Landauer's principle

Rolf Landauer first proposed the principle in 1961 while working at IBM.[5] He justified and stated important limits to an earlier conjecture by John von Neumann. For this reason, it is sometimes referred to as being simply the Landauer bound or Landauer limit.

In 2011, the principle was generalized to show that while information erasure requires an increase in entropy, that increase could theoretically occur at no energy cost.[6] Instead, the cost can be taken in another conserved quantity, such as angular momentum.

In a 2012 article published in Nature, a team of physicists from the École normale supérieure de Lyon, University of Augsburg and the University of Kaiserslautern described that for the first time they have measured the tiny amount of heat released when an individual bit of data is erased.[7]

In 2014, physical experiments tested Landauer's principle and confirmed its predictions.[8]

In 2016, researchers used a laser probe to measure the amount of energy dissipation that resulted when a nanomagnetic bit flipped from off to on. Flipping the bit required 26 millielectron volts (4.2 zeptojoules).[9]

A 2018 article published in Nature Physics features a Landauer erasure performed at cryogenic temperatures (T = 1K) on an array of high-spin (S = 10) quantum molecular magnets. The array is made to act as a spin register where each nanomagnet encodes a single bit of information.[10] The experiment has laid the foundations for the extension of the validity of the Landauer principle to the quantum realm. Owing to the fast dynamics and low "inertia" of the single spins used in the experiment, the researchers also showed how an erasure operation can be carried out at the lowest possible thermodynamic cost—that imposed by the Landauer principle—and at a high speed.[10]

Landauer's principle can be understood to be a simple logical consequence of the second law of thermodynamics—which states that the entropy of an isolated system cannot decrease—together with the definition of thermodynamic temperature. For, if the number of possible logical states of a computation were to decrease as the computation proceeded forward (logical irreversibility), this would constitute a forbidden decrease of entropy, unless the number of possible physical states corresponding to each logical state were to simultaneously increase by at least a compensating amount, so that the total number of possible physical states was no smaller than it was originally (i.e. total entropy has not decreased).

Yet, an increase in the number of physical states corresponding to each logical state means that, for an observer who is keeping track of the logical state of the system but not the physical state (for example an "observer" consisting of the computer itself), the number of possible physical states has increased; in other words, entropy has increased from the point of view of this observer.

The maximum entropy of a bounded physical system is finite. (If the holographic principle is correct, then physical systems with finite surface area have a finite maximum entropy; but regardless of the truth of the holographic principle, quantum field theory dictates that the entropy of systems with finite radius and energy is finite due to the Bekenstein bound.) To avoid reaching this maximum over the course of an extended computation, entropy must eventually be expelled to an outside environment.

Landauer's principle asserts that there is a minimum possible amount of energy required to erase one bit of information, known as the Landauer limit:

${\displaystyle E=k_{\text{B}}T\ln 2}$

where ${\displaystyle k_{\text{B}}}$ is the Boltzmann constant (approximately 1.38×10⁻²³ J/K), ${\displaystyle T}$ is the temperature of the heat sink in kelvins, and ${\displaystyle \ln 2}$ is the natural logarithm of 2 (approximately 0.69315). After setting T equal to room temperature 20 °C (293.15 K), we can get the Landauer limit of 0.0175 eV (2.805 zJ) per bit erased.

For an environment at temperature T, energy E = ST must be emitted into that environment if the amount of added entropy is S. For a computational operation in which 1 bit of logical information is lost, the amount of entropy generated is at least k_B ln 2, and so, the energy that must eventually be emitted to the environment is E ≥ k_BT ln 2.

The principle is widely accepted as physical law, but in recent years it has been challenged for using circular reasoning and faulty assumptions, notably in Earman and Norton (1998), and subsequently in Shenker (2000)[11] and Norton (2004,[12] 2011[13]), and defended by Bennett (2003)[1] and Ladyman et al. (2007).[14]

On the other hand, recent advances in non-equilibrium statistical physics have established that there is no a priori relationship between logical and thermodynamic reversibility.[15] It is possible that a physical process is logically reversible but thermodynamically irreversible. It is also possible that a physical process is logically irreversible but thermodynamically reversible. At best, the benefits of implementing a computation with a logically reversible systems are nuanced.[16]

In 2016, researchers at the University of Perugia claimed to have demonstrated a violation of Landauer’s principle.[17] However, according to Laszlo Kish (2016),[18] their results are invalid because they "neglect the dominant source of energy dissipation, namely, the charging energy of the capacitance of the input electrode".

• Margolus–Levitin theorem
• Bremermann's limit
• Bekenstein bound
• Kolmogorov complexity
• Entropy in thermodynamics and information theory
• Information theory
• Jarzynski equality
• Limits to computation
• Extended mind thesis
• Maxwell's demon
• Koomey's Law

• Prokopenko, Mikhail; Lizier, Joseph T. (2014), "Transfer entropy and transient limits of computation", Scientific Reports, 4: 5394, Bibcode:2014NatSR...4E5394P, doi:10.1038/srep05394, PMC 4066251, PMID 24953547

• Public debate on the validity of Landauer's principle (conference Hot Topics in Physical Informatics, November 12, 2013)
• Introductory article on Landauer's principle and reversible computing
• Maroney, O.J.E. "Information Processing and Thermodynamic Entropy" The Stanford Encyclopedia of Philosophy.
• Eurekalert.org: "Magnetic memory and logic could achieve ultimate energy efficiency", July 1, 2011