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Mathematical study of linear operators
mathematics, operator theory is the study of linear operators on function spaces, beginning with differential operators and integral operators. The operators may
Operator_theory
In operator theory, a dilation of an operator is the presentation of an operator as a compression of another operator which is functioning under proper
Dilation_(operator_theory)
Quantum operator for the sum of energies of a system
In quantum mechanics, the Hamiltonian of a system is an operator corresponding to the total energy of that system, including both kinetic energy and potential
Hamiltonian (quantum mechanics)
Hamiltonian_(quantum_mechanics)
Type of continuous linear operator
convergent subsequences. Compact operators first arose in the theory of integral equations, where many integral operators have compactness properties. They
Compact_operator
Collection of mathematical theories
their generalizations. The theory is connected to that of analytic functions because the spectral properties of an operator are related to analytic functions
Spectral_theory
Linear operator in mathematics
left-adjoint of the transfer operator of Frobenius–Perron. Using the language of category theory, the composition operator is a pull-back on the space
Composition_operator
Branch of functional analysis
generalization of spectral theory of a single operator. In general, operator algebras are non-commutative rings. An operator algebra is typically required
Operator_algebra
Theory in functional analysis
compact operators. The reader will see that most statements transfer verbatim from the matrix case. The spectral theory of compact operators was first
Spectral theory of compact operators
Spectral_theory_of_compact_operators
Type of vector space in math
pseudodifferential operators. The spectral theory of unbounded self-adjoint operators is only marginally more difficult than for bounded operators. The spectrum
Hilbert_space
Bounded operators with sub-unit norm
In operator theory, a bounded operator T: X → Y between normed vector spaces X and Y is said to be a contraction if its operator norm ||T || ≤ 1. Every
Contraction_(operator_theory)
Matrix whose only nonzero elements are on its main diagonal
entries. In operator theory, particularly the study of PDEs, operators are particularly easy to understand and PDEs easy to solve if the operator is diagonal
Diagonal_matrix
Conjugate transpose of an operator in infinite dimensions
specifically in operator theory, each linear operator A {\displaystyle A} on an inner product space defines a Hermitian adjoint (or adjoint) operator A ∗ {\displaystyle
Hermitian_adjoint
Kind of linear transformation
In functional analysis and operator theory, a bounded linear operator is a special kind of linear transformation that is particularly important in infinite
Bounded_operator
Operators useful in quantum mechanics
and annihilation operators can act on states of various types of particles. For example, in quantum chemistry and many-body theory the creation and annihilation
Creation and annihilation operators
Creation_and_annihilation_operators
Linear operator equal to its own adjoint
In mathematics, a self-adjoint operator on a complex vector space V {\displaystyle V} with inner product ⟨ ⋅ , ⋅ ⟩ {\displaystyle \langle \cdot ,\cdot
Self-adjoint_operator
Linear operator
Hessenberg matrices for the Bergman shift operator on Jordan regions". Complex Analysis and Operator Theory. 8 (1): 1–24. arXiv:1205.4183. doi:10.1007/s11785-012-0252-8
Jacobi_operator
Function acting on function spaces
the standard operator norm. The theory of Banach algebras develops a very general concept of spectra that elegantly generalizes the theory of eigenspaces
Operator_(mathematics)
Measure of the "size" of linear operators
mathematics, the operator norm measures the "size" of certain linear operators by assigning each a real number called its operator norm. Formally, it
Operator_norm
Function acting on the space of physical states in physics
classical mechanics. Operators are even more important in quantum mechanics, where they form an intrinsic part of the formulation of the theory. They play a central
Operator_(physics)
Linear operator scaling by a fixed function
In operator theory, a multiplication operator is a linear operator Tf defined on some vector space of functions and whose value at a function φ is given
Multiplication_operator
Bounded linear operator
of functional analysis and operator theory, the Volterra operator, named after Vito Volterra, is a bounded linear operator on the space L2[0,1] of complex-valued
Volterra_operator
Concept in theoretical physics
be assigned to special values, known as a "fixed point", where the field theory is conformally invariant and any running couplings cease to change. In particle
Renormalization_group
(on a complex Hilbert space) continuous linear operator
Subnormal operators Continuous linear operator – Function between topological vector spaces Contraction (operator theory) – Bounded operators with sub-unit
Normal_operator
mathematics, operator K-theory is a noncommutative analogue of topological K-theory for Banach algebras with most applications used for C*-algebras. Operator K-theory
Operator_K-theory
Branch of mathematics that studies abstract algebraic structures
module theory, analytic number theory, differential geometry, operator theory, algebraic combinatorics and topology. The success of representation theory has
Representation_theory
Theory of subatomic structure
Fubini introduced an operator formalism for computing the scattering amplitudes that was a forerunner of world-sheet conformal theory, while Virasoro understood
String_theory
Mathematical theory of integral equations
theory is given in terms of the spectral theory of Fredholm operators and Fredholm kernels on Hilbert space. It therefore forms a branch of operator theory
Fredholm_theory
French mathematician
analysis, probability theory, harmonic analysis, and operator theory. He has also made fundamental contributions to the theory of C*-algebras. Gilles
Gilles_Pisier
Integral Equations and Operator Theory is a journal dedicated to operator theory and its applications to engineering and other mathematical sciences.
