Charlieplexing

Charlieplexing (also known as tristate multiplexing, reduced pin-count LED multiplexing, complementary LED drive and crossplexing) is a technique for accessing a large number of LEDs, switches, micro-capacitors or other I/O entities, using relatively few tri-state logic wires from a microcontroller. These I/O entities can be wired as discrete components, x/y arrays,  or woven in a diagonally intersecting pattern to form diagonal arrays.

The simplest way to address a single pixel (or input button) is to run a wire out to it and another wire back to ground, but this requires a lot of wiring. A slight improvement is to have everything return on a common ground, but this still requires one wire (and one pin on the microcontroller) for each pixel or button. For an X by Y array, X*Y pins are required.

With tri-state logic pins (high, low, disconnected), matrix wiring needs only X+Y pins and wires. Each X and each Y take turns being on vs being disconnected; the disadvantage is that each light is only powered at most 1/(X*Y) of the time. If there is enough Fan-out, the Y pins can be left always on, and all checked in parallel. The refresh can then happen every 1/X of the time, but the X wires each need to pass enough current to light up Y lights at once.

Charlieplexing is a further improvement on matrix wiring. Instead of X horizontal wires meeting Y vertical wires, every wire meets every other wire. Assuming diodes are used for the connections (to distinguish between wire 3 meeting wire 5 vs wire 5 meeting wire 3), Charlieplexing needs only about half as many pins as a conventional matrix arrangement, at the cost of more complicated mapping. Alternatively, the same number of pins will support a display nearly four times (doubling in both directions) as large.

This enables these I/O entities (LEDs, switches etc.) to be connected between any two microcontroller I/Os -   e.g. with 4 I/Os, each I/O can pair with 3 other I/Os, resulting in 6 unique pairings (1/2, 1/3, 1/4, 2/3, 2/4, 3/4). Only 4 pairings are possible with standard x/y multiplexing (1/3, 1/4, 2/3, 2/4). Also, due to the microcontroller's ability to reverse the polarity of the 6 I/O pairs, the number of LEDS (or diodes) that are uniquely addressable, can be doubled to 12 - adding LEDS 2/1, 3/1, 4/1, 3/2, 4/2 and 4/3.

Although it is more efficient in its use of I/O, a small amount of address manipulation is required when trying to fit Charlieplexing into a standard x/y array.

Other issues that affect standard multiplexing but are exacerbated by Charlieplexing are:


 * consideration of current requirements and the forward voltages of the LEDs.
 * a requirement to cycle through the in-use LEDs rapidly so that the persistence of the human eye perceives the display to be lit as a whole. Multiplexing can generally be seen by a strobing effect and skewing if the eye's focal point is moved past the display rapidly.

Origin
The Charlieplexing technique was introduced by Maxim Integrated in 2001 as a reduced pin-count LED multiplexing scheme in their MAX6951 LED display driver. The name "Charlieplexing", however, first occurred in a 2003 application note. It was named after Charles "Charlie" M. Allen, an applications engineer of MAX232 fame,  who had proposed this method internally.

Also in 2001, Don Lancaster illustrated the method as part of his musings about the "N-connectedness" problem, referring to Microchip Technology, who had already discussed it as "complementary LED drive technique" in a 1998 application note and would later include it in a tips & tricks booklet.

While Microchip did not mention the origin of the idea, they might have picked it up in the PICLIST, a mailing list on Microchip PIC microcontrollers, where, also in 1998, Graham Daniel proposed it to the community as a method to drive rows and columns of bidirectional LEDs. Daniel at the time had created simple circuits with PIC 12C508 chips driving 12 LEDs off 5 pins with a mini command set to set various lighting displays in motion.

The method, however, was known and utilized by various parties much earlier in the 1980s, and has been described in detail as early as in 1979 in a patent by Christopher W. Malinowski, Heinz Rinderle and Martin Siegle of the Department of Research and Development, AEG-Telefunken, Heilbronn, Germany for what they called a "three-state signaling system".

