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Physical information refers generally to the information that is contained in a physical system.
Senses of the word "information" For our purposes in this article, information itself may be loosely defined as "that which can distinguish one thing from another." The information embodied by a thing can thus be said to be the identity of the particular thing itself, that is, all of its properties, all that makes it distinct from other (real or potential) things. It is a complete description of the thing, but in a sense that is divorced from any particular language. We might even consider the sum total of the information in a thing to be the ideal essence of the thing itself, i.e. its form in the sense of Plato's eidos (The Forms). Information as a concept bears a diversity of meanings, from everyday usage to technical settings. ...
Plato ( Greek: Πλάτων, PlátÅn, wide, broad-shouldered) (c. ...
Plato spoke of forms (sometimes capitalized: The Forms) in formulating his solution to the problem of universals. ...
When clarifying the subject of information, we should take care to distinguish between the following specific usages that are related to the word.
- We will use the phrase instance of information to refer to the specific instantiation of information (identity, form, essence) that is associated with the being of a particular example of a thing. (This will enable us to refer, e.g., to separate instances of information that happen to share identical patterns.)
- A variable or mutable instance that can have different forms at different times (or in different situations) will be called a holder of information.
- A piece of information is a particular fact about a thing's identity or properties, i.e., a portion of its instance.
- A pattern of information (or form) is the pattern or content of an instance or piece of information. Many separate pieces of information may share the same form. We can say that those pieces are perfectly correlated or say that they are copies of each other, as in copies of a book.
- An embodiment of information is the thing whose essence is a given instance of information.
- A representation of information is an encoding of some pattern of information within some other pattern or instance.
- An interpretation of information is a decoding of a pattern of information as being a representation of another specific pattern or fact.
- A subject of information is the thing that is identified or described by a given instance or piece of information. (Most generally, a thing that is a subject of information could be either abstract or concrete; either mathematical or physical.)
- An amount of information is a quantification of how large a given instance, piece, or pattern of information is, or how much of a given system's information content (its instance) has a given attribute, such as being known or unknown. As we will see, amounts of information are most naturally characterized in logarithmic units.
The above usages are clearly all conceptually distinct from each other. However, many people insist on overloading the word "information" (by itself) to denote (or connote) multiple of these concepts simultaneously. Since this may lead to confusion, we recommend instead using more detailed phrases (such as those shown in bold above) whenever the intended meaning is not made clear by the context.
Classical versus quantum information The instance of information that is contained in a physical system is generally considered to specify that system's "true" state. (In many pratical situations, a system's true state may be largely unknown, but a realist would insist that a physical system regardless always has, in principle, a true state of some sort--whether classical or quantum.)
When discussing the information that is contained in physical systems according to modern quantum physics, we must distinguish between classical information and quantum information. Quantum information specifies the complete quantum state vector (or equivalently, wavefunction) of a system, whereas classical information, roughly speaking, only picks out a definite (pure) quantum state if we are already given a prespecified set of distinguishable (orthogonal) quantum states to choose from; such a set forms a basis for the vector space of all the possible pure quantum states (see pure state). Quantum information could thus be expressed by providing (1) a choice of a basis such that the actual quantum state is equal to one of the basis vectors, together with (2) the classical information specifying which of these basis vectors is the actual one. (However, the quantum information by itself does not include a specification of the basis, indeed, an uncountable number of different bases will include any given state vector.) Fig. ...
In quantum mechanics, quantum information is physical information that is held in the state of a quantum system. ...
Vector spaces (or linear spaces) are spaces whose elements, known as vectors, can be scaled and added; all linear combinations can be formed. ...
The term pure state refers to several related concepts in physics, particularly quantum mechanics and in functional analysis. ...
Note that the amount of classical information in a quantum system gives the maximum amount of information that can actually be measured and extracted from that quantum system for use by external classical (decoherent) systems, since only basis states are operationally distinguishable from each other. The impossibility of differentiating between non-orthogonal states is a fundamental principle of quantum mechanics, equivalent to Heisenberg's uncertainty principle. Because of its more general utility, the remainder of this article will deal primarily with classical information, although quantum information theory does also have some potential applications (quantum computing, quantum cryptography, quantum teleportation) that are currently being actively explored by both theoreticians and experimentalists [1]. Werner Heisenberg Werner Karl Heisenberg (December 5, 1901 – February 1, 1976) was a celebrated German physicist and Nobel laureate, one of the founders of quantum mechanics. ...
