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American mathematician (1940–2011)
Daniel Gray Quillen (June 22, 1940 – April 30, 2011) was an American mathematician. He is known for being the "prime architect" of higher algebraic K-theory
Daniel_Quillen
Seminal math text
manuscript by Alexander Grothendieck. It consists of a 12-page letter to Daniel Quillen followed by about 600 pages of research notes. The topic of the work
Pursuing_Stacks
Topics referred to by the same term
Quillen is a surname of Irish origin. It could refer to: Carol Quillen, University president Daniel Quillen, a mathematician Jimmy Quillen, a former member
Quillen
Special kind of adjunction between categories named after Daniel Quillen
construction. Quillen adjunctions are named in honor of the mathematician Daniel Quillen. Given two closed model categories C and D, a Quillen adjunction
Quillen_adjunction
Theory of cohomology for commutative rings
André (1974) and Daniel Quillen (1970) using methods of homotopy theory. It comes with a parallel homology theory called André–Quillen homology. Let A
André–Quillen_cohomology
Subject area in mathematics
definition of the higher K-groups of rings was a difficult achievement of Daniel Quillen, and many of the basic facts about the higher K-groups of algebraic
Algebraic_K-theory
Commutative algebra theorem
The Quillen–Suslin theorem, also known as Serre's problem or Serre's conjecture, is a theorem in commutative algebra concerning the relationship between
Quillen–Suslin_theorem
Connects the homology of the symmetric groups with mapping spaces of spheres
and Daniel Quillen) is also often stated as a relation between the sphere spectrum and the classifying spaces of the symmetric groups via Quillen's plus
Barratt–Priddy_theorem
Hungarian-American mathematician (1923-2005)
Stephen Smale, Daniel Quillen, Peter Landweber, Robert MacPherson, Robert W. Brooks, Susan Tolman, and Eric Weinstein. Smale and Quillen won Fields Medals
Raoul_Bott
compute. For a finite field, the complete calculation was given by Daniel Quillen. The map sending a finite-dimensional F-vector space to its dimension
K-groups_of_a_field
On the effects of changing the ring of ''K''-groups
{\displaystyle K_{0},K_{1}} and was later extended to higher K-groups by Daniel Quillen. Let G i ( R ) {\displaystyle G_{i}(R)} be the algebraic K-theory of
Fundamental theorem of algebraic K-theory
Fundamental_theorem_of_algebraic_K-theory
Formalism for Thom class representation in differential geometry
Mathai–Quillen formalism is an approach to topological quantum field theory introduced by Atiyah and Jeffrey (1990), based on the Mathai–Quillen form constructed
Mathai–Quillen_formalism
the Quillen spectral sequence, also called the Brown–Gersten–Quillen or BGQ spectral sequence (named after Kenneth Brown, Stephen Gersten, and Daniel Quillen)
Quillen_spectral_sequence
Mathematics award
Retrieved 16 March 2015. Friedlander, Eric; Grayson, Daniel (November 2012). "Daniel Quillen" (PDF). Notices of the AMS. 59 (10): 1392–1406. doi:10
Fields_Medal
French mathematician (1928–2014)
manuscript entitled Pursuing Stacks. It began with a letter addressed to Daniel Quillen. This letter and successive parts were distributed from Bangor (see
Alexander_Grothendieck
Model structure on the category of simplicial sets
functor (Milnor's theorem). The Kan–Quillen model structure is named after Daniel Kan and Daniel Quillen. The Kan–Quillen model structure is given by: Fibrations
Kan–Quillen_model_structure
Pontryagin Charles C. Pugh Lajos Pukánszky Daniel Quillen Michael Oser Rabin M. S. Raghunathan Michel Raynaud Daniel Rider Abraham Robinson Helmut Röhrl Colin
List of International Congresses of Mathematicians Plenary and Invited Speakers
List_of_International_Congresses_of_Mathematicians_Plenary_and_Invited_Speakers
Two theorems needed for Quillen's Q-construction in algebraic K-theory
Quillen's Q-construction in algebraic K-theory and are named after Daniel Quillen. The precise statements of the theorems are as follows. Quillen's Theorem
Quillen's_theorems_A_and_B
College of the University of Oxford
