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Algebraic construct of interest in theoretical physics
term quantum group denotes one of a few different kinds of noncommutative algebras with additional structure. These include Drinfeld–Jimbo type quantum groups
Quantum_group
Houston, Texas-based private equity firm
Quantum Capital Group, previously known as Quantum Energy Partners, is a Houston, Texas-based private equity firm focused on the energy industry. The company
Quantum_Capital_Group
American private investment firm
Hong Kong Office. Soros Fund Management is the primary adviser for the Quantum Group of Funds; a family of funds in international investments. The company
Soros_Fund_Management
Concept in theoretical mathematical physics
In mathematical physics, the concept of quantum spacetime is a generalization of the usual concept of spacetime in which some variables that ordinarily
Quantum_spacetime
Abstract structure in mathematics
In mathematics, compact quantum groups are generalisations of compact groups, where the commutative C ∗ {\displaystyle \mathrm {C} ^{*}} -algebra of continuous
Compact_quantum_group
Physical theory with fields invariant under the action of local "gauge" Lie groups
symmetry group on the isospin doublet of protons and neutrons. This is similar to the action of the U(1) group on the spinor fields of quantum electrodynamics
Gauge_theory
locally compact quantum group is a C*-algebraic approach toward quantum groups that generalizes the Kac algebra, compact-quantum-group and Hopf-algebra
Locally_compact_quantum_group
Pseudoscience claiming to build on quantum mechanics
Quantum mysticism, sometimes referred to pejoratively as quantum quackery or quantum woo, is a set of metaphysical beliefs and associated practices that
Quantum_mysticism
Concept in theoretical physics
renormalization group emerges from the renormalization of the quantum field variables, which has to address the problem of infinite terms in a quantum field theory
Renormalization_group
mathematical topics in quantum theory, by Wikipedia page. See also list of functional analysis topics, list of Lie group topics, list of quantum-mechanical systems
List of mathematical topics in quantum theory
List_of_mathematical_topics_in_quantum_theory
Physical phenomenon
Quantum teleportation is a technique for transferring quantum information from a sender at one location to a receiver some distance away. While teleportation
Quantum_teleportation
British mathematician and physicist
textbook Foundations of Quantum Group Theory is a standard text still used by researchers today. He also pioneered a quantum groups approach to noncommutative
Shahn_Majid
Networks connecting quantum processors
Quantum networks form an important element of quantum computing and quantum communication systems. Quantum networks facilitate the transmission of information
Quantum_network
Interdisciplinary theory behind quantum computing
Quantum information science is an interdisciplinary field that combines the principles of quantum mechanics, information theory, and computer science
Quantum_information_science
The timeline of quantum mechanics is a list of key events in the history of quantum mechanics, quantum field theories and quantum chemistry. The initiation
Timeline_of_quantum_mechanics
The Centre for Quantum Computation (CQC) is an alliance of quantum information research groups at the University of Oxford. It was founded by Artur Ekert
Centre for Quantum Computation
Centre_for_Quantum_Computation
Duality for locally compact abelian groups
compact quantum groups. One of the drawbacks of these general theories, however, is that in them the objects generalizing the concept of a group are not
Pontryagin_duality
Fringe hypothesis
The quantum mind or quantum consciousness is a group of hypotheses proposing that local physical laws and interactions from classical mechanics or connections
Quantum_mind
Cryptography secured against quantum computers
Post-quantum cryptography (PQC), sometimes referred to as quantum-proof, quantum-safe, or quantum-resistant, is the development of cryptographic algorithms
Post-quantum_cryptography
Physics phenomenon
Quantum entanglement is the phenomenon in which the quantum state of each particle in a group cannot be described independently of the state of the others
Quantum_entanglement
Algebra based on a vector space with a quadratic form
precisely, Clifford algebras may be thought of as quantizations (cf. quantum group) of the exterior algebra, in the same way that the Weyl algebra is a
Clifford_algebra
Algorithm to be run on quantum computers