Reportedly, similar techniques were already in use as early as 1972 for track signaling applications in model railroading.

Display multiplexing is very different from multiplexing used in data transmission, although it has the same basic principles. In display multiplexing, the data lines of the displays are connected in parallel to a common databus on the microcontroller. Then, the displays are turned on and addressed individually. This allows the use of fewer I/O pins than it would normally take to drive the same number of displays directly. Here, each "display" could, for instance, be one calculator digit, not the complete array of digits.

With traditional multiplexing $$N$$ I/O pins can drive a maximum of $$(\frac{N}{2})^2 = \frac{N^2}{4}$$ LEDs, or listen to that many input switches. Charlieplexing can drive $$N^2 - N$$ LEDs, or listen to $$\frac{N^2 - N}{2}$$ buttons even if directionality is not enforced by a diode.

Tri-state multiplexing (Charlieplexing)


The Charlieplexing configuration may be viewed as a directed graph, where the drive pins are vertices and the LEDs are directed edges; there is an outward-pointing edge connected from each vertex to each other vertex, hence with n drive pins there are (n)(n-1) total edges. This equates to n pins being able to drive n2 − n segments or LEDs.

If the number of LEDs (L) is known, then the number of pins (n) can be found from the equation: $ n = \left\lceil 1 + \sqrt{L} \right\rfloor$, the result being rounded up or down to the nearest whole number.

Example: If L = 57, then √L = 7.549, and 1 + √L = 8.549; the nearest whole number to this is 9, so 9 pins are needed to drive 57 LEDs (9 pins could drive up to 72 LEDs, but 8 pins could drive only 56 LEDs at most).


 * Origin of the (n2 − n) equation in Charlieplexing:



Unlike in a traditional x/y multiplexed array, where a sub-set of conductive elements crosses a different sub-set of conductive elements, in a "fully Charlieplexed" multiplexed array, each conductive element crosses every other conductive element.

Six (n) conductive elements in a standard x/y multiplexed array forms a maximum of nine ((n / 2)2) unique intersections (see figure on far left).

The other diagrams also show six (n) conductive elements, but here all six elements cross over themselves, forming a multiplexed array of 36 (n2) intersections. LEDs are shown placed at every intersection. However, each conductor also crosses itself at the diagonal. Horizontal conductor 1 crosses vertical conductor 1, horizontal conductor 2 crosses vertical conductor 2, etc. This means that six of these LEDs are short-circuited (e.g. D1 and D5 are short-circuited). The six (n) diagonal LEDs will, therefore, never light up, because no voltage can ever develop across them, so (n) has to be subtracted from the total. There is no point in installing these LEDs (they are simply included here for illustrative purposes).

This leaves 30 LEDs (n2 − n) that can be uniquely addressed and lit up independently.

Conductor "a" crossing conductor "b" is distinguishable from conductor "b" crossing conductor "a" because LED polarity is reversed. For example, when conductor 3 is positive and conductor 2 is negative, current flows through, and lights up LED D8, but when conductor 3 is negative and conductor 2 is positive, current flows through, and lights up LED D9.

These reverse polarity LED pairs are called complementary pairs. This diagram has 15 complementary pairs, allowing 30 LEDs to be lit independently.



The 6 unusable diagonal LEDs can be conveniently replaced by actual bidirectional shortcuts (so that there's no longer need to set up the interconnection lines grouped on the left and bottom of the diagrams, to drive the bottom input of vertical connectors from the matching left input of horizontal connectors).

By adjusting diagonally the form of horizontal and vertical connectors along the short-circuited main diagonal of the original matrix, this can be easily transformed into an array of 5 × 6 or 6 × 5 LEDs arranged on a regular grid.

A similar pattern could be used for a 10 × 11 matrix that could be used to drive up to 110 keys (including a few indicator LEDs) on a modern PC keyboard, where each key switch includes a small serial diode or LED, so that only 11 pins would be needed to individually control all of them (these individual diodes or LEDs inside each key switch would also avoid all common and undesirable "ghosting" effects, that are hard to eliminate completely when an arbitrary number of keys at any position are pressed at the same time).