topology. The chair was held from 1984 until he retired in 2006 by Daniel Quillen, who received the Fields Medal for his work in algebraic K-theory. It
Magdalen_College,_Oxford
Homomorphisms between simple modules over the same ring are isomorphisms or zero
Lie algebras, the most common of which are due to Jacques Dixmier and Daniel Quillen. Representation theory is the study of homomorphisms from a group, G
Schur's_lemma
specialized in combinatorics and coding theory Jon T. Pitts (1948–2024) Daniel Quillen (1940–2011) Charles Reason (1818–1893) Jeffrey B. Remmel (1948–2017)
List of American mathematicians
List_of_American_mathematicians
Job title at MIT
Messing, Emmy Murphy, John Forbes Nash Jr., Irena Peeva, Daniel Quillen, Douglas Ravenel, Daniel G. Rider, Walter Rudin, Robert Rumely, James Serrin, William
C._L._E._Moore_instructor
Branch of mathematics
Perelman Henri Poincaré Lev Pontryagin Nicolae Popescu Mikhail Postnikov Daniel Quillen Jean-Pierre Serre Isadore Singer Stephen Smale Edwin Spanier Norman
Algebraic_topology
category equipped with short exact sequences. The concept is due to Daniel Quillen and is designed to encapsulate the properties of short exact sequences
Exact_category
construction was introduced by Michel Kervaire (1969), and was used by Daniel Quillen to define algebraic K-theory. Given a perfect normal subgroup of the
Plus_construction
Construct in algebraic geometry
of authors in the early 1960s. In the late 1960s, Michel André and Daniel Quillen independently came up with the correct definition for a morphism of
Cotangent_complex
Metric on a determinant line bundle
geometry, the Quillen metric is a metric on the determinant line bundle of a family of operators. It was introduced by Daniel Quillen for certain elliptic
Quillen_metric
Russian-American mathematician
of the Quillen–Suslin theorem, a result in commutative algebra, first conjectured by Jean-Pierre Serre in 1955, and then proved by Daniel Quillen and Andrei
Leonid_Vaserstein
Would relate vector bundles over a regular Noetherian ring and over a polynomial ring
A[t_{1},\dots ,t_{n}]} . The conjecture is named for Hyman Bass and Daniel Quillen, who formulated the conjecture. The conjecture is a statement about
Bass–Quillen_conjecture
Describes a periodicity in the homotopy groups of classical groups
conjecture (1963) which was finally resolved in the affirmative by Daniel Quillen (1971). Bott's original results may be succinctly summarized in: Corollary:
Bott_periodicity_theorem
American mathematician
the Massachusetts Institute of Technology, under the supervision of Daniel Quillen, with thesis Abstract Homotopy Theory and Generalized Sheaf Cohomology
Kenneth_Brown_(mathematician)
most influential contribution is the Mathai–Quillen formalism, which he formulated together with Daniel Quillen, and which has since found applications in
Varghese_Mathai
French mathematician (born 1926)
answered in the affirmative by Daniel Quillen and Andrei Suslin independently in 1976. This result is now known as the Quillen–Suslin theorem. In 1954, Serre
Jean-Pierre_Serre
Concept category theory (mathematics)
categories, an axiomatic framework for homotopy theory introduced by Daniel Quillen. It is also used in the definition of a factorization system, and of
Lifting_property
Mathematical theory of topological spaces
homotopy groups is ignored. It was founded by Dennis Sullivan (1977) and Daniel Quillen (1969). This simplification of homotopy theory makes certain calculations
Rational_homotopy_theory
Algebraic structure used in topology
homotopy theory. It is closely related to formal groups, via a theorem of Daniel Quillen. Various different flavors of topological K-theory, based on studying
Cohomology
Concept in algebra
this notion comes from algebraic K-theory of rings. For a ring R Daniel Quillen in Quillen (1973) introduced two equivalent ways to find the higher K-theory
K-theory_of_a_category
Annual mathematics competition
Medalists—John Milnor (also an Abel Prize laureate), David Mumford, and Daniel Quillen—and two Nobel laureates in physics—Richard Feynman and Kenneth Wilson
Putnam_Competition
