binary, if you have two bit inputs, you have 2 * 2 == 4 outputs. With ternary, you have 3 * 3 + 9 outputs. – James Sep 6 '11 at 5:22
@James: computers are complicated one way or another ;v) , see for background on the studies that led early engineers to decide on binary. – Potatoswatter Sep 6 '11 at 15:16
@Potatoswatter thanks for the link to the article, but it supports the idea that ternary is more efficient overall (radix 3 is 58% more efficient). The only reason there provided was noise immunity from voltage fluctuations, which is honestly a good reason, especially during the early days of computing. Less so now though... – Isaac Kotlicky May 26 at 2:21

There are some people here that have no idea what they are talking about. I first designed a 16 bit computer using binary, then got to trying to do it with tenery. First to all that are saying the hardware is to difficult/it is difficult to differentiate the values...well your completely wrong, i can make a not gate in tenery and i don't even need transistors only diodes, which in case anyone here doesn't realize can be made smaller and more efficiently on a die.Secondly you need to realize that +1 and -1 are THE SAME THING one flows one way, the other flows the other, there is no difference between them it makes complete sense. Also math is easy with tenery take for instance take the base 3 number 20120(177)(2 represents-1) and negate it, reverse the flow of electricity of each bit so -1 is +1 visa versa and zero stays unchanged, then with the correct number formats and hardware you get 10210 or 020120 which is -177. Some people here just seem to think binary is better because the way things are is better, my question to these people, in the middle ages bleeding blood was common but does that make it the best medical practice, far from it. Almost every breakthrough in science was formed from a new idea that at first seemed useless, for instance microwaves.

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You should read the articles about a russian ternary computer:

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1 Tryte = 6 trit; 1 tryte can store +-364 - cool! – pmod Sep 5 '11 at 7:38

A lot of it has to do with the fact that ultimately, bits are represented as electrical impulses, and it's easier to build hardware that simply differentiates between "charged" and "no charge", and to easily detect transitions between states. A system utilizing three states has to be a bit more exact in differentiating between "charged", "partly charged", and "no charge". Besides that, the "charged" state is not constant in electronics: the energy starts to "bleed" eventually, so a "charged" state varies in actual "level" of energy. In a 3-state system, this would have to be taken into account, too.

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Actually, I think most ternary logic uses +1, 0, and -1 states, not 0, +0.5, and +1.0 states. – Rick Copeland Apr 18 '09 at 23:25
Well whatever most means... but I imagine it is as easy to detect the differences between +1 and 0 as it is between -1 and 0. – ojblass Apr 18 '09 at 23:29
Try writing code that distinguishes three values using only one if statement. (no case allowed) – SingleNegationElimination Apr 18 '09 at 23:33
can i make up a language construct? – ojblass Apr 18 '09 at 23:44
@IfLoop Are you referring to Fortran's Arithmetic If? – Navin May 11 '14 at 17:17

Well, for one thing, there is no smaller unit of information than a bit. operating on bits is the most basic and fundamental way of treating information.

Perhaps a stronger reason is because its much easier to make electrical components that have two stable states, rather than three.

Aside: Your math is a bit off. there are approximately 101.4 binary digits in a 64 digit trinary number. Explanation: the largest 64 digit trinary number is 3433683820292512484657849089280 (3^64-1). to represent this in binary, it requires 102 bits: 101011010101101101010010101111100011110111100100110010001001111000110001111001011111101011110100000000

This is easy to understand, log2(3^64) is about 101.4376

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2 to the 6 is 64 and 3 to 6 is 729... I am sorry am I being dense? – ojblass Apr 18 '09 at 23:25
You are right of course... my head hurts but you are right... can you correct the question in some meaningful way to say that? – ojblass Apr 18 '09 at 23:34
Regarding "ts much easier to make electrical components that have two stable states, rather than three", is it likely to change in the more modern future? – Pacerier Jul 29 '12 at 13:17
@Pacerier: not that I'm aware of, but then I'm not an expert. That's probably a question for – SingleNegationElimination Jul 29 '12 at 15:13

The ternary equivalent of the 'bit' just caused too much outrage!

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+1 good to see some humor on here you trit. – ojblass Jul 7 '13 at 22:53
I don't like this joke one bit. – dogwynn Oct 27 at 1:35

Another major hurdle is that there are a much larger number of logic operations that would need to be defined. The number of operators is found by the formula b^(b^i) where b is the base and i is the number of inputs. For a two input binary system this works out to 16 possible operators. Not all of this are usually implemented in gates and some gates cover more than one condition, however all of them can be implemented with three or less of the standard gates. For a two input ternary system this number is much higher about 19683. While several of these gates would be similar to one another, ultimately the ability to design basic circuits manually would be almost impossible. While even a freshmen engineering student is able to design basic binary circuits in their head.

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There are also theories that suggest that fiber optics could use light frequencies (i.e.color) to differentiate states thereby allowing a near infinite (depending on resolution of the detection unit) number of base possibilities.

Logic gates are definitely feesible for any base but let's use trinary for an example:

For a trinary XOR gate, it could be exclusive to one (or any) of the three states it is comparing OR one of the other three states. It could also tie two of the three states together for a binary output. The possibilities increase literally exponentially. Of course, this would require more complex hardware and software but the complexity should decrease the size and more importantly the power (read heat). There is even talk of using trinary in a nano computing system where there is a microscopic "bump, a "hole" or "unchanged" to represent the three states.

Right now, we are in sort of a QWERTY type problem. Qwerty was designed to be inefficient because of a problem with typing mechanics that no longer exists but everyone who uses keyboards today learned to use the qwerty system and no one wants to change it. Trinary and higher bases will someday break through this issue when we reach the physical limitations of binary computing. Maybe not for another twenty years but we all know that we cannot continue doubling our capability every year and a half forever.