Integral Equations and Operator Theory
Integral_Equations_and_Operator_Theory
Mathematical method in calculus
integration by parts in operator theory is that it shows that the −∆ (where ∆ is the Laplace operator) is a positive operator on L 2 {\displaystyle L^{2}}
Integration_by_parts
Result about when a matrix can be diagonalized
also spectral theory for a historical perspective. Examples of operators to which the spectral theorem applies are self-adjoint operators or more generally
Spectral_theorem
Mathematics Journal
Advances in Operator Theory is a peer-reviewed scientific journal established in 2016 by Mohammad Sal Moslehian and published by Birkhäuser on behalf
Advances_in_Operator_Theory
Type of differential operator
pseudo-differential operator is an extension of the concept of differential operator. Pseudo-differential operators are used extensively in the theory of partial
Pseudo-differential_operator
Mathematical operator
finite}}\right\}.} In the theory of partially ordered sets, which are important in theoretical computer science, closure operators have a more general definition
Closure_operator
Typically linear operator defined in terms of differentiation of functions
In mathematics, a differential operator is an operator defined as a function of the differentiation operator. It is helpful, as a matter of notation first
Differential_operator
In mathematics, Jordan operator algebras are real or complex Jordan algebras with the compatible structure of a Banach space. When the coefficients are
Jordan_operator_algebra
Class of ordinary differential equations
differential operator in an appropriate Hilbert space of functions with inner product defined using the weight function. Sturm–Liouville theory studies the
Sturm–Liouville_theory
a positive operator, whereas Δ is a dissipative operator. Using spectral theory, one can define a square root (1 − Δ)1/2 for the operator (1 − Δ). This
Ornstein–Uhlenbeck_operator
Part of Fredholm theories in integral equations
In mathematics, Fredholm operators are certain operators that arise in the Fredholm theory of integral equations. They are named in honour of Erik Ivar
Fredholm_operator
Functional analysis concept
finite-rank operators (representable by finite-dimensional matrices) in the topology induced by the operator norm. As such, results from matrix theory can sometimes
Compact operator on Hilbert space
Compact_operator_on_Hilbert_space
Methods of mathematical approximation
very beginning and never specifies a perturbation operator as such. Møller–Plesset perturbation theory uses the difference between the Hartree–Fock Hamiltonian
Perturbation_theory
Workshop on Operator Theory and its Applications (IWOTA) was started in 1981 to bring together mathematicians and engineers working in operator theoretic
International Workshop on Operator Theory and its Applications
International_Workshop_on_Operator_Theory_and_its_Applications
Schatten-class operator is a bounded linear operator on a Hilbert space with finite pth Schatten norm. The space of pth Schatten-class operators is a Banach
Schatten_class_operator
theorem (operator theory) Bauer–Fike theorem (spectral theory) Bounded inverse theorem (operator theory) Browder–Minty theorem (operator theory) Choi's
List_of_theorems
Matrices similar to diagonal matrices
First-order perturbation theory also leads to matrix eigenvalue problem for degenerate states. Matrices can be generalized to linear operators. A diagonal matrix
Diagonalizable_matrix
Differential operator in mathematics
In mathematics, the Laplace operator or Laplacian is a differential operator given by the divergence of the gradient of a scalar function on Euclidean
Laplace_operator
Linear operator defined on a dense linear subspace
functional analysis and operator theory, the notion of unbounded operator provides an abstract framework for dealing with differential operators, unbounded observables
Unbounded_operator
Operator encoding information about iterated map
h(x)=1/x-\lfloor 1/x\rfloor } is called the Gauss–Kuzmin–Wirsing (GKW) operator. The theory of the GKW dates back to a hypothesis by Gauss on continued fractions
Transfer_operator
Linear mathematical operator which translates a function
particular functional analysis, the shift operator, also known as the translation operator, is an operator that takes a function x ↦ f(x) to its translation
Shift_operator
Mathematical inequality relating inner products and norms
linear operator on a Banach space (Namely, when the space is a Hilbert space). Further generalizations are in the context of operator theory, e.g. for
Cauchy–Schwarz_inequality
In operator theory, a Toeplitz operator is the compression of a multiplication operator on the circle to the Hardy space. Let S 1 {\displaystyle S^{1}}
Toeplitz_operator
In mathematics, Nemytskii operators are a class of nonlinear operators on Lp spaces with good continuity and boundedness properties. They take their name
Nemytskii_operator
Mathematical method in functional analysis
self-adjoint) and densely defined operator called the modular operator. The main result of Tomita–Takesaki theory states that: Δ i t M Δ − i t = M {\displaystyle
Tomita–Takesaki_theory
Analog of the continuous Laplace operator