Topological spaces whose union is a boundary
Mathematical Society Translations, Ser. 2, Vol. 11, pp. 1–114 (1959). Daniel Quillen, On the formal group laws of unoriented and complex cobordism theory
Cobordism
Algebraic structure used in analysis
Lie algebra, using the Whitehead product. In a related construction, Daniel Quillen used differential graded Lie algebras over the rational numbers Q {\displaystyle
Lie_algebra
Russian mathematician
was titled Projective modules over polynomial rings. In 1976 he and Daniel Quillen independently proved Serre's conjecture about the triviality of algebraic
Andrei_Suslin
{\displaystyle c_{i,j}} has degree ( i + j − 1 ) {\displaystyle (i+j-1)} . Daniel Quillen (1969) proved that the coefficient ring of complex cobordism is naturally
Lazard's_universal_ring
Concise Encyclopedia of Mathematics. CRC Press. p. 65. ISBN 9781420035223. Daniel Frohardt and Kay Magaard, Composition Factors of Monodromy Groups, Annals
List_of_conjectures
History of maths
closed model categories 1967 Daniel Quillen Quillen axioms for homotopy theory in model categories 1967 Daniel Quillen First fundamental theorem of simplicial
Timeline of category theory and related mathematics
Timeline_of_category_theory_and_related_mathematics
Mathematical construction used in homotopy theory
is a monomorphism of simplicial sets. It is a difficult theorem of Daniel Quillen that the category of simplicial sets with these classes of morphisms
Simplicial_set
American mathematician
fields at specific locations (negative integers) is named after him and Daniel Quillen. In 1959 he was a Putnam Fellow. In 1973/74 he was a Guggenheim Fellow
Stephen_Lichtenbaum
Dixon 1947–1960 J. H. C. Whitehead 1960–1984 Graham Higman 1984–2006 Daniel Quillen 2007–2013 Raphaël Rouquier 2013– Ben Green "Oxford University Gazette"
Waynflete_Professorship
Israeli mathematician and professor
Barry Mazur from Harvard University, and his mentors Michael Artin and Daniel Quillen from MIT. Haran is a professor at the Technion – Israel Institute of
Shai_Haran
Enrique Pujals Geoffrey K. Pullum Hilary Putnam Ilya Piatetski-Shapiro Daniel Quillen Frank Quinn Tal Rabin Paul Rabinowitz Hans Rademacher Tibor Radó M.
List of people by Erdős number
List_of_people_by_Erdős_number
American mathematician (born 1941)
conjecture was also first presented in his 1970 notes. Sullivan and Daniel Quillen (independently) created rational homotopy theory in the late 1960s and
Dennis_Sullivan
Jean-Luc Brylinski, Mariusz Wodzicki, Jean-Louis Loday, Victor Nistor, Daniel Quillen, Joachim Cuntz, Ryszard Nest, Ralf Meyer, and Michael Puschnigg. The
Cyclic_homology
Branch of mathematics
functors. Finally, two useful and equivalent definitions were given by Daniel Quillen using homotopy theory in 1969 and 1972. A variant was also given by
K-theory
Branch of mathematics
of Connes and later developed in related forms by Joachim Cuntz and Daniel Quillen. The precise definition depends on the differential calculus or homological
Noncommutative_geometry
Private school in Livingston, New Jersey, US
Academy at West Point, New York." Friedlander, Eric; and Grayson, Daniel. "Daniel Quillen", Notices of the American Mathematical Society, Volume 59, Number
Newark_Academy
Name list
painter Daniel Queipo (born 2002), Spanish footballer Daniel Quesada (born 1995), Spanish taekwondo athlete Daniel Quigley, multiple people Daniel Quillen (1940–2011)
List of people with given name Daniel
List_of_people_with_given_name_Daniel
In algebra, Quillen's Q-construction associates to an exact category (e.g., an abelian category) an algebraic K-theory. More precisely, given an exact
Q-construction
administrator, twelfth president of West Virginia State University Daniel Quillen (1940–2011), mathematician known for being the "prime architect" of
List of people from Orange, New Jersey
List_of_people_from_Orange,_New_Jersey
Concept in mathematics
generators of degrees 2, 4, 6, ... (where ci,j has degree 2(i + j − 1)). Daniel Quillen proved that the coefficient ring of complex cobordism is naturally isomorphic
Formal_group_law
American academic and university administrator
