Memristor

Memristor

Type	Passive
Working principle	Memristance
Invented	Leon Chua (1971)
Electronic symbol

A memristor (/ˈmɛmrɪstər/; a portmanteau of memory resistor) is a hypothetical non-linear passive two-terminal electrical component relating electric charge and magnetic flux linkage. It was envisioned, and its name coined, in 1971 by circuit theorist Leon Chua.^[1] According to the characterizing mathematical relations, the memristor would hypothetically operate in the following way: the memristor's electrical resistance is not constant but depends on the history of current that had previously flowed through the device, i.e., its present resistance depends on how much electric charge has flowed in what direction through it in the past; the device remembers its history — the so-called non-volatility property.^[2] When the electric power supply is turned off, the memristor remembers its most recent resistance until it is turned on again.^[3][4]

In 2008, a team at HP Labs claimed to have found Chua's missing memristor based on an analysis of a thin film of titanium dioxide thus connecting the operation of ReRAM devices to the memristor concept. The HP result was published in the scientific journal Nature.^[3][5] Following this claim, Leon Chua has argued that the memristor definition could be generalized to cover all forms of two-terminal non-volatile memory devices based on resistance switching effects.^[2] Chua also argued that the memristor is the oldest known circuit element, with its effects predating the resistor, capacitor and inductor.^[6] There are, however, some serious doubts as to whether a genuine memristor can actually exist in physical reality.^{[7][8][9][10][11]} Additionally, some experimental evidence contradicts Chua's generalization since a non-passive nanobattery effect is observable in resistance switching memory.^[12] A simple test has been proposed by Pershin and Di Ventra^[13] to analyse whether such an ideal or generic memristor does actually exist or is a purely mathematical concept. Up to now, there seems to be no experimental resistance switching device (ReRAM) which can pass the test.^[13]

These devices are intended for applications in nanoelectronic memories, computer logic and neuromorphic/neuromemristive computer architectures.^[14][15][16] In 2013, Hewlett-Packard CTO Martin Fink suggested that memristor memory may become commercially available as early as 2018.^[17] In March 2012, a team of researchers from HRL Laboratories and the University of Michigan announced the first functioning memristor array built on a CMOS chip.^[18]

An array of 17 purpose-built oxygen-depleted titanium dioxide memristors built at HP Labs, imaged by an atomic force microscope. The wires are about 50 nm, or 150 atoms, wide.^[19] Electric current through the memristors shifts the oxygen vacancies, causing a gradual and persistent change in electrical resistance.^[20]

Background

Conceptual symmetries of resistor, capacitor, inductor, and memristor.

In his 1971 paper, Chua extrapolated a conceptual symmetry between the non-linear resistor (voltage vs. current), non-linear capacitor (voltage vs. charge) and non-linear inductor (magnetic flux linkage vs. current). He then inferred the possibility of a memristor as another fundamental non-linear circuit element linking magnetic flux and charge. In contrast to a linear (or non-linear) resistor the memristor has a dynamic relationship between current and voltage including a memory of past voltages or currents. Other scientists had proposed dynamic memory resistors such as the memistor of Bernard Widrow, but Chua attempted to introduce mathematical generality.

Memristor resistance depends on the integral of the input applied to the terminals (rather than on the instantaneous value of the input as in a varistor).^[3] Since the element "remembers" the amount of current that last passed through, it was tagged by Chua with the name "memristor". Another way of describing a memristor is as any passive two-terminal circuit element that maintains a functional relationship between the time integral of current (called charge) and the time integral of voltage (often called flux, as it is related to magnetic flux). The slope of this function is called the memristance M and is similar to variable resistance.

The memristor definition is based solely on the fundamental circuit variables of current and voltage and their time-integrals, just like the resistor, capacitor and inductor. Unlike those three elements however, which are allowed in linear time-invariant or LTI system theory, memristors of interest have a dynamic function with memory and may be described as some function of net charge. There is no such thing as a standard memristor. Instead, each device implements a particular function, wherein the integral of voltage determines the integral of current, and vice versa. A linear time-invariant memristor, with a constant value for M, is simply a conventional resistor.^[1] Manufactured devices are never purely memristors (ideal memristor), but also exhibit some capacitance and resistance.