In quantum computing, a quantum algorithm is an algorithm that runs on a realistic model of quantum computation, the most commonly used model being the
Quantum_algorithm
Sequence of operations for a task
algorithms that seem inherently quantum or use some essential feature of Quantum computing such as quantum superposition or quantum entanglement. Another way
Algorithm
Computer hardware technology that uses quantum mechanics
A quantum computer is a real or theoretical computer that exploits quantum phenomena like superposition and entanglement in an essential way. It is widely
Quantum_computing
Concept in Hopf algebra
In quantum group and Hopf algebra, the bicrossed product is a process to create new Hopf algebras from the given ones. It's motivated by the Zappa–Szép
Bicrossed product of Hopf algebra
Bicrossed_product_of_Hopf_algebra
Theory of subatomic structure
corresponds to the graviton, a quantum mechanical particle that carries the gravitational force. Thus, string theory is a theory of quantum gravity. String theory
String_theory
Category of mathematics papers in ArXiv
noncommutative geometry, and quantum groups within quantum mechanics and quantum field theory. Subjects include: Quantum groups Skein theories Operadic algebra
Quantum_algebra
Computer programming for quantum computers
Quantum programming refers to the process of designing and implementing algorithms that operate on quantum systems, typically using quantum circuits composed
Quantum_programming
Construction in algebra
They have diverse applications ranging from condensed matter physics and quantum field theory to string theory and LHC phenomenology. Let ( H , ∇ , η ,
Hopf_algebra
Statistical model in quantum mechanics of magnetic materials
The quantum Heisenberg model, developed by Werner Heisenberg, is a statistical mechanical model used in the study of critical points and phase transitions
Quantum_Heisenberg_model
In quantum geometry or noncommutative geometry a quantum differential calculus or noncommutative differential structure on an algebra A {\displaystyle
Quantum_differential_calculus
Type of monoidal category
notion of topological invariance. These categories naturally arise in quantum groups, representation theory, and low-dimensional topology, where they are
Modular_tensor_category
Symmetry between bosons and fermions
extension to the more familiar symmetries of quantum field theory. These symmetries are grouped into the Poincaré group and internal symmetries and the Coleman–Mandula
Supersymmetry
Notation for conserved quantities in physics and chemistry
In quantum physics and chemistry, quantum numbers are quantities that characterize the possible states of the system. To fully specify the state of the
Quantum_number
Concept in mathematics
geometry, the quantum groups. This dual can be shown, by the Gelfand–Naimark theorem, to contain the C* algebra of the corresponding Lie group. This relationship
Universal_enveloping_algebra
of s l 2 {\displaystyle {\mathfrak {sl}}_{2}} . Quantum group Kassel, Christian (1995), Quantum groups, Graduate Texts in Mathematics, vol. 155, Berlin
Quantized_enveloping_algebra
Mathematician
geometric Langlands correspondence. Drinfeld introduced the notion of a quantum group (independently discovered by Michio Jimbo at the same time) and made
Vladimir_Drinfeld
Description of physical properties at the atomic and subatomic scale
disciplines, including quantum chemistry, quantum biology, quantum field theory, quantum technology, and quantum information science. Quantum mechanics can describe
Quantum_mechanics
Canadian-American physicist and academic
Foundation. He is most known for his work on quantum field theory and integrability, primarily focusing on quantum group symmetries, finite temperature field
André_LeClair
Textbook by scientists Michael Nielsen and Isaac Chuang
Quantum Computation and Quantum Information is a textbook about quantum information science written by Michael Nielsen and Isaac Chuang, regarded as a
Quantum Computation and Quantum Information
Quantum_Computation_and_Quantum_Information
Mathematical approach to quantum physics
In quantum mechanics, perturbation theory is a set of approximation schemes directly related to mathematical perturbation for describing a complicated
Perturbation theory (quantum mechanics)
Perturbation_theory_(quantum_mechanics)
1960 article by Eugene Wigner
approximate, numerical coincidence." Wigner's second example comes from quantum mechanics: Max Born "noticed that some rules of computation, given by Heisenberg
The Unreasonable Effectiveness of Mathematics in the Natural Sciences
The_Unreasonable_Effectiveness_of_Mathematics_in_the_Natural_Sciences
Computational benchmark