Daniel L. Schwartz is an American academic and university administrator. He is the I. James Quillen Dean and Nomellini & Olivier Professor of Educational
Daniel_L._Schwartz
Type of mathematical theorem
stable range. The concept of homological stability was pioneered by Daniel Quillen whose proof technique has been adapted in various situations. Examples
Homological_stability
Geometry formula
Advances in Mathematics, 134 (2): 240–277, doi:10.1006/aima.1997.1701 Quillen, Daniel (1971), "The spectrum of an equivariant cohomology ring, I", Annals
Localization formula for equivariant cohomology
Localization_formula_for_equivariant_cohomology
Passos, Maura Healey, Barney Frank, William Randolph Hearst, Mark Penn, Daniel Quillen, Robert Rubin, Chuck Schumer, Lloyd Shapley, Maurice Wertheim, and Elizabeth
List of Harvard College freshman dormitories
List_of_Harvard_College_freshman_dormitories
Mathematical generalized cohomology theory
{\displaystyle {\text{BP}}} . For each prime p {\displaystyle p} , Daniel Quillen showed there is a unique idempotent map of ring spectra ε from MUQ(
Brown–Peterson_cohomology
at the University of East Anglia in the UK. Daniel Quillen formulates higher algebraic K-theory. Daniel Gorenstein announces a 16-step program for completing
1972_in_science
Mathematics glossary
that the fibers are homotopy equivalent to each other. Quillen 1. Daniel Quillen 2. Quillen’s theorem says that π ∗ M U {\displaystyle \pi _{*}MU} is
Glossary of algebraic topology
Glossary_of_algebraic_topology
college; Fields Medal winner David Pingree – MacArthur Fellow in 1981 Daniel Quillen – former Dickson Instructor in Mathematics and the college; Fields Medal
List of University of Chicago faculty
List_of_University_of_Chicago_faculty
from the original on January 6, 2011. Retrieved February 1, 2011. "Daniel Grey Quillen" (PDF). Orange Public Schools. Archived from the original (PDF) on
List of Harvard University people
List_of_Harvard_University_people
Mathematical conjecture
mathematics, the Quillen–Lichtenbaum conjecture is a conjecture relating étale cohomology to algebraic K-theory introduced by Quillen (1975, p. 175), who
Quillen–Lichtenbaum conjecture
Quillen–Lichtenbaum_conjecture
From a homotopy group of a special orthogonal group to a homotopy group of spheres
assuming the Adams conjecture of Adams (1963) which was proved by Daniel Quillen (1971), as follows. The group π r ( SO ) {\displaystyle \pi _{r}(\operatorname
J-homomorphism
French mathematician
construction of the cotangent complex generalizes that of Michel André and Daniel Quillen to morphisms of ringed topoi. The generality of the framework makes
Luc_Illusie
theorem to be proved using a computer. Andrei Suslin and Daniel Quillen independently prove the Quillen–Suslin theorem ("Serre's conjecture") about the triviality
1976_in_science
German mathematician (born 1948)
contributed to the development of that theory. In collaboration with Daniel Quillen, he developed a new approach to cyclic cohomology and proved the excision
Joachim_Cuntz
Mathematician, prolific contributor to homotopy theory
category structure on the category of simplicial sets is known as Kan–Quillen model structure, while its fibrations and fibrant objects are known as
Daniel_Kan
American mathematician (1936–2024)
standards) proofs of his main theorems. Together with Victor Guillemin and Daniel Quillen, he extended this classification to a larger class of pseudogroups:
Shlomo_Sternberg
University 1976 Sorin Popa University of California, Los Angeles 2025 Daniel Quillen (died 2011) University of Oxford 1978 Paul Rabinowitz University of
List of members of the National Academy of Sciences (mathematics)
List_of_members_of_the_National_Academy_of_Sciences_(mathematics)
the analytic torsion of a family of differential operators. Quillen metric Quillen, Daniel (1985), "Determinants of Cauchy-Riemann operators over a Riemann
Quillen determinant line bundle
Quillen_determinant_line_bundle
Definition of cobordism groups and bordism groups of a space X. 1969 Daniel Quillen The formal group law associated to complex cobordism is universal.