Charlieplexing can also be used to significantly reduce the number of controlling pins for much larger matrixes, such as modern digital displays with high resolution. E.g. for a 4K RGB display at 3840 × 2160, this requires more than 8 millions individually addressable pixels, each featuring at least 3 colored LEDs or LCD cells, for a total of nearly 25 millions LEDs or LCD cells. Using a conventional x/y multiplexing would require at least (3840 + 2160 × 3) = 10320 controlling pins and many selection chips for controlling rows and columns all around the panel of LEDs or LCD cells. But with Charlieplexing, this can be reduced to only 63 controlling pins for the selection gate of display columns, plus 46 × 3 controlling pins for the selection and power-activation of RGB display rows, by a single transistor for each row or column (possibly with an extra common shielding ground to limit their mutual coupling); these controlling pins can easily fit around the output pins of one or two controller chips, even if we add the few additional pins needed on the controller for power, ground, clocks and I/O buses, surface-mounted with a high density and low cost on a single-layer PCB, and no need of complex routing and interconnection holes between layers; a dual layer is needed only for the basic Charlieplexing matrix mounted on borders of the panel itself.

Positions in the Charlieplexed matrix are not reduced to be just LEDs or diodes, they can be filled as well by two pins of a transistor (including its gate pin) so that its third pin is used as output to further control other devices, such as the horizontal and vertical selection lines of a large flat display panel (in that case, the two Charlieplexed matrices of transistors controlling and activating the rows or columns of the panel will be smartly arranged all along a border of that panel).

Complementary drive
Charlieplexing in its simplest form works by using a diode matrix of complementary pairs of LEDs. The simplest possible Charlieplexed matrix would look like this:



By applying a positive voltage to pin X1 and grounding pin X2, LED 1 will light. Since current cannot flow through LEDs in reverse direction at this low voltage, LED2 will remain unlit. If the voltages on pin X1 and pin X2 are reversed, LED 2 will light and LED1 will be unlit.

The Charlieplexing technique does not actually make a larger matrix possible when only using two pins, because two LEDs can be driven by two pins without any matrix connections, and without even using tri-state mode. In this two-LED example, Charlieplexing would save one ground wire, which would be needed in a common 2-pin driver situation.

However, the 2-pin circuit serves as a simple example to show the basic concepts before moving on to larger circuits where Charlieplexing actually shows an advantage.

Expanding: tri-state logic
If the circuit above were to be expanded to accommodate three pins and six LEDs, it would look like this:



This presents a problem, however: In order for this circuit to act like the previous one, one of the pins must be disconnected before applying charge to the remaining two. If, for example, LED 5 was intended to be lit, X1 must be charged and X3 must be grounded. However, if X2 is also charged, LED 3 would illuminate as well. If X2 was instead grounded, LED1 would illuminate, meaning that LED 5 cannot be lit by itself. This can be solved by utilizing the tri-state logic properties of microcontroller pins. Microcontroller pins generally have three states: "high" (5 V), "low" (0 V) and "input". Input mode puts the pin into a high-impedance state, which, electrically speaking, "disconnects" that pin from the circuit, meaning little or no current will flow through it. This allows the circuit to see any number of pins connected at any time, simply by changing the state of the pin. In order to drive the six-LED matrix above, the two pins corresponding to the LED to be lit are connected to 5 V (I/O pin "high" = binary number 1) and 0 V (I/O pin "low" = binary 0), while the third pin is set in its input state.

In doing so, current leakage out of the third pin is prevented, ensuring that the LED wished to be lit is the only one lit. Because the desired LED reduces the voltage available after the resistor, current will not flow across alternate paths (an alternate 2-LED path exists for every pair of pins in the 3-pin diagram, for example), so long as the voltage drop in the desired LED path is less than the total voltage drop across each string of alternative LEDs. However, in the variant with individual resistors this voltage-regulating effect does not affect the alternative paths so all LEDs used will not have to be lit with half the supply voltage applied because this variant does not benefit from the voltage-regulating effect of the desired path LED.