In quantum physics, the Heisenberg uncertainty principle or just Uncertainty principle (sometimes also the Heisenberg indeterminacy principle - a name given to it by Niels Bohr) states that one cannot measure values (with arbitrary precision) of certain conjugate quantities, which are pairs of observables of a single elementary particle. ...
Molecule of alanine used in NMR implementation of error correction. ...
Quantum cryptography is an approach based on quantum physics for secure communications. ...
To meet Wikipedias quality standards, this article may require cleanup. ...
Quantifying classical physical information An amount of (classical) physical information may be quantified, as in information theory, as follows [2]. For a system S, defined abstractly in such a way that it has N distinguishable states (orthogonal quantum states) that are consistent with its description, the amount of information I(S) contained in the system's state can be said to be log(N). The logarithm is selected for this definition since it has the advantage that this measure of information content is additive when concatenating independent, unrelated subsystems; e.g., if subsystem A has N distinguishable states (I(A) = log(N) information content) and an independent subsystem B has M distinguishable states (I(B) = log(M) information content), then the concatenated system has NM distinguishable states and an information content I(AB) = log(NM) = log(N) + log(M) = I(A) + I(B). We expect information to be additive from our everyday associations with the meaning of the word, e.g., that two pages of a book can contain twice as much information as one page. To meet Wikipedias quality standards, this article or section may require cleanup. ...
The base of the logarithm used in this definition is arbitrary, since it affects the result by only a multiplicative constant, which determines the unit of information that is implied. If the log is taken base 2, the unit of information is the binary digit or bit (so named by John Tukey); if we use a natural logarithm instead, we might call the resulting unit the "nat." In magnitude, a nat is apparently identical to Boltzmann's constant k or the ideal gas constant R, although these particular quantities are usually reserved to measure physical information that happens to be entropy, and that are expressed in physical units such as joules per kelvin, or kilocalories per mole-kelvin. John Wilder Tukey (June 16, 1915 - July 26, 2000) was a statistician. ...
The Boltzmann constant (k or kB) is the physical constant relating temperature to energy. ...
Molar gas constant (also known as universal gas constant, usually denoted by symbol R) is the constant occurring in the universal gas equation, i. ...
Physical information and entropy An easy way to understand the underlying unity between physical (as in thermodynamic) entropy and information-theoretic entropy is as follows: Entropy is simply that portion of the (classical) physical information contained in a system of interest (whether it is an entire physical system, or just a subsystem delineated by a set of possible messages) whose identity (as opposed to amount) is unknown (from the point of view of a particular knower). This informal characterization corresponds to both von Neumann's formal definition of the entropy of a mixed quantum state (which is just a statistical mixture of pure states; see von Neumann entropy), as well as Claude Shannon's definition of the entropy of a probability distribution over classical signal states or messages (see information entropy) [2]. Incidentally, the credit for Shannon's entropy formula (though not for its use in an information theory context) really belongs to Boltzmann, who derived it much earlier for use in his H-theorem of statistical mechanics [6]. (Shannon himself references Boltzmann in his monograph [7].) Ice melting - a classic example of entropy increasing In thermodynamics, thermodynamic entropy (or simply entropy) is an important state function of a thermodynamic system: that is, a property depending only on the current state of the system, independent of how that state came to be achieved. ...
Quantum statistical mechanics is the study of statistical ensembles of quantum mechanical systems. ...
Claude Elwood Shannon (April 30, 1916 _ February 24, 2001) has been called the father of information theory, and was the founder of practical digital circuit design theory. ...
In mathematics, a probability distribution assigns to every interval of the real numbers a probability, so that the probability axioms are satisfied. ...
Entropy of a Bernoulli trial as a function of success probability. ...
To meet Wikipedias quality standards, this article or section may require cleanup. ...
Ludwig Boltzmann Ludwig Boltzmann (February 20, 1844 – September 5, Austrian physicist famous for the invention of statistical mechanics. ...
In thermodynamics, the H-theorem describes the increase of entropy of an ideal gas in an irreversible process, solving the Boltzmann equation. ...