Timeline_of_bordism
American mathematician (1876–1931)
famous mathematicians, including four Fields Medal winners: Paul Cohen, Daniel Quillen, Curtis T. McMullen, and Akshay Venkatesh. C. L. E. Moore received his
Clarence_Lemuel_Elisha_Moore
in Mathematics: Pierre Deligne, Charles Fefferman, Grigory Margulis, Daniel Quillen Nobel Prizes Physics – Pyotr Leonidovich Kapitsa, Arno Allan Penzias
1978_in_science
German mathematician (born 1938)
highly structured ring spectra. Today, Waldhausen is seen, together with Daniel Quillen, as one of the pioneers of algebraic K-theory. Among others, he was
Friedhelm_Waldhausen
complexity theory at the 3rd Annual ACM Symposium on Theory of Computing. Daniel Quillen publishes a proof of the Adams conjecture. Steven Takiff introduces
1971_in_science
in Environmental Health Sciences at Columbia University. June 22 – Daniel Quillen (died 2011), American mathematician. July 15 – Stephen Jacobsen (died
1940_in_science
^{*}(E)} . Complex cobordism has a natural complex orientation. Daniel Quillen (1969) showed that there is a natural isomorphism from its coefficient
Complex_cobordism
Rican Negro league baseball player. Evald Okas, 95, Estonian painter. Daniel Quillen, 70, American mathematician. Ernesto Sabato, 99, Argentine writer (The
Deaths_in_April_2011
American mathematician
in Mathematics. 61 (3): 267–304. doi:10.1016/0001-8708(86)90081-2. Daniel Quillen: Higher algebraic K-theory: I. In: H. Bass (ed.): Higher K-Theories
Spencer_Bloch
American mathematician
xviii+360 pp. ISBN 978-3-03719-075-3. Topology and K-theory: Lectures by Daniel Quillen, Notes by Robert Penner, Springer-Verlag Lecture Notes in Mathematics
Robert_Penner
Result in algebraic K-theory relating Chow groups to cohomology
edu/~ericmf/lectures/zurich/zlec5.pdf Archived 2013-12-15 at the Wayback Machine Daniel Quillen: Higher algebraic K-theory: I. In: H. Bass (ed.): Higher K-Theories
Bloch's_formula
K'-theory for regular rings and the localization sequence for K'-theory. Daniel Quillen showed that the Bass conjecture holds for all (regular, depending on
Bass_conjecture
Geometry". In Friedlander, Eric; Grayson, Daniel (eds.). Handbook of K-Theory I. Springer. pp. 351–428. Quillen, Daniel (1972). "On the cohomology and K-theory
Parshin's_conjecture
American mathematician (1944–2025)
concentrated on the relation between K-theory and cobordism, and when Daniel Quillen's work on that subject appeared he saw that ideas of Sergei Novikov implied
Jack_Morava
American soccer player (born 2003)
Victory vs. Inter Miami CF". newyorkredbulls.com. Retrieved August 27, 2022. Quillen, Ian Nicholas (June 25, 2023). "One-sided Goalfest at Red Bull Arena against
Daniel_Edelman_(soccer)
Mathematical concept
exactes". Comptes Rendus de l'Académie des Sciences. 258: 4188–4190. Quillen, Daniel (1973). "Higher algebraic K-theory: I" (PDF). Higher K-Theories. Lecture
Quotient of an abelian category
Quotient_of_an_abelian_category
Swiss mathematician (1936–2009)
non-abelian derived functors; the theory was developed simultaneously by Daniel Quillen and Jonathan Mock Beck — the three mathematicians worked independently
Michel_André_(mathematician)
French mathematician (1924–1987)
His work took on a life of its own in the hands of Daniel Quillen in the late 20th century. Quillen's discovery, that a ring Lazard used to classify formal
Michel_Lazard
whose drawings were used to crack the Maya script (b. 1913). 30 April – Daniel Quillen, American mathematician (b. 1940). 1 May Steven A. Orszag, American
2011_in_science
American federal agent
be done?". NBC 5 Dallas-Fort Worth. 2026-01-02. Retrieved 2026-01-09. Quillen, Alanna (2025-10-29). "Dallas Police chief shares downtown safety updates