By using tri-state logic, the matrix can theoretically be expanded to any size, as long as pins are available. For n pins, n(n − 1) LEDs can be in the matrix. Any LED can be lit by applying 5 V and 0 V to its corresponding pins and setting all of the other pins connected to the matrix to input mode. Under the same constraints as discussed above up to n − 1 LEDs sharing a common positive or negative path can be lit in parallel.

Expanding
The 3-wire circuit can be rearranged to this near-equivalent matrix (resistors have been relocated).



This emphasizes the similarities between ordinary grid multiplex and Charlieplex, and demonstrates the pattern that leads to "the n-squared minus n" rule.

In typical usage on a circuit board the resistors would be physically located at the top of the columns and connected to the input pin. The rows would then be connected directly to the input pin bypassing the resistor.

The first setup in the image on the left is suitable only when identical LEDs are used since a single resistor is used for current-limiting through more than one LED (though not at the same time&mdash;rather, one resistor limits current through only one LED in a given column at one time). This is contrasted to the second configuration with individual resistors for each LED, as shown in the image on the right. In this second configuration, each LED has a unique resistor paired with it. This makes it possible to mix different kinds of LEDs by providing each with its appropriate resistor value.

In both of these configuration, as shown in both the left and the right image, the relocated resistors make it possible to light multiple LEDs at the same time row-by-row, instead of requiring that they be lit individually. The row current capacity could be boosted by an NPN emitter follower BJT transistor instead of driving the current directly with the typically much weaker I/O pin alone.

Refresh rate
Refresh rate is not a problem if Charlieplexed Active matrix addressing is used with a Charlieplexed LED array.

In common with x/y multiplexing, however, there can be refresh rate issues if passive matrix addressing is used.

Because only a single set of LEDs, all having a common anode or cathode, can be lit simultaneously without turning on unintended LEDs, Charlieplexing requires frequent output changes, through a method known as multiplexing. When multiplexing is done, not all LEDs are lit quite simultaneously, but rather one set of LEDs is lit briefly, then another set, and eventually the cycle repeats. If it is done fast enough, they will appear to all be on, all the time, to the human eye because of persistence of vision. In order for a display to not have any noticeable flicker, the refresh rate for each LED must be greater than the Flicker fusion threshold; 50 Hz is often used as an approximation.

As an example, 8 tri-state pins are used to control 56 LEDs through Charlieplexing, which is enough for 8 7-segment displays (without decimal points). Typically, 7-segment displays are made to have a common cathode, sometimes a common anode, but without loss of generality a common cathode is assumed in the following: All LEDs in all 8 7-segment displays cannot be turned on simultaneously in any desired combination using Charlieplexing. It is impossible to get 56 bits of information directly from 8 trits (the term for a base-3 character, as the pins are 3-state) of information, as 8 trits fundamentally comprises 8 log23, or about 12.7 bits of information, which falls far short of the 56 bits required to turn all 56 LEDs on or off in any arbitrary combination. Instead, the human eye must be fooled by use of multiplexing.

Only one 7-segment display, one set of 7 LEDs can be active at any time. The way this would be done is for the 8 common cathodes of the 8 displays to each get assigned to its own unique pin among the 8 I/O ports. At any time, one and only one of the 8 controlling I/O pins will be actively low, and thus only the 7-segment display with its common cathode connected to that actively low pin can have any of its LEDs on. That is the active 7-segment display. The anodes of the 7 LED segments within the active 7-segment display can then be turned on in any combination by having the other 7 I/O ports either high or in high-impedance mode, in any combination. They are connected to the remaining 7 pins, but through resistors (the common cathode connection is connected to the pin itself, not through a resistor, because otherwise the current through each individual segment would depend on the number of total segments turned on, as they would all have to share a single resistor). But to show a desired number using all 8 digits, only one 7-segment display can be shown at a time, so all 8 must be cycled through separately, and in a 50th of a second for the entire period of 8. Thus the display must be refreshed at 400 Hz for the period-8 cycle through all 8 segments to make the LEDs flash no slower than 50 times per second. This requires constant interruption of whatever additional processing the controller performs, 400 times per second.