In mathematics, the discrete Laplace operator is an analog of the continuous Laplace operator, defined so that it has meaning on a graph or a discrete
Discrete_Laplace_operator
Self-self morphism
such operators can have properties like continuity, boundedness, and so on. More details should be found in the article about operator theory. An endofunction
Endomorphism
Function between topological vector spaces
continuous linear operator or continuous linear mapping is a continuous linear transformation between topological vector spaces. An operator between two normed
Continuous_linear_operator
differential operators. Spectral graph theory the study of properties of a graph using methods from matrix theory. Spectral theory part of operator theory extending
Glossary of areas of mathematics
Glossary_of_areas_of_mathematics
Space Theory. Cambridge University Press. p. 1. ISBN 978-0-521-81165-1. Retrieved 2008-12-18. Blecher, David P.; Christian Le Merdy (2004). Operator Algebras
Operator_space
Quantum field theory enjoying conformal symmetry
conformal field theory Operator product expansion Primary field Superconformal algebra Paul Ginsparg (1989), Applied Conformal Field Theory. arXiv:hep-th/9108028
Conformal_field_theory
Physical theory with fields invariant under the action of local "gauge" Lie groups
{\displaystyle {\mathcal {P}}} represents the path-ordered operator. The formalism of gauge theory carries over to a general setting. For example, it is sufficient
Gauge_theory
Operator on a Hilbert space that shifts basis vectors
In operator theory, the unilateral shift is a one-sided shift operator, that is, a shift operator acting on one-sided sequences or shift spaces. The term
Unilateral_shift_operator
affiliated operators were introduced by Murray and von Neumann in the theory of von Neumann algebras as a technique for using unbounded operators to study
Affiliated_operator
are closely related to operator concave and operator convex functions, and are encountered in operator theory and in matrix theory, and led to the Löwner–Heinz
Operator_monotone_function
In mathematics, a linear operator acting on inner product space
mathematics (specifically linear algebra, operator theory, and functional analysis) as well as physics, a linear operator A {\displaystyle A} acting on an inner
Positive_operator
In operator theory, a bounded operator T on a Banach space is said to be nilpotent if Tn = 0 for some positive integer n. It is said to be quasinilpotent
Nilpotent_operator
Surjective bounded operator on a Hilbert space preserving the inner product
In functional analysis, a unitary operator is a surjective bounded operator on a Hilbert space that preserves the inner product. Non-trivial examples
Unitary_operator
Topic in mathematics
In mathematics, a Hilbert–Schmidt operator, named after David Hilbert and Erhard Schmidt, is a bounded operator A : H → H {\displaystyle A\colon H\to
Hilbert–Schmidt_operator
*-algebra of bounded operators on a Hilbert space
John von Neumann, motivated by his study of single operators, group representations, ergodic theory and quantum mechanics. His double commutant theorem
Von_Neumann_algebra
linear operator Continuous linear extension Compact operator Approximation property Invariant subspace Spectral theory Spectrum of an operator Essential
List of functional analysis topics
List_of_functional_analysis_topics
South African mathematician
August 1979) was a South African mathematician who worked in operator theory, transform theory, thermodynamics, functional analysis and differential equations
Lionel_Cooper_(mathematician)
the application of operator theory to quantum mechanics in the development of functional analysis, the development of game theory and the concepts of
List of scientific publications by John von Neumann
List_of_scientific_publications_by_John_von_Neumann
Study of abstract machines and automata
Automata theory is the study of abstract machines and automata, as well as the computational problems that can be solved using them. It is a theory in theoretical
Automata_theory
Mathematical approach to quantum physics
perturbation theory is also organized inside this time-dependent perturbation theory Dyson series. To see this, write the unitary evolution operator, obtained
Perturbation theory (quantum mechanics)
Perturbation_theory_(quantum_mechanics)
In probability theory and ergodic theory, a Markov operator is an operator on a certain function space that conserves the mass (the so-called Markov property)
Markov_operator
Boundary condition for generalized functions
In mathematical analysis, the trace operator extends the notion of the restriction of a function to the boundary of its domain to "generalized" functions
Trace_operator
especially operator theory, subnormal operators are bounded operators on a Hilbert space defined by weakening the requirements for normal operators. Some examples
Subnormal_operator
Supposition or system of ideas intended to explain something
Measure theory — Model theory — Module theory — Morse theory — Nevanlinna theory — Number theory — Obstruction theory — Operator theory — Order theory — PCF
Theory
Branch of mathematics concerning probability