Daniel_Comeaux
Mathematical category with weak equivalences, fibrations and cofibrations
complexes (derived category theory). The concept was introduced by Daniel G. Quillen (1967). In recent decades, the language of model categories has been
Model_category
arXiv:math/9812034. doi:10.1016/S0022-4049(00)00121-3. MR 1843805. S2CID 15720862. Quillen, Daniel (1969), "Rational homotopy theory", Annals of Mathematics, 90 (2):
Differential graded Lie algebra
Differential_graded_Lie_algebra
subject to the Dold–Kan correspondence. Differential graded Lie algebra Quillen, Daniel (September 1969). "Rational homotopy theory". Annals of Mathematics
Simplicial_Lie_algebra
American soccer player
Berhalter snubs him for USA squad". CBS Sports. Retrieved December 6, 2022. Quillen, Ian Nicholas (November 9, 2022). "USMNT Snubs Ricardo Pepi, Zack Steffen
Ricardo_Pepi
DANIEL QUILLEN
DANIEL QUILLEN
Female
Hebrew
(×“Ö¼Ö¸× Ö´×™Ö¼×ֵלָה) Feminine form of Hebrew Daniyel, DANIELA means "God is my judge."
Surname or Lastname
English, French, Spanish, Portuguese, German, Polish, Czech, Slovak, Hungarian (Dániel), Romanian, and Jewish
English, French, Spanish, Portuguese, German, Polish, Czech, Slovak, Hungarian (Dániel), Romanian, and Jewish : from the Hebrew personal name Daniel ‘God is my judge’, borne by a major prophet in the Bible. The major factor influencing the popularity of the personal name (and hence the frequency of the surname) was undoubtedly the dramatic story in the Book of Daniel, recounting the prophet’s steadfast adherence to his religious faith in spite of pressure and persecution from the Mesopotamian kings in whose court he served: Nebuchadnezzar and Belshazzar (at whose feast Daniel interpreted the mysterious message of doom that appeared on the wall, being thrown to the lions for his pains). The name was also borne by a 2nd-century Christian martyr and by a 9th-century hermit, the legend of whose life was popular among Christians during the Middle Ages; these had a minor additional influence on the adoption of the Christian name. Among Orthodox Christians in Eastern Europe the name was also popular as being that of a 4th-century Persian martyr, who was venerated in the Orthodox Church.Irish : reduced form of McDaniel, which is actually a variant of McDonnell, from the Gaelic form of Irish Donal (equivalent to Scottish Donald), erroneously associated with the Biblical personal name Daniel. See also O’Donnell.Peter Daniel was one of the pioneer settlers in the 17th century in Stafford County, VA, where he was a justice of the peace. His grandson, Peter Vivian Daniel, was a U.S. Supreme Court justice from 1841 to his death in Richmond, VA, in 1860.
Girl/Female
American, Australian, British, English, French, Greek, Hebrew
A Combination of Danielle and Janice; Feminine Variant of Daniel; God is Mu Judge
Surname or Lastname
English
English : variant spelling of Daniel.
Girl/Female
American, Australian, Danish, French, German, Hebrew, Swiss
God is My Judge; Female Version of Daniel
Girl/Female
American, Australian
Female Version of Daniel
Girl/Female
African, American, Assamese, Australian, British, Chinese, Christian, Danish, Dutch, English, French, German, Gujarati, Hawaiian, Hebrew, Indian, Jamaican, Sindhi, Swedish, Swiss
God is My Judge; Feminine of Daniel; Judged Only by God
Girl/Female
Christian & English(British/American/Australian)
Feminine of Daniel
Surname or Lastname
English
English : occupational name for a dancer or acrobat, from an agent derivative of Middle English, Old French dance ‘dance’ (see Dance).Translation of German Dänzer or Danser (see Danzer).