Peak current
Due to the decreased duty cycle, the current requirement of a Charlieplexed display increases much faster than it would with a traditionally multiplexed display. As the display gets larger, the average current flowing through the LED must be (roughly) constant in order for it to maintain constant brightness, thus requiring the peak current to increase proportionally. This causes a number of issues that limit the practical size of a Charlieplexed display.
 * LEDs often have a maximum peak current rating as well as an average current rating.
 * If the microcontroller code crashes, and a one-LED-at-a-time Charlieplex is being used, the single LED left lit is under much higher stress than it would be in a row-at-a-time Charlieplexed display or in a traditionally multiplexed display, increasing the risk of a failure before the fault is spotted.

Requirement for tristate
All the outputs used to drive a Charlieplexed display must be tristate. If the current is low enough to drive the displays directly by the I/O pins of the microcontroller, this is not a problem, but if external tristates must be used, then each tristate will generally require two output lines to control, eliminating most of the advantage of a Charlieplexed display. Since the current from microcontroller pins is typically limited to about 20 mA, this severely restricts the practical size of a Charlieplexed display. However, it can be done by enabling one segment at a time.

Complexity
Diagonally "wired" Charlieplex arrays are very simple to lay out and scan.



If used as a multitouch projected capacitance touchscreen (see figure on left), the first I/O can be set as an output and all the remaining I/Os set as inputs. All these inputs can be sensed simultaneously, if processor resources allow - the input equivalent of Chipiplexing. When output 1 has been "read" by all these inputs, the second I/O can be set as an output and I/Os 1, 3, 4, 5, etc. set as inputs.

This sequence is repeated until the whole screen has been scanned. This process is repeated, ad infinitum, for subsequent scans.

A very simple, diagonal layout can be used to create a regular, scalable Charlieplexed diode array, where n I/O lines control (n - 1)2 diodes - all of which face the same direction (see diagram on right).

This diagram shows n (n - 1) diodes, but the diodes in the last column face alternating directions.

X/y Charlieplexed matrices are normally significantly more complicated, both in the required PCB layout and microcontroller programming, than prebuilt standard x/y multiplex matrices. This increased design time. Soldering components could also be more time-consuming. It was suggested that a balance between complexity and pin use could be achieved by Charlieplexing several pre-built multiplexed LED arrays together.

Forward voltage
When using LEDs with different forward voltages, such as when using different color LEDs, some LEDs can light when not desired.

In the diagram above it can be seen that if LED 6 has a 4 V forward voltage, and LEDs 1 and 3 have forward voltages of 2 V or less, they will light when LED 6 is intended to, as their current path is shorter. This issue can easily be avoided by comparing forward voltages of the LEDs used in the matrix and checking for compatibility issues. Or, more simply, using LEDs that all have the same forward voltage.

This is also a problem where the LEDs are using individual resistors instead of shared resistors, if there is a path through two LEDs that has less LED drop than the supply voltage these LEDs may also illuminate at unintended times.

LED failure
If a single LED fails, by becoming either open-circuit, short-circuit, or leaky (developing a parasitic parallel resistance, which allows current in both directions), the impact will be catastrophic for the display as a whole. Furthermore, the actual problematic LED may be very difficult to identify, because potentially a large set of LEDs which should not be lit may all come on together, and—without detailed knowledge of the circuit—the relation between which LED is bad and what set of LEDs all come on together cannot be easily established.



In a standard x/y array, a LED (D1) going open-circuit causes that LED to cease functioning, with no further consequences.

In a partially "Charlieplexed" array, however, if the failed LED (D1) becomes open circuit, the voltage between the LED's 2 electrodes may build up until it finds a path through, at least three other LEDs. If the voltage is high enough, this may cause these other LEDs (such as D2, D3 and D4) to light up unexpectedly.