Probability theory or probability calculus is the branch of mathematics concerned with probability. Although there are several different probability interpretations
Probability_theory
Area of mathematics
analysis called operator theory; see also the spectral measure. There is also an analogous spectral theorem for bounded normal operators on Hilbert spaces
Functional_analysis
Group of open reading frames under the same regulation
of DNA called an operator. All the structural genes of an operon are turned ON or OFF together, due to a single promoter and operator upstream to them
Operon
Distance between linear operators
work on invertibility of differential operators. The gap metric has since found applications in perturbation theory, robust control, and feedback system
Gap_metric
Identifies the commutant of a specific von Neumann algebra
Neumann algebra of all bounded operators on H. The third class of examples combines the above two. Coming from ergodic theory, it was one of von Neumann's
Commutation theorem for traces
Commutation_theorem_for_traces
Romanian mathematician
has worked in single operator theory, operator K-theory and von Neumann algebras. More recently, he developed free probability theory. Voiculescu studied
Dan-Virgil_Voiculescu
Topics referred to by the same term
Look up operator in Wiktionary, the free dictionary. Operator may refer to: A symbol indicating a mathematical operation Logical operator or logical connective
Operator
domain in the plane with smooth boundary. The methods use the theory of bounded operators on Hilbert space. They can be used to deduce regularity properties
Sobolev spaces for planar domains
Sobolev_spaces_for_planar_domains
Mathematical result in differential geometry
defines abstract elliptic operators on arbitrary metric spaces. Abstract elliptic operators became protagonists in Kasparov's theory and Connes's noncommutative
Atiyah–Singer_index_theorem
In operator theory, Naimark's dilation theorem is a result that characterizes positive operator valued measures. It is named after Mark Naimark from his
Naimark's_dilation_theorem
Type o integral transform in mathematics
In mathematics, a Hilbert–Schmidt integral operator is a type of integral transform. Specifically, given a domain Ω in Rn, any k : Ω × Ω → C such that
Hilbert–Schmidt integral operator
Hilbert–Schmidt_integral_operator
Function reducing distance between all points
Analysis and Monotone Operator Theory in Hilbert Spaces. New York: Springer. Combettes, Patrick L. (July 2018). "Monotone operator theory in convex optimization"
Contraction_mapping
Type of function in linear algebra
missing publisher (link) Kubrusly, Carlos S. (2011). The Elements of Operator Theory (Second ed.). Boston: Birkhäuser. ISBN 978-0-8176-4998-2. OCLC 710154895
Sublinear_function
Mathematical conjecture about the Riemann zeta function
eigenvalues of a self-adjoint operator. It is a possible approach to the Riemann hypothesis, by means of spectral theory. In a letter to Andrew Odlyzko
Hilbert–Pólya_conjecture
Linear operator whose graph is closed
branch of mathematics, a closed linear operator or often a closed operator is a partially defined linear operator whose graph is closed (see closed graph
Closed_linear_operator
American mathematician (1927–1989)
American mathematician who worked on measure theory, complex analysis, functional analysis and operator theory, and was "one of the world's leading authorities
Allen_Shields
Obstruction theory Operator theory Order theory Percolation theory Perturbation theory Probability theory Proof theory Queue theory Ramsey theory Random matrix
List_of_mathematical_theories
Swedish mathematician (1866–1927)
Swedish mathematician whose work on integral equations and operator theory foreshadowed the theory of Hilbert spaces. Fredholm was born in Stockholm in 1866
Erik_Ivar_Fredholm
Physical quantities taking values at each point in space and time
depending on whether it is characterized by numbers or quantum operators respectively. In this theory an equivalent representation of field is a field particle
Field_(physics)
Part of spectral theory
generalized the classical Sturm–Liouville theory on a finite closed interval to second order differential operators with singularities at the endpoints of
Spectral theory of ordinary differential equations
Spectral_theory_of_ordinary_differential_equations
Multiple interactions and regulation of life forms with their environment
to be basically similar for both types of systems. Gerard Jagers' operator theory proposes that life is a general term for the presence of the typical
Living_systems
In mathematics, a dissipative operator is a linear operator A defined on a linear subspace D(A) of Banach space X, taking values in X such that for all
Dissipative_operator
Mathematical norm
Watrous, Theory of Quantum Information, 2.3 Norms of operators, lecture notes, University of Waterloo, 2011. Joachim Weidmann, Linear operators in Hilbert
Schatten_norm
OPERATOR THEORY
OPERATOR THEORY
Boy/Male
Hindu, Indian, Kannada, Marathi, Tamil, Telugu
Orator
Boy/Male
Arabic, Indian, Muslim
Orator; Preacher
Boy/Male
Hindu, Indian, Malayalam, Marathi
Great Orator
Girl/Female
Arabic
Orator; Preacher
Girl/Female
Biblical
An orator, a word.