In quantum computing, quantum supremacy or quantum advantage is the goal of demonstrating that a programmable quantum computer can solve a problem that
Quantum_supremacy
Field theory involving topological effects in physics
and mathematical physics, a topological quantum field theory (or topological field theory or TQFT) is a quantum field theory that computes topological
Topological quantum field theory
Topological_quantum_field_theory
Associative algebra together with a Lie bracket that satisfies Leibniz's law
naturally in Hamiltonian mechanics, and are also central in the study of quantum groups. Manifolds with a Poisson algebra structure are known as Poisson manifolds
Poisson_algebra
Technological development using the laws of quantum mechanics
Quantum engineering is the development of technology that capitalizes on the laws of quantum mechanics. This type of engineering uses quantum mechanics
Quantum_engineering
Collection of random variables
Applebaum, David (2004). "Lévy processes: From probability to finance and quantum groups". Notices of the AMS. 51 (11): 1336–1347. Jochen Blath; Peter Imkeller;
Stochastic_process
Description of gravity using discrete values
Quantum gravity (QG) is a field of theoretical physics that seeks unification of the theory of gravity with the principles of quantum mechanics. It deals
Quantum_gravity
Duality between a group and its representations
framework for studying representations of quantum groups, and is currently being extended to quantum supergroups, quantum groupoids and their dual Hopf algebroids
Tannaka–Krein_duality
Methods of mathematical approximation
and advanced forms in quantum field theory. Perturbation theory (quantum mechanics) describes the use of this method in quantum mechanics. The field in
Perturbation_theory
Basic circuit in quantum computing
In quantum computing and specifically the quantum circuit model of computation, a quantum logic gate (or simply quantum gate) is a basic quantum circuit
Quantum_logic_gate
Theoretical framework in physics
theoretical physics, quantum field theory (QFT) is a theoretical framework that combines field theory, special relativity and quantum mechanics. QFT is used
Quantum_field_theory
input group as cyclic group Z 2 {\displaystyle \mathbb {Z} _{2}} . The input data for Kitaev quantum double is a finite group G {\displaystyle G} . Consider
Quantum_double_model
Branch of applied mathematics
rather different type of mathematics. This was group theory, which played an important role in both quantum field theory and differential geometry. This
Mathematical_physics
Mathematical invariant of a knot or link
( N + 1 ) {\displaystyle (N+1)} -irreducible representation of the quantum group U q ( s l 2 ) {\displaystyle U_{q}({\mathfrak {sl}}_{2})} . In this
Jones_polynomial
Japanese mathematician (born 1951)
working in mathematical physics. He is known for his introduction of quantum groups (independently of Vladimir Drinfeld), his contributions to the theory
Michio_Jimbo
development of quantum computing, quantum communication and quantum sensing. Quantum computing and communication are two sub-fields of quantum information
List of companies involved in quantum computing, communication or sensing
List_of_companies_involved_in_quantum_computing,_communication_or_sensing
Quantum mechanics thought experiment
Quantum suicide is a thought experiment in quantum mechanics and the philosophy of physics. Purportedly, it can falsify any interpretation of quantum
Quantum suicide and immortality
Quantum_suicide_and_immortality
Quantum field theory of electromagnetism
In particle physics, quantum electrodynamics (QED) is the relativistic quantum field theory of electrodynamics. In essence, it describes how light and
Quantum_electrodynamics
Poisson manifold that is also a Lie group
a Poisson–Lie group is a Lie bialgebra, in analogy to Lie algebras as the infinitesimal counterparts of Lie groups. Many quantum groups are quantizations
Poisson–Lie_group
Physical quantities taking values at each point in space and time
spacetime, or as a single rank-2 tensor field. In the modern framework of the quantum field theory, even without referring to a test particle, a field occupies
Field_(physics)
16-element matrix group
In physics, quantum information and group theory, the Pauli group is a group formed by tensor products of Pauli matrices, including the identity. The single-qubit
Pauli_group
Group of flat spacetime symmetries
Poincaré group: Minkowski space is considered as a homogeneous space for the group. In quantum field theory, the universal cover of the Poincaré group R 1
Poincaré_group
Branch of mathematics concerning probability