No deleterious effect is noticed, however, when the polarity is reversed, as D1 would not have conducted under such circumstances anyway, due to it being reverse biased. Current passes through D1's complementary diode (D5) as normal.

If the failed LED becomes an open circuit in a fully "Charlieplexed" array, the voltage between the LED's two electrodes may build up until it finds a path through two other LEDs. There are as many such paths as there are pins used to control the array minus 2; if the LED with anode at node m and cathode at node n fails in this way, it may be that every single pair of LEDs in which one's anode is node m, cathode is p for any value of p (with the exceptions that p cannot be m or n, so there are as many possible choices for p as the number of pins controlling the array minus 2), along with the LED whose anode is p and cathode is n, will all light up.

If there are 8 I/O pins controlling the array, this means that there will be 6 parasitic paths through pairs of 2 LEDs, and 12 LEDs may be unintentionally lit, but fortunately this will only happen when the one bad LED is supposed to come on, which may be a small fraction of the time and will exhibit no deleterious symptoms when the problem LED is not supposed to be lit. If the problem is a short between nodes x and y, then every time any LED U with either x or y as its anode or cathode and some node z as its other electrode is supposed to come on (without loss of generality, here U's cathode is connected to x), the LED V with cathode y and anode z will light as well, so any time either node x or y is activated as an anode OR a cathode, two LEDs will come on instead of one. In this case, it lights only one additional LED unintentionally, but it does it far more frequently; not merely when the failed LED is supposed to come on, but when any LED that has a pin in common with the failed LED is supposed to come on.

The problematic elements become especially difficult to identify if there are two or more LEDs at fault. What this means is that unlike most methods in which the loss of a single LED merely causes a single burned-out segment, when Charlieplexing is used, one or two burned-out LEDs, whatever the mode of failure, will almost certainly cause a catastrophic cascade of unintended lightings of the LEDs that still work, very likely rendering the entire device completely and immediately unusable. This must be taken into account when considering the required lifetime and failure characteristics of the device being designed.

LED failure in a diagonal matrix:

Due to the fact that the layout of a standard vertical/horizontal Charlieplexed matrix is quite complicated, the consequences of LED failure are more easily described using a simple diagonal Charlieplexed matrix.

The diagram shows a 6-input Charlieplexed array where one LED (L1) becomes open circuit.

If one LED goes open circuit, and if the voltage is high enough, then current that should have gone through that LED could theoretically find an alternative route through other LEDs. For example, if LED 1 (L1) goes open circuit, then current could still flow from terminal 3 to terminal 2 via L2 in series with L3. Other routes are via L4/L5, L6/L7 and L8/L9. This could possibly cause these LEDs to flicker.

If LED 1 goes short circuit, then both its terminals will always be at the same potential, and so will those of its inverted complementary LED. Therefore, neither LED will light up, even though one of them may still be fully functional.

If terminal 2 or terminal 3 is negative, then both the red and brown tracks will be negative at the same time. Therefore, some LEDs connected to these tracks could light up un-intentionally when terminals 1, 4, 5 or 6 are positive.

Similarly, if terminal 2 or terminal 3 is positive, then both the red and brown tracks will be positive at the same time. Therefore, some LEDs connected to these tracks could light up un-intentionally when terminals 1, 4, 5 or 6 are negative.

It has been shown that the failure of one LED can cause other consequences.

If a complementary pair of LEDs are not working, then it is most likely that only one of them is shorting, and a meter may be used to test which one it is. Otherwise, if one or more LEDs never light up, then they are probably all faulty and should be replaced. Their replacement will, hopefully, make any spurious artefacts disappear.

Input data multiplexing
Charlieplexing can also be used to multiplex digital input signals into a microcontroller. The same diode circuits are used, except a switch is placed in series with each diode. To read whether a switch is open or closed, the microcontroller configures one pin as an input with an internal pull-up resistor. The other pin is configured as an output and set to the low logic level. If the input pin reads low, then the switch is closed, and if the input pin reads high, then the switch is open.