Memristor definition and criticism

According to the original 1971 definition, the memristor was the fourth fundamental circuit element, forming a non-linear relationship between electric charge and magnetic flux linkage. In 2011 Chua argued for a broader definition that included all 2-terminal non-volatile memory devices based on resistance switching.^[2] Williams argued that MRAM, phase-change memory and ReRAM were memristor technologies.^[21] Some researchers argued that biological structures such as blood^[22] and skin^[23][24] fit the definition. Others argued that the memory device under development by HP Labs and other forms of ReRAM were not memristors, but rather part of a broader class of variable-resistance systems,^[25] and that a broader definition of memristor is a scientifically unjustifiable land grab that favored HP's memristor patents.^[26]

In 2011, Meuffels and Schroeder noted that one of the early memristor papers included a mistaken assumption regarding ionic conduction.^[27] In 2012, Meuffels and Soni discussed some fundamental issues and problems in the realization of memristors.^[7] They indicated inadequacies in the electrochemical modelling presented in the Nature article "The missing memristor found"^[3] because the impact of concentration polarization effects on the behavior of metal−TiO_2−x−metal structures under voltage or current stress was not considered. This critique was referred to by Valov et al.^[12] in 2013.

In a kind of thought experiment, Meuffels and Soni^[7] furthermore revealed a severe inconsistency: If a current-controlled memristor with the so-called non-volatility property^[2] exists in physical reality, its behavior would violate Landauer's principle of the minimum amount of energy required to change "information" states of a system. This critique was finally adopted by Di Ventra and Pershin^[8] in 2013.

Within this context, Meuffels and Soni^[7] pointed to a fundamental thermodynamic principle: Non-volatile information storage requires the existence of free-energy barriers that separate the distinct internal memory states of a system from each other; otherwise, one would be faced with an "indifferent" situation, and the system would arbitrarily fluctuate from one memory state to another just under the influence of thermal fluctuations. When unprotected against thermal fluctuations, the internal memory states exhibit some diffusive dynamics, which causes state degradation.^[8] The free-energy barriers must therefore be high enough to ensure a low bit-error probability of bit operation.^[28] Consequently, there is always a lower limit of energy requirement – depending on the required bit-error probability – for intentionally changing a bit value in any memory device.^[28][29]

In the general concept of memristive system the defining equations are (see Theory):

where u(t) is an input signal, and y(t) is an output signal. The vector x represents a set of n state variables describing the different internal memory states of the device. ẋ is the time-dependent rate of change of the state vector x with time.

When one wants to go beyond mere curve fitting and aims at a real physical modeling of non-volatile memory elements, e.g., resistive random-access memory devices, one has to keep an eye on the aforementioned physical correlations. To check the adequacy of the proposed model and its resulting state equations, the input signal u(t) can be superposed with a stochastic term ξ(t), which takes into account the existence of inevitable thermal fluctuations. The dynamic state equation in its general form then finally reads:

where ξ(t) is, e.g., white Gaussian current or voltage noise. On base of an analytical or numerical analysis of the time-dependent response of the system towards noise, a decision on the physical validity of the modeling approach can be made, e.g., would the system be able to retain its memory states in power-off mode?

Such an analysis was performed by Di Ventra and Pershin^[8] with regard to the genuine current-controlled memristor. As the proposed dynamic state equation provides no physical mechanism enabling such a memristor to cope with inevitable thermal fluctuations, a current-controlled memristor would erratically change its state in course of time just under the influence of current noise.^[8][30] Di Ventra and Pershin^[8] thus concluded that memristors whose resistance (memory) states depend solely on the current or voltage history would be unable to protect their memory states against unavoidable Johnson–Nyquist noise and permanently suffer from information loss, a so-called "stochastic catastrophe". A current-controlled memristor can thus not exist as a solid-state device in physical reality.

The above-mentioned thermodynamic principle furthermore implies that the operation of 2-terminal non-volatile memory devices (e.g. "resistance-switching" memory devices (ReRAM)) cannot be associated with the memristor concept, i.e., such devices cannot by itself remember their current or voltage history. Transitions between distinct internal memory or resistance states are of probabilistic nature. The probability for a transition from state {i} to state {j} depends on the height of the free-energy barrier between both states. The transition probability can thus be influenced by suitably driving the memory device, i.e., by "lowering" the free-energy barrier for the transition {i} → {j} by means of, for example, an externally applied bias.

A "resistance switching" event can simply be enforced by setting the external bias to a value above a certain threshold value. This is the trivial case, i.e., the free-energy barrier for the transition {i} → {j} is reduced to zero. In case one applies biases below the threshold value, there is still a finite probability that the device will switch in course of time (triggered by a random thermal fluctuation), but – as one is dealing with probabilistic processes – it is impossible to predict when the switching event will occur. That is the basic reason for the stochastic nature of all observed resistance-switching (ReRAM) processes. If the free-energy barriers are not high enough, the memory device can even switch without having to do anything.