Girl/Female
Assamese, Hindu, Indian, Tamil
Magnificent Poetess; Orator
Boy/Male
Arabic
Orator; Speaker
Boy/Male
Hindu
Great orator
Boy/Male
Muslim/Islamic
Orator Preacher
Boy/Male
Arabic
Orator; Speaker
Boy/Male
Arabic, Muslim
Orator; Preacher
Girl/Female
Arabic
Orator; Preacher
Boy/Male
Muslim
Orator, Preacher, Religious minister
Boy/Male
Tamil
Vakpati | வாகà¯à®ªà®¤à®¿
Great orator
Vakpati | வாகà¯à®ªà®¤à®¿
Girl/Female
Hindu, Indian, Sindhi, Tamil
Magnificent Poetess; Orator
Biblical
an orator
Boy/Male
Biblical
An orator.
Boy/Male
Muslim
Orator, Preacher, Religious minister
Boy/Male
Tamil
Orator
Girl/Female
Biblical
An orator, an interpreter.
OPERATOR THEORY
OPERATOR THEORY
Boy/Male
Tamil
Honored, Desired, Liked
Girl/Female
Arabic
Leader
Boy/Male
Teutonic
warrior.
Girl/Female
Bengali, Hindu, Indian, Kannada, Malayalam, Marathi, Sanskrit, Sindhi, Telugu
Giving Gifts
Girl/Female
Latin
Glory.
Girl/Female
Tamil
Sweet heart, To live
Boy/Male
Gujarati, Hindu, Indian, Kannada, Malayalam, Marathi, Tamil, Telugu
Wise
Girl/Female
Hindu, Indian
The Gods Ornament
Girl/Female
American, British, English
Secret; Blend of Ken and Sandra or Andrea
Female
Chinese
black jade.
OPERATOR THEORY
OPERATOR THEORY
OPERATOR THEORY
OPERATOR THEORY
OPERATOR THEORY
n.
One fond of his own opinious; one who holds an opinion.
v. t.
To put into, or to continue in, operation or activity; to work; as, to operate a machine.
n.
The act or process of operating; agency; the exertion of power, physical, mechanical, or moral.
n.
Something to be done; some transformation to be made upon quantities, the transformation being indicated either by rules or symbols.
n.
Any methodical action of the hand, or of the hand with instruments, on the human body, to produce a curative or remedial effect, as in amputation, etc.
a.
Alt. of Operatical
n.
An officer who is the voice of the university upon all public occasions, who writes, reads, and records all letters of a public nature, presents, with an appropriate address, those persons on whom honorary degrees are to be conferred, and performs other like duties; -- called also public orator.
imp. & p. p.
of Operate
n.
One who, or that which, operates or produces an effect.
n.
That which is operated or accomplished; an effect brought about in accordance with a definite plan; as, military or naval operations.
n.
In the University of Oxford, an examiner for moderations; at Cambridge, the superintendant of examinations for degrees; at Dublin, either the first (senior) or second (junior) in rank in an examination for the degree of Bachelor of Arts.
n.
Effect produced; influence.
n.
The symbol that expresses the operation to be performed; -- called also facient.
n.
The officer who presides over an assembly to preserve order, propose questions, regulate the proceedings, and declare the votes.
n.
A mechamical arrangement for regulating motion in a machine, or producing equality of effect.
n.
A laboratory.
n.
A dealer in stocks or any commodity for speculative purposes; a speculator.
n.
The method of working; mode of action.
n.
One who performs some act upon the human body by means of the hand, or with instruments.
n.
Operation.