Surname or Lastname
English, North German, Dutch, and Jewish (Ashkenazic)
English, North German, Dutch, and Jewish (Ashkenazic) : patronymic from the personal name Daniel.
Male
Hebrew
(×‘Ö¼Ö¸× Ö´×™Ö¼×ֵל) Hebrew name DANIYEL means "God is my judge." In the bible, this is the name of the hero of the Book of Daniel, who was cast into a den of lions but saved by God.
Female
Slavic
Variant spelling of Slavic Danica, DANIKA means "morning star."
Female
Hebrew
Variant spelling of Hebrew Daniela, DANIELLA means "God is my judge."
Male
Italian
Italian form of Hebrew Daniyel, DANIELE means "God is my judge."
Female
English
French feminine form of Hebrew Daniyel, DANIELLE means "God is my judge."Â
Girl/Female
American, Australian, British, Chinese, Christian, Danish, English, French, German, Hebrew, Italian, Jewish, Swedish
God is My Judge; Female Version of Daniel; Judge
Male
English
 Anglicized form of Greek Daniēl (Hebrew Daniyel), DANIEL means "God is my judge." In the bible, this is the name of the hero of the Book of Daniel, who was cast into a den of lions but saved by God. Anglicized form of Scottish Gaelic Domhnall, meaning "world ruler."
Female
French
French feminine form of Hebrew Daniyel (English Daniel), DANIELLE means "God is my judge."Â
Female
Italian
 Feminine form of Italian Daniele, DANIELA means "God is my judge." Compare with another form of Daniela.
Boy/Male
American, British, English, French
Open; Variant of Darrel Open
DANIEL QUILLEN
DANIEL QUILLEN
Boy/Male
Gaelic Irish
Strong; oak-hearted. See also Derek.
Boy/Male
Indian, Sanskrit
Marked
Boy/Male
Hindu, Indian
Lots of Love Gathering
Girl/Female
Tamil
Hindu Goddess Parvati
Female
Greek
(Αίγλη) Greek name AIGLE means "radiance, splendor." In mythology, this is the name of several characters, including a goddess of good health.
Boy/Male
Indian, Punjabi, Sikh
Love for Prayer
Boy/Male
Indian, Punjabi, Sikh
Heart Full of Love
Boy/Male
Hindu
What
Girl/Female
Hindu, Indian
Sesonal
Female
Hebrew
(ש×ï‹×©×Ö·× Ö¼Ö¸×”) Feminine form of Hebrew unisex Shoshan, SHOSHANA means "lily."
DANIEL QUILLEN
DANIEL QUILLEN
DANIEL QUILLEN
DANIEL QUILLEN
DANIEL QUILLEN
v. t.
To cause to dangle; to swing, as something suspended loosely; as, to dangle the feet.
n.
A Hebrew prophet distinguished for sagacity and ripeness of judgment in youth; hence, a sagacious and upright judge.
v. t.
To follow like a spaniel.
v. t.
To cause to dance, or move nimbly or merrily about, or up and down; to dandle.
imp. & p. p.
of Dance
n.
A young person, either male or female, of noble or gentle extraction; as, Damsel Pepin; Damsel Richard, Prince of Wales.
v. t.
To form in or with panels; as, to panel a wainscot.
n.
A board having its edges inserted in the groove of a surrounding frame; as, the panel of a door.
n.
A refusal to acknowledge; disclaimer of connection with; disavowal; -- the contrary of confession; as, the denial of a fault charged on one; a denial of God.
n.
One who dances or who practices dancing.
n.
The language of the Danes.
n.
One who denies; as, a denier of a fact, or of the faith, or of Christ.
n.
One of a breed of small terriers; -- called also Dandie Dinmont.
n.
The denial of one's self; forbearing to gratify one's own desires; self-sacrifice.
n.
A Moorish dance, usually performed by a single dancer, who accompanies the dance with castanets.
a.
Belonging to the Danes, or to their language or country.