One potential application for this is to read a standard (4 × 3) 12-key numeric keypad using only 4 I/O lines. The traditional row-column scan method requires 4 + 3 = 7 I/O lines. Thus Charlieplexing saves 3 I/O lines; however it adds the expense of 12 diodes, (since the diodes are only free when LEDs are used). A variation of the circuit with only 4 diodes is possible, however this reduces the rollover of the keyboard. The microcontroller can always detect when the data is corrupt, but there is no guarantee it can sense the original key presses, unless only one button is pressed at a time. (However, it is probably possible to arrange the circuit so that if at most any two adjacent buttons are pressed, then no data loss will occur.) The input is only lossless in the 4-diode circuit if only one button is pressed at a time, or if certain problematic multiple key presses are avoided. In the 12-diode circuit, this is not an issue, and there is always a one-to-one correspondence between button presses and input data. However, there are so many diodes that are required to use the method (especially for larger arrays) that there is generally no cost savings over the traditional row-column scan method, unless the cost of a diode is only a fraction of the cost of an I/O pin, where that fraction is one over the number of I/O lines.

Projected capacitance touchscreens and keypads.



These do not use diodes but rely on the change in capacitance between crossing conductive tracks to detect the proximity of one or more fingers through non-conducting materials such as plastic overlays, wood, glass, etc. - even double glazing.

These tracks can be made from a wide range of materials, such as printed circuit boards, transparent Indium Tin oxide, insulation coated fine wire, etc.

The technology can range in size from very small, as in "fingerprint detectors", to very large, as in "touch interactive video walls". Usually, a limit is imposed on the maximum width of an x/y wired touchscreen, because the horizontal track resistance gets too great for the product to function properly. However, a diagonally wired touchscreen (as described later in this section) does not have this problem.

Charlieplexing is ideal for diagonally wired projected capacitance keypads and touchscreens. It almost doubles the number of cross-over points when compared to standard x/y multiplexing, and all I/O tracks come from just one edge.

The left image (above) shows the diagonal wiring arrangement of a 32 I/O projected capacitance touchscreen, manufactured using 10 micron diameter wire. The video shows the same touchscreen in action.

There are no LEDs or diodes and, at any one time, only one I/O line is set as an output, the remaining I/O lines being set as high-impedance inputs or "grounded". This means that power requirements are very small.

GuGaplexing
In 2008, Dhananjay V. Gadre devised Gugaplexing, which is like Charlieplexing with multiple drive voltages.

Chipiplexing
In 2008, Guillermo Jaquenod's so called Chipiplexing adds emitter followers to boost the strength of the row drive allowing rows wider than a single microcontroller port could drive to be lit simultaneously.

Cross-plexing
In 2010, the Austrian chip manufacturer austriamicrosystems AG (named ams AG since 2012, and ams-OSRAM AG since 2020) introduced the multiplexing LED driver IC AS1119, followed by the AS1130 in 2011. Also, the analog & mixed signal (AMS) division (named Lumissil Microsystems since 2020) of Integrated Silicon Solution Inc. (ISSI) introduced the IS31FL3731 in 2012 and the IS31FL3732 in 2015. They all use a technique they call cross-plexing, a variant of Charlieplexing with automatic detection of open or shorted connections and anti-ghosting measures.

Diagonal arrays


In 2015, a diagonal Charlieplex array was invented by Ron Binstead of Binstead Designs Ltd, while searching for a simplified projected capacitance touchscreen design. This greatly simplified the layout of large Charlieplexed arrays which, until then, used some very complex arrangements.

Triangular array - A triangular Charlieplexed array of (n2 − n) LEDs can be formed simply by folding a group of n parallel conductors at right angles over themselves, and placing a complementary pair of LEDs at each of the resulting unique intersections - see diagram on left. I/O connections can be made at the ends of the conductors, or at the fold positions - forming split conductors.