probabilistic nature of physical phenomena at atomic scales, described in quantum mechanics. The latter relies, however, on a different theory of probability
Probability_theory
Branch of mathematics
as the evolution of a system, a differential or integral equation, or a quantum state or observable. The spectral theory of operators allows operators
Mathematical_analysis
Spanish theoretical physicist, author, and academic
models, quantum information and computation and number theory. He has authored two books entitled, Quantum Groups in Two-dimensional Physics and Quantum electron
Germán_Sierra
theory, a Yangian is an infinite-dimensional Hopf algebra, a type of a quantum group. Yangians first appeared in physics in the work of Ludvig Faddeev and
Yangian
Mathematical discipline
In mathematics, a quantum affine algebra (or affine quantum group) is a Hopf algebra that is a q-deformation of the universal enveloping algebra of an
Quantum_affine_algebra
Theory to explain the emergence of the classical world from the quantum world
Quantum Darwinism is a theory meant to explain the emergence of the classical world from the quantum world as due to a process of Darwinian natural selection
Quantum_Darwinism
Topics referred to by the same term
Look up quantum leap in Wiktionary, the free dictionary. Quantum leap or variation, may refer to: Quantum leap (physics), also known as quantum jump, a
Quantum_leap
Process by which a quantum system takes on a definitive state
In various interpretations of quantum mechanics, wave function collapse, also called reduction of the state vector, occurs when a wave function—initially
Wave_function_collapse
Class of transformations that quantum systems and processes can undergo
In quantum mechanics, a quantum operation (also known as quantum dynamical map or quantum process) is a mathematical formalism used to describe a broad
Quantum_operation
Mathematical entity to describe the probability of each possible measurement on a system
In quantum physics, a quantum state is a mathematical entity that represents a physical system. Quantum mechanics specifies the construction, evolution
Quantum_state
Quantum computing company based in Toronto, Canada
Xanadu Quantum Technologies is a Canadian quantum computing hardware and software company headquartered in Toronto, Ontario. The company develops cloud
Xanadu_Quantum_Technologies
Nano-scale semiconductor particles
Quantum dots (QDs) or semiconductor nanocrystals are semiconductor particles a few nanometres in size with optical and electronic properties that differ
Quantum_dot
Non-mathematical introduction
Quantum mechanics is the study of matter and matter's interactions with energy on the scale of atomic and subatomic particles. By contrast, classical
Introduction to quantum mechanics
Introduction_to_quantum_mechanics
Properties underlying modern physics
well as their quantum operators, and relates them to the Lie groups, and relativistic transformations in the Lorentz group and Poincaré group. The notational
Symmetry_in_quantum_mechanics
Quantum computing company based in Espoo, Finland
IQM Quantum Computers is a Finnish quantum computing hardware and software company headquartered in Espoo, Finland. The company develops and commercializes
IQM_Quantum_Computers
1928 textbook by Hermann Weyl
or The Theory of Groups and Quantum Mechanics, is a textbook written by Hermann Weyl about the mathematical study of symmetry, group theory, and how to
Gruppentheorie und Quantenmechanik
Gruppentheorie_und_Quantenmechanik
Interdisciplinary research area
Quantum machine learning (QML) is the study of quantum algorithms for machine learning. It often refers to quantum algorithms for machine learning tasks
Quantum_machine_learning
was originally designed for physicists to compute problems present in quantum mechanics. Kespers Peeters then decided to write a similar program in C
List of open-source software for mathematics
List_of_open-source_software_for_mathematics
This list contains quantum processors, also known as quantum processing units (QPUs). Some devices listed below have only been announced at press conferences
List_of_quantum_processors
Set of quantum operations
The Clifford group encompasses a set of quantum operations that map the set of n-fold Pauli group products into itself. It is most famously studied for
Clifford_group
Concept in mathematics
{\displaystyle \Pi _{1}\otimes \Pi _{2}} is given by the preceding formula. For quantum groups, the coproduct is no longer co-commutative. As a result, the natural
Tensor product of representations
Tensor_product_of_representations
Branch of mathematics that studies abstract algebraic structures