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Screwball's reply is correct and corrects some of the misstatements offered here. Those who replied about fractional positive values completely missed the concept of the ternary system which is based on 0, +1 and -1. When first constructed by the Russians in the 1950's, the competition between USSR and USA was intense. I suspect that politics between the two had a lot to do with the USA's binary's eventual popularity over the USSR's ternary.

From what I've read, there are some ternary computers in use. Moscow has some in use at their university and IBM has some in its labs. There are references to others, but I couldn't distinguish how serious they are, or if they are just for experimentation or play. Apparently they are much less costly to build and they use far less energy to operate.

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I believe it is for two reasons (please correct me if I'm wrong): first because the value of 0 and 1 is not really no-current/current or something alike. The noise is quite high, and the electronic components must be able to distinguish that a value fluctuating from, say, 0.0 to 0.4 is a zero, and from 0.7 to 1.2 is a one. If you add more levels, you are basically making this distinction more difficult.

Second: all the boolean logic would immediately cease to make sense. And since you can implement sum out of boolean gates, and from sum, every other mathematical operation, it is nicer to have something that maps nicely into practical use for math. What would be the boolean truth table for an arbitrary pair between false/maybe/true?

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Well... Actually boolean truth table is just a special case for number of values=2. You can define ternary logic just as easily To make it more interesting Z/high impedance state is actually used in every standard computer / electronic device to implement buses that can handle more than multiple devices on one line. – viraptor Apr 19 '09 at 0:14
cool :) I didn't know about that. Thanks – Stefano Borini Apr 19 '09 at 0:37
I disagree with wikipedia's satement that Z is a logic state. You cannot in the real world use Z in all operations. How would one build an XOR gate that works with Z? – MadCoder Apr 19 '09 at 2:37

A lot of it has to do, I am pretty sure, with error checking of digital signals. For example, in quantum computing this task is nearly impossible, but not impossible, to achieve do to the non-cloning principle, but also due to the fact that there are an increased number of states. For two states the process of error checking is not trivial, but it is relatively easy. For three states error checking becomes infinitely harder. This is also why analogue computers with an nearly infinite amount of states were ruled out.

If you are interested in Quantum Computing though look into sphere packing and quantum error checking, some pretty neat stuff there.

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As a little update on this question. I am actually thinking about trying to implement a very basic FPGA based ternary computer one day. – cwoodall Jun 20 '11 at 4:40

I think that ternary would be more efficient. It just never became popular. Binary took the stage and now a switch to ternary would be a change of everything we know.

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Definitely not "just more popular" on the hardware level: assuming that a simple binary logic gate has +1V defined as 0 and +5V defined as 1, the actual voltage will be somewhere in the vicinity - e.g. it could be +2V and +3.5V, yet still operate properly: in this case, there is still a reasonable gap to distinguish between a high and low state; for ternary, you'd have to a) have tighter operating (and by extension,manufacturing) tolerance, leading to more expensive iron, and/or b) work with higher voltages (e.g. +1/+5/+9V), which again has its own engineering pitfalls (thus again costs more). – Piskvor Mar 2 '11 at 9:28

To have a circuit operate in anything but binary, you must define how the other states will be represented. You've proposed a system of -1, 0, and +1, but transistors don't work that way, they like to have their voltage or current going in one direction only. To make a 3-state bit would take 2 transistors, but you could make 2 binary bits out of the same transistors and have 4 states instead of 3. Binary is just more practical at the low level.

If you tried to set thresholds on the circuit and use 0, +1, +2 instead, you run into a different set of problems. I don't know enough to go into details, but for logic circuits it's just more trouble than it's worth, especially when the industry is completely dedicated to binary already.

There is one area where multiple levels are used to get more than 2 states per bit: MLC flash memories. Even there the number of levels will be a power of 2 so that the output can be easily converted to binary for use by the rest of the system.

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Sure but a ternary 'bit' (a tet?) would be more complicated, you'd still be storing the same amount of information, just in base3 instead of base2, and the power if two-state components is the simplicity. Why not just go ahead and make a 10-state base10

Binary computing is related to binary AND, OR and NOT gates, their immense simplicity and ability to be combined into arbitrarily complex structures. They are the cornerstone of literally all the processing your computer does.

If there was a serious case to switch to ternary or decimal then they would. It isn't a case of 'they tried it like that and it just stuck'

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Side note: It's a 'trit', from trinary digit. – sunside Feb 22 '13 at 15:48
Side note #2: you'd actually be able to store more in a trit than a bit. For signed values, a trit could hold binary's 1 and 0, but also -1 without the need for a sign bit. For unsigned, a trit could hold 0, 1, and 2. Binary would require 2 bits to equate. And in the case of a deca system, you'd be able to hold an immense amount of information over a bit or even a trit. – doogle Jun 6 '14 at 14:13

If we use 3 states, then the main problem arising due to this are

  1. If we use unipolar signal then the noise margin will reduce, hence increasing the bit error rate.
  2. For unipolar signal to keep the noise margin constant we have to increase the power supply and hence the power consumption will increase.
  3. If we use bipolar signal then the total swing of the signal will increase thereby increasing the losses.
  4. Extra layer in multilayer PCB will have to be added to account for negative swing in the bipolar signals.

Hope i am convincing

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I think it has more to do with programmability, conditional statements and the efficient use and functionality of transistors than anything else. It might be obvious that a nested IF is true if there is a current through a circuit, but how would a program know what to do if the solution could be achieved by a thousand different routes? It's interesting in regard to AI, where memory and learning are far more important than brute computational power.

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