When a 2-terminal non-volatile memory device is found to be in a distinct resistance state {j}, there exists therefore no physical one-to-one relationship between its present state and its foregoing voltage history. The switching behavior of individual non-volatile memory devices thus cannot be described within the mathematical framework proposed for memristor/memristive systems.

An extra thermodynamic curiosity arises from the definition that memristors/memristive devices should energetically act like resistors. The instantaneous electrical power entering such a device is completely dissipated as Joule heat to the surrounding, so no extra energy remains in the system after it has been brought from one resistance state x_i to another one x_j. Thus, the internal energy of the memristor device in state x_i, U(V, T, x_i), would be the same as in state x_j, U(V, T, x_j), even though these different states would give rise to different device’s resistances, which itself must be caused by physical alterations of the device's material.

Other researchers noted that memristor models based on the assumption of linear ionic drift do not account for asymmetry between set time (high-to-low resistance switching) and reset time (low-to-high resistance switching) and do not provide ionic mobility values consistent with experimental data. Non-linear ionic-drift models have been proposed to compensate for this deficiency.^[31]

A 2014 article from researchers of ReRAM concluded that Strukov's (HP's) initial/basic memristor modelling equations do not reflect the actual device physics well, whereas subsequent (physics-based) models such as Pickett's model or Menzel's ECM model (Menzel is a co-author of that article) have adequate predictability, but are computationally prohibitive. As of 2014, the search continues for a model that balances these issues; the article identifies Chang's and Yakopcic's models as potentially good compromises.^[32]

Martin Reynolds, an electrical engineering analyst with research outfit Gartner, commented that while HP was being sloppy in calling their device a memristor, critics were being pedantic in saying that it was not a memristor.^[33]

In the article "The Missing Memristor has Not been Found", published in Scientific Reports in 2015 by Vongehr and Meng,^[10] it was shown that the real memristor defined in 1971 is not possible without using magnetic induction. This was illustrated by constructing a mechanical analog of the memristor and then analytically showing that the mechanical memristor cannot be constructed without using an inertial mass. As it is well known that the mechanical equivalent of an electrical inductor is mass, it proves that memristors are not possible without using magnetic induction. Thus, it can be argued that the variable-resistance devices, such as the ReRAMs, and the conceptual memristors may have no equivalence at all.^[10][34]

Experimental tests for memristors

Chua suggested experimental tests to determine if a device may properly be categorized as a memristor:^[35]

• The Lissajous curve in the voltage-current plane is a pinched hysteresis loop when driven by any bipolar periodic voltage or current without respect to initial conditions.
• The area of each lobe of the pinched hysteresis loop shrinks as the frequency of the forcing signal increases.
• As the frequency tends to infinity, the hysteresis loop degenerates to a straight line through the origin, whose slope depends on the amplitude and shape of the forcing signal.

According to Chua^[36][37] all resistive switching memories including ReRAM, MRAM and phase-change memory meet these criteria and are memristors. However, the lack of data for the Lissajous curves over a range of initial conditions or over a range of frequencies, complicates assessments of this claim.

Experimental evidence shows that redox-based resistance memory (ReRAM) includes a nanobattery effect that is contrary to Chua's memristor model. This indicates that the memristor theory needs to be extended or corrected to enable accurate ReRAM modeling.^[12]

Theory

The memristor was originally defined in terms of a non-linear functional relationship between magnetic flux linkage Φ_m(t) and the amount of electric charge that has flowed, q(t):^[1]

The magnetic flux linkage, Φ_m, is generalized from the circuit characteristic of an inductor. It does not represent a magnetic field here. Its physical meaning is discussed below. The symbol Φ_m may be regarded as the integral of voltage over time.^[38]

In the relationship between Φ_m and q, the derivative of one with respect to the other depends on the value of one or the other, and so each memristor is characterized by its memristance function describing the charge-dependent rate of change of flux with charge.

Substituting the flux as the time integral of the voltage, and charge as the time integral of current, the more convenient forms are;

To relate the memristor to the resistor, capacitor, and inductor, it is helpful to isolate the term M(q), which characterizes the device, and write it as a differential equation.

The above table covers all meaningful ratios of differentials of I, Q, Φ_m, and V. No device can relate dI to dq, or dΦ_m to dV, because I is the derivative of Q and Φ_m is the integral of V.