algebras associated to groups have a commutative algebra structure, and so general Hopf algebras are known as quantum groups, although this term is often
Representation_theory
Method of quantum computing
The one-way quantum computer, also known as measurement-based quantum computer (MBQC), is a method of quantum computing that first prepares an entangled
One-way_quantum_computer
Quantum-mechanical version of computer memory
In quantum computing, a quantum memory is the quantum-mechanical version of ordinary computer memory. Whereas ordinary memory stores information as binary
Quantum_memory
Type of approximation to an underlying physical theory
approximation, or effective theory, for an underlying physical theory, such as a quantum field theory or a statistical mechanics model. An effective field theory
Effective_field_theory
Representation of a quantum group
A crystal base for a representation of a quantum group on a Q ( v ) {\displaystyle \mathbb {Q} (v)} -vector space is not a base of that vector space but
Crystal_base
Theory of the strong nuclear interactions
neutron and pion. QCD is a type of quantum field theory called a non-abelian gauge theory, with symmetry group SU(3). The QCD analog of electric charge
Quantum_chromodynamics
Quantum mysticism organization
California, Berkeley. The group held informal discussions on Friday afternoons to explore the philosophical implications of quantum theory. Leading members
Fundamental_Fysiks_Group
Process in quantum computing
Quantum error correction (QEC) comprises a set of techniques used in quantum memory and quantum computing to protect quantum information from errors arising
Quantum_error_correction
Quantum algorithm for integer factorization
Shor's algorithm is a quantum algorithm for finding the prime factors of an integer. It was developed in 1994 by the American mathematician Peter Shor
Shor's_algorithm
Theory of quantum gravity merging quantum mechanics and general relativity
Loop quantum gravity (LQG) is a theory of quantum gravity that incorporates matter of the Standard Model into the framework established for the intrinsic
Loop_quantum_gravity
American mathematician
mathematician noted for his fundamental contributions to C*-algebra and quantum group theory. He is currently a professor in the department of mathematics
Marc_Rieffel
Change of basis applied in quantum computing
In quantum computing, the quantum Fourier transform (QFT) is a linear transformation on quantum bits, and is the quantum analogue of the discrete Fourier
Quantum_Fourier_transform
US information technology company
American quantum computing hardware and software company headquartered in College Park, Maryland. The company develops general-purpose trapped ion quantum computers
IonQ
Aspect of loop quantum gravity
Lorentz transformation. In quantum gravity, Lorentz invariance measures the universal features in the hypothetical loop quantum gravity universes; which
Lorentz invariance in loop quantum gravity
Lorentz_invariance_in_loop_quantum_gravity
Intrinsic quantum property of particles
accurate models for the interaction with spin require relativistic quantum mechanics or quantum field theory. The existence of electron spin angular momentum
Spin_(physics)
discussed in this article. The phrase "quantum mechanics" was coined (in German, Quantenmechanik) by the group of physicists including Max Born, Werner
History_of_quantum_mechanics
QUANTUM GROUP
QUANTUM GROUP
Surname or Lastname
German
German : patronymic from a personal name (Latin Gallus) which was widespread in Europe in the Middle Ages (see Gall 2).German : nickname for someone in the service of the monastery of St Gallen, or a habitational name for someone from the city in Switzerland so named.English : variant of Gallier.Hungarian (Gallér) : from gallér ‘collar’, hence a metonymic occupational name for a taylor, in particular a maker of military garments.Jewish (Ashkenazic) : from German Galle ‘bile’, ‘gall’, with the agent suffix -er. This surname seems to have been one of the group of names selected at random from vocabulary words by government officials.
Surname or Lastname
English
English : occupational name for a keeper of swine, Middle English foreman, from Old English fÅr ‘hog’, ‘pig’ + mann ‘man’.English : status name for a leader or spokesman for a group, from Old English fore ‘before’, ‘in front’ + mann ‘man’. The word is attested in this sense from the 15th century, but is not used specifically for the leader of a gang of workers before the late 16th century.Czech and Jewish (from Bohemia, Moravia) : occupational name for a carter, Czech forman, a loanword from German.