Rectangular array - A square/rectangular diagonal array can be formed by double folding the parallel conductors - see diagram on right. Unsplit I/O conductors enter from the end of the array.

Cylindrical array - Split and unsplit diagonal conductors can also be formed into a seamless cylindrical array.

The diagram on the right shows a 6 I/O, split Charlieplexed cylindrical display layout, with 30 intersections, each with a uniquely addressable LED. All the I/Os connect at the bottom edge of the cylinder (standard x/y cylindrical arrays would require the horizontal I/Os to enter from the side, or be "bussed" up a seam in one side).

In the top image, the North-West orientated branch of a split I/O conductor is sometimes used as a current source (logic 1). At other times, the North-East orientated branch of the same conductor, is used as a current sink (logic 0). When not being used to power any LEDs, the I/O is "turned off" (tristate). This prevents other LEDs from being lit unintentionally.

The red and blue leds are both connected to the same two conductors, but with reversed polarity, forming a complementary pair. This means that it is not possible to turn on both leds at exactly the same time.

The red LED in the display is turned on by: a) setting all the I/Os to "off", b) setting I/O 2 to logical 0, and c) setting I/O 4 to logical 1. The blue LED does not light up because, under these conditions, it is a diode that is reverse biased.

The blue LED in the display is turned on by: a) setting all the I/Os to "off", b) setting I/O 2 to logical 1, and c) setting I/O 4 to logical 0. The red LED does not light up because, under these conditions, it is reverse biased.

This illustrates how Charlieplexing requires all I/Os to be capable of three states (tri-state) - "off", logical 0, or logical 1.

The conductive elements can be formed into a loop - as shown in the top image. This allows current to flow to the LEDs via two routes - similar to a Domestic Ring Main.

The LEDs could alternatively be arranged as vertical or horizontal complementary pairs, at the intersections - vertical being shown in the lower image.

When using complementary LED pairs, an odd number of I/Os may be required in order to obtain full Charlieplexing capability. For example: 6 Charlieplexed I/Os can create an array of 15 unique intersections. One of the dimensions of the array will be 6. To obtain 15 unique intersections, the other dimension would have to be 15/6 or 2.5, which could be problematic. However, 7 I/Os can create 21 unique intersections, 21/7 = 3. Therefore, 7 I/Os create a 7 × 3 array, which does not cause issues.

Non-Charlieplexed diagonal arrays can also be formed into cylinders, but 6 I/Os would only create 9 unique intersections.

These cylinders can be physically transformed into complex 3 dimensional shapes, by a range of different methods - such as blow molding, vacuum forming, etc.

A similar layout is possible for a cylindrical touchscreen ( see Touchscreen).



"Infinitely" wide array - The diagram on the right shows the layout for a multi-touch, projected capacitance, touchscreen of potentially "infinite" width. Diagonal conductor lengths never exceed 1.414 times the height of the touchscreen $ \left\lceil H \sqrt{2} \right\rfloor$, meaning that the screen can be widened "indefinitely" without increasing conductor resistance. This is reduced to 1.12 times the height of the touchscreen $ \left\lceil H \sqrt{1.25} \right\rfloor$, if the sensing elements intersect at 60 degrees instead of 90 degrees.

Tucoplexing
In 2019, Micah Elizabeth Scott developed a method to use 3 pins to run 4 LEDs and 4 switches called Tucoplexing.

Pulse-width modulation
Charlieplexing can even be used with pulse-width modulation to control the brightness of 12 LEDs with 4 pins.

Code example
In the following Arduino code example, the circuit uses ATtiny 8-pin microcontroller which has 5 I/O pins to create a 7-segment display. Since a 7-segment display only requires control of 7 individual LEDs, we use 4 of the ATtiny I/O pins as Charlieplexed outputs (n (n - 1)), i.e. the 4 pins could be used to control up to 12 individual LEDs (here we just use 7 of them). Leaving the fifth I/O pin to be used as digital or analog input or another output.