It can be inferred from this that memristance is charge-dependent resistance. If M(q(t)) is a constant, then we obtain Ohm's Law R(t) = V(t)/ I(t). If M(q(t)) is nontrivial, however, the equation is not equivalent because q(t) and M(q(t)) can vary with time. Solving for voltage as a function of time produces

This equation reveals that memristance defines a linear relationship between current and voltage, as long as M does not vary with charge. Nonzero current implies time varying charge. Alternating current, however, may reveal the linear dependence in circuit operation by inducing a measurable voltage without net charge movement—as long as the maximum change in q does not cause much change in M.

Furthermore, the memristor is static if no current is applied. If I(t) = 0, we find V(t) = 0 and M(t) is constant. This is the essence of the memory effect.

The power consumption characteristic recalls that of a resistor, I²R.

As long as M(q(t)) varies little, such as under alternating current, the memristor will appear as a constant resistor. If M(q(t)) increases rapidly, however, current and power consumption will quickly stop.

M(q) is physically restricted to be positive for all values of q (assuming the device is passive and does not become superconductive at some q). A negative value would mean that it would perpetually supply energy when operated with alternating current.

In 2008 researchers from HP Labs introduced a model for a memristance function based on thin films of titanium dioxide.^[3] For R_ON ≪ R_OFF the memristance function was determined to be

where R_OFF represents the high resistance state, R_ON represents the low resistance state, μ_v represents the mobility of dopants in the thin film, and D represents the film thickness. The HP Labs group noted that "window functions" were necessary to compensate for differences between experimental measurements and their memristor model due to non-linear ionic drift and boundary effects.

Pinched hysteresis

Example of pinched hysteresis curve, V versus I

One of the resulting properties of memristors and memristive systems is the existence of a pinched hysteresis effect.^[39] For a current-controlled memristive system, the input u(t) is the current i(t), the output y(t) is the voltage v(t), and the slope of the curve represents the electrical resistance. The change in slope of the pinched hysteresis curves demonstrates switching between different resistance states which is a phenomenon central to ReRAM and other forms of two-terminal resistance memory. At high frequencies, memristive theory predicts the pinched hysteresis effect will degenerate, resulting in a straight line representative of a linear resistor. It has been proven that some types of non-crossing pinched hysteresis curves (denoted Type-II) cannot be described by memristors.^[40]

Implementations

Applications

Williams' solid-state memristors can be combined into devices called crossbar latches, which could replace transistors in future computers, given their much higher circuit density.

They can potentially be fashioned into non-volatile solid-state memory, which would allow greater data density than hard drives with access times similar to DRAM, replacing both components.^[20] HP prototyped a crossbar latch memory that can fit 100 gigabits in a square centimeter,^[82] and proposed a scalable 3D design (consisting of up to 1000 layers or 1 petabit per cm³).^[83] In May 2008 HP reported that its device reaches currently about one-tenth the speed of DRAM.^[84] The devices' resistance would be read with alternating current so that the stored value would not be affected.^[85] In May 2012, it was reported that the access time had been improved to 90 nanoseconds, which is nearly one hundred times faster than the contemporaneous Flash memory. At the same time, the energy consumption was just one percent of that consumed by Flash memory.^[86]

Memristor patents include applications in programmable logic,^[87] signal processing,^[88] neural networks,^[89] control systems,^[90] reconfigurable computing,^[91] brain-computer interfaces^[92] and RFID.^[93] Memristive devices are potentially used for stateful logic implication, allowing a replacement for CMOS-based logic computation. Several early works have been reported in this direction.^{[94] [95]}

In 2009, a simple electronic circuit^[96] consisting of an LC network and a memristor was used to model experiments on adaptive behavior of unicellular organisms.^[97] It was shown that subjected to a train of periodic pulses, the circuit learns and anticipates the next pulse similar to the behavior of slime molds Physarum polycephalum where the viscosity of channels in the cytoplasm responds to periodic environment changes.^[97] Applications of such circuits may include, e.g., pattern recognition. The DARPA SyNAPSE project funded HP Labs, in collaboration with the Boston University Neuromorphics Lab, has been developing neuromorphic architectures which may be based on memristive systems. In 2010, Versace and Chandler described the MoNETA (Modular Neural Exploring Traveling Agent) model.^[98] MoNETA is the first large-scale neural network model to implement whole-brain circuits to power a virtual and robotic agent using memristive hardware.^[99] Application of the memristor crossbar structure in the construction of an analog soft computing system was demonstrated by Merrikh-Bayat and Shouraki.^[100] In 2011, they showed^[101] how memristor crossbars can be combined with fuzzy logic to create an analog memristive neuro-fuzzy computing system with fuzzy input and output terminals. Learning is based on the creation of fuzzy relations inspired from Hebbian learning rule.