Surname or Lastname
English
English : nickname from Middle English cointe, quointe ‘known’ (via Old French, from Latin cognitus ‘known’). The Middle English word was used in various senses, any of which could have given rise to the surname: ‘cunning’, ‘crafty’, ‘knowledgeable’ (especially about dress, hence ‘elegant’), ‘attractive’. The sense development continued with ‘odd’ or ‘unusual’, the normal meaning of the modern English word ‘quaint’.German and Dutch : variant of Quandt.
Surname or Lastname
English
English : habitational name from a place in Lancashire, so named from Old English gor ‘dirt’, ‘mud’ + tūn ‘enclosure’, ‘settlement’.Introduced in America by a family from Gorton, Lancashire, England (three miles from Manchester), the name Gorton was also adopted by a religious group known as the Gortonites. They were followers of Samuel Gorton (c. 1592–1677), whose unorthodox religious beliefs, which included denying the doctrine of the Trinity, caused him to seek religious toleration by emigrating to Boston in 1637 with his family. In conflict with authorities in Massachusetts Bay, Plymouth, and Newport, he eventually settled in Shawomet, RI, and renamed it Warwick. He died there in 1677, leaving three sons and at least six daughters.
Surname or Lastname
English
English : habitational name from any of the various places so called. The majority, with examples in at least fourteen counties, get the name from Old English hÅh ‘ridge’, ‘spur’ (literally ‘heel’) + tÅ«n ‘enclosure’, ‘settlement’. Haughton in Nottinghamshire also has this origin, and may have contributed to the surname. A smaller group of Houghtons, with examples in Lancashire and South Yorkshire, have as their first element Old English halh ‘nook’, ‘recess’. In the case of isolated examples in Devon and East Yorkshire, the first elements appear to be unattested Old English personal names or bynames, of which the forms approximate to Huhha and Hofa respectively, but the meanings are unknown.
Boy/Male
Danish, Finnish, French, German, Latin, Shakespearean, Swedish
Born Fifth
Surname or Lastname
English and Scottish
English and Scottish : habitational name from any of the numerous and widespread places so called. The majority of these are named with Old English middel ‘middle’ + tūn ‘enclosure’, ‘settlement’; a smaller group, with examples in Cumbria, Kent, Northamptonshire, Northumbria, Nottinghamshire, and Staffordshire, have as their first element Old English mylen ‘mill’.
Surname or Lastname
English
English : probably a topographic name for someone who lived by a group of five ash trees (Middle English ashe) or a habitational name from a place so named, for example Five Ashes in East Sussex.
Surname or Lastname
English
English : from the personal name Horace, Latin Horatius, a Roman family name of unknown origin, associated chiefly with the name of the poet Quintus Horatius Flaccus (65–8 bc).
Girl/Female
Biblical
Fourth.
Surname or Lastname
English
English : habitational name from any of a group of places in Bedfordshire and Cambridgeshire, named with Old English hætt ‘hat’, probably the name of a hill (see Hatt) + lēah ‘wood’, ‘clearing’.
Boy/Male
Hindu, Indian
Calm
Surname or Lastname
English
English : habitational name from a group of villages near Huntingdon, called Great, Little, and Steeple Gidding, named from Old English Gyddingas ‘people of Gydda’, a personal name of uncertain origin.
Surname or Lastname
English and Scottish
English and Scottish : said to be a habitational name from Granson on Lake Neuchâtel. The first known bearer of the surname is Rigaldus de Grancione (fl. 1040). The name was taken to Britain by Otes de Grandison (died 1328) and his brother. They were among a group of Savoyards who settled in England when Henry III married a granddaughter of the Count of Savoy.
Surname or Lastname
South German
South German : occupational name for an official in charge of the legal auction of property confiscated in default of a fine; such a sale was known in Middle High German as a gant (from Italian incanto, a derivative of Late Latin inquantare ‘to auction’, from the phrase In quantum? ‘To how much (is the price raised)?’).German : metonymic occupational name for a cooper, from Middle High German ganter, kanter ‘barrel rack’.German : variant of Gander 3.English : occupational name for a glover, from Old French gantier, an agent derivative of gant ‘glove’ (see Gant).