Furthermore, even when the state of a system is known, we can say that the information in the system is still effectively entropy if that information is effectively incompressible, that is, if there are no known or feasibly determinable correlations or redundancies between different pieces of information within the system. Note that this definition of entropy can even be viewed as equivalent to the previous one (unknown information) if we take a meta-perspective, and say that for observer A to "know" the state of system B means simply that there is a definite correlation between the state of observer A and the state of system B; this correlation could thus be used by a meta-observer (that is, whoever is discussing the overall situation regarding A's state of knowledge about B) to compress his own description of the joint system AB [3].
Due to this connection with algorithmic information theory, entropy can be said to be that portion of a system's information capacity which is "used up," that is, unavailable for storing new information (even if the existing information content were to be compressed). The rest of a system's information capacity (aside from its entropy) might be called extropy, and it represents the part of the system's information capacity which is potentially still available for storing newly derived information. The fact that physical entropy is basically "used-up storage capacity" is a direct concern in the engineering of computing systems; e.g., a computer must first remove the entropy from a given physical subsystem (eventually expelling it to the environment, and emitting heat) in order for that subsystem to be used to store some newly computed information. In computer science, algorithmic information theory is a field of study which attempts to define the complexity (aka descriptive complexity, Kolmogorov complexity, Kolmogorov-Chaitin complexity, or algorithmic entropy) of a string as the length of the shortest binary program which outputs that string. ...
Extreme physical information An alternative form of physical information is defined to be the loss of Fisher information that is incurred during the observation of a physical effect. If the effect has an intrinsic information level J, and is observed with information level I, then the physical information is defined to be the difference I − J. Mathematically extremizing I − J by variation of the system probability amplitudes is called the principle of extreme physical information or EPI. The solution is the set of amplitudes that define the system. EPI is a general approach to physics [8],[9]. In statistics and information theory, the Fisher information (denoted ) is the variance of the score. ...
Extreme physical information (EPI) is a principle, discovered by B. Roy Frieden, for discovering scientific laws taking the form of differential equations and probability distribution functions. ...
See also Information as a concept bears a diversity of meanings, from everyday usage to technical settings. ...
Ice melting - a classic example of entropy increasing In thermodynamics, thermodynamic entropy (or simply entropy) is an important state function of a thermodynamic system: that is, a property depending only on the current state of the system, independent of how that state came to be achieved. ...
Entropy of a Bernoulli trial as a function of success probability. ...
// Introduction Gain in entropy always means loss of information, and nothing more (G. N. Lewis, 1930). ...
Logarithmic units are generic mathematical units in which we can express any quantities (physical or mathematical) that are defined as being proportional to values of a logarithm function. ...
A logarithmic scale is a scale of measurement that uses the logarithm of a physical quantity instead of the quantity itself. ...
The term reversible computing refers to any computational process that is (at least to some close approximation) reversible, i. ...
References - Michael A. Nielsen and Isaac L. Chuang, Quantum Computation and Quantum Information, Cambridge University Press, 2000.
- Michael P. Frank, "Physical Limits of Computing", Computing in Science and Engineering, 4(3):16-25, May/June 2002. http://www.cise.ufl.edu/research/revcomp/physlim/plpaper.html.
- W. H. Zurek, "Algorithmic randomness, physical entropy, measurements, and the demon of choice," in [4], pp. 393-410, and reprinted in [5], pp. 264-281.
- J. G. Hey, ed., Feynman and Computation: Exploring the Limits of Computers, Perseus, 1999.
- Harvey S. Leff and Andrew F. Rex, Maxwell's Demon 2: Entropy, Classical and Quantum Information, Computing, Institute of Physics Publishing, 2003.
- Carlo Cercignani, Ludwig Boltzmann: The Man Who Trusted Atoms, Oxford University Press, 1998.
- Claude E. Shannon and Warren Weaver, Mathematical Theory of Communication, University of Illinois Press, 1963.
- B. R. Frieden and B. H. Soffer, "Lagrangians of physics and the game of Fisher-information transfer," Phys. Rev. E 52, 2274-2286, 1995.
- B. Roy Frieden, Science from Fisher Information, Cambridge University Press, 2004.
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