In 2013 Leon Chua published a tutorial underlining the broad span of complex phenomena and applications that memristors span and how they can be used as non-volatile analog memories and can mimic classic habituation and learning phenomena.^[102]

According to Allied Market Research, memristor market was worth $3.2 million in 2015 and will be worth $79.0 million by 2022.^[103]

Memcapacitors and meminductors

In 2009, Di Ventra, Pershin and Chua extended^[104] the notion of memristive systems to capacitive and inductive elements in the form of memcapacitors and meminductors, whose properties depend on the state and history of the system, further extended in 2013 by Di Ventra and Pershin.^[8]

Memfractance and memfractor, 2nd and 3rd order memristor, memcapacitor and meminductor

In September 2014, Mohamed-Salah Abdelouahab, Rene Lozi and Leon Chua, published a general theory of 1st, 2nd, 3rd order and nth order memristive element using fractional derivatives.^[105]

Timeline

See also

• Hybrid Memory Cube
• 3D XPoint
• Memistor
• Electrical element
• List of emerging technologies
• Physical neural network
• ReRAM
• Trancitor
• Neuromorphic engineering

References

Further reading

• Chen, Dongmin; Chua, Leon O.; Hwang, Cheol Seong; Wang, Shih-Yuan; Waser, Rainer; Williams, R. Stanley; Yang, Jianhua, eds. (March 2011). "Special Issue: Memristive and Resistive Devices and Systems". Applied Physics A. 102 (4). eISSN 1432-0630. ISSN 0947-8396.
• Mazumder, P.; Kang, S. M.; Waser, R., eds. (June 2012). "Special Issue: MEMRISTORS: DEVICES, MODELS, AND APPLICATIONS". Proceedings of the IEEE. 100 (6): 1905–2092. doi:10.1109/JPROC.2012.2197452. ISSN 0018-9219.
• Tetzlaff, Ronald, ed. (2013). Memristors and Memristive Systems (Google Books). Springer Science & Business Media. doi:10.1007/978-1-4614-9068-5. ISBN 978-1-4614-9068-5.
• Adamatzky, Andrew; Chua, Leon, eds. (2013). Memristor Networks (Google Books). Springer Science & Business Media. doi:10.1007/978-3-319-02630-5. ISBN 978-3-319-02630-5.
• Atkin, Keith (2013). "An introduction to the memristor". Physics Education. 48 (3): 317–321. Bibcode:2013PhyEd..48..317A. doi:10.1088/0031-9120/48/3/317. ISSN 0031-9120.
• Muthuswamy, B.; Jevtic, J.; Iu, H. H. C.; Subramaniam, C. K.; Ganesan, K.; Sankaranarayanan, V.; Sethupathi, K.; Kim, H.; Shah, M. P.; Chua, L. O. (2014). Memristor modelling (reprint on HARP Group) (PDF). 2014 IEEE International Symposium on Circuits and Systems (ISCAS). pp. 490–493. doi:10.1109/ISCAS.2014.6865179. ISBN 978-1-4799-3432-4.
  • See also: accompanying video "A physical memristor Lissajous figure" (YouTube)
• Gale, Ella (2014). "TiO 2 -based memristors and ReRAM: materials, mechanisms and models (a review) (reprint on arXiv:1611.04456)". Semiconductor Science and Technology. 29 (10): 104004. arXiv:1611.04456. Bibcode:2014SeScT..29j4004G. doi:10.1088/0268-1242/29/10/104004. ISSN 0268-1242.
• Traversa, F. L.; Ventra, M. Di (2015). "Universal Memcomputing Machines (reprint on arXiv:1405.0931v2)". IEEE Transactions on Neural Networks and Learning Systems. 26 (11): 2702–2715. arXiv:1405.0931. CiteSeerX 10.1.1.747.5690. doi:10.1109/TNNLS.2015.2391182. ISSN 2162-237X. PMID 25667360.
• Maan, A. K.; Jayadevi, D. A.; James, A. P. (2017). "A Survey of Memristive Threshold Logic Circuits". IEEE Transactions on Neural Networks and Learning Systems. 28 (8): 1734–1746. arXiv:1604.07121. doi:10.1109/TNNLS.2016.2547842. ISSN 2162-237X. PMID 27164608.

External links

Wikimedia Commons has media related to Memristors.

• Finding the missing memristor on YouTube
• Interactive database of memristor papers (2013)
• Simonite, Tom (April 21, 2015). "Machine Dreams". Technology Review. Retrieved 5 December 2017.