Surname or Lastname
English
English : variant of Haugh.German : topographic name from Middle High German houfe ‘heap’, e.g. of stones, or in southern Germany, a nickname from the same word in the sense ‘crowd’, ‘group of soldiers’.
Male
English
English surname transferred to forename use, derived from the Norman baronial name Cuinchy, a derivative of Roman Quintus, QUINCY means "fifth."
Biblical
fourth
Surname or Lastname
English
English : habitational name from any of the numerous places so called, which split more or less evenly into two groups with different etymologies. One set (with examples in Berkshire, Dorset, Gloucestershire, Hampshire, Herefordshire, Somerset, and Wiltshire) is named from the Old English weak dative hēan (originally used after a preposition and article) of hēah ‘high’ + Old English tūn ‘enclosure’, ‘settlement’. The other (with examples in Cambridgeshire, Dorset, Gloucestershire, Herefordshire, Northamptonshire, Shropshire, Somerset, Suffolk, and Wiltshire) has Old English hīwan ‘household’, ‘monastery’. Compare Hine as the first element.
Boy/Male
Latin Biblical
Born fourth.
QUANTUM GROUP
QUANTUM GROUP
Surname or Lastname
English (Norfolk)
English (Norfolk) : from the medieval female personal name Moll(e), a pet form of Mary (see Marie 1).German : nickname from a dialect term for a plump, stout person.Catalan : nickname for a weak or ineffectual person, from Catalan moll ‘soft’, ‘weak’ (Latin mollis).Dutch : variant of Mol 1.(van Moll) : variant of Mol 2.
Boy/Male
Muslim
The wrapped one
Girl/Female
Muslim/Islamic
Longing yearning
Boy/Male
Tamil
Wise, River
Girl/Female
Hindu, Indian, Marathi, Sanskrit, Traditional
Drop of a Snow
Girl/Female
Arabic
More or Most Beautiful
Girl/Female
Hindu, Indian
Curiosity
Boy/Male
Tamil
Shape, Summit
Girl/Female
Bengali, Haryanvi, Indian, Telugu
Goddess Laxmi
Boy/Male
Arabic, Hindu, Indian, Kannada, Muslim, Telugu
The Lord of the Whole World
QUANTUM GROUP
QUANTUM GROUP
QUANTUM GROUP
QUANTUM GROUP
QUANTUM GROUP
n.
A function involving the coefficients and the variables of a quantic, and such that when the quantic is lineally transformed the same function of the new variables and coefficients shall be equal to the old function multiplied by a factor. An invariant is a like function involving only the coefficients of the quantic.
n.
A quantic of the fourth degree. See Quantic.
n.
Part or proportion; quota.
n.
A quantic of the fifth degree. See Quantic.
n.
Quantity; amount.
a.
Of, pertaining to, or in the manner of, the Roman general, Quintus Fabius Maximus Verrucosus; cautious; dilatory; avoiding a decisive contest.
n.
A quantic of the seventh degree.
n.
A quantic of the sixth degree.
n.
A fanciful, odd, or extravagant notion; a quant fancy; an unnatural or affected conception; a witty thought or turn of expression; a fanciful device; a whim; a quip.
n.
One of several species of valuable food fishes of the genus Epinephelus, of the family Serranidae, as the red grouper, or brown snapper (E. morio), and the black grouper, or warsaw (E. nigritus), both from Florida and the Gulf of Mexico.
n.
A quantic of the second degree. See Quantic.
n.
One of the variables of a quantic as distinguished from a coefficient.
n.
A homogeneous algebraic function of two or more variables, in general containing only positive integral powers of the variables, and called quadric, cubic, quartic, etc., according as it is of the second, third, fourth, fifth, or a higher degree. These are further called binary, ternary, quaternary, etc., according as they contain two, three, four, or more variables; thus, the quantic / is a binary cubic.
n.
To form a group of; to arrange or combine in a group or in groups, often with reference to mutual relation and the best effect; to form an assemblage of.
n.
A punting pole with a broad flange near the end to prevent it from sinking into the mud; a setting pole.
n.
A quantic of the eighth degree.
pl.
of Quantum
n.
A definite portion of a manifoldness, limited by a mark or by a boundary.