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In mathematics, Milnor maps are named in honor of John Milnor, who introduced them to topology and algebraic geometry in his book Singular Points of Complex
Milnor_map
American mathematician (born 1931)
John Willard Milnor (born February 20, 1931) is an American mathematician known for his work in differential topology, algebraic K-theory and low-dimensional
John_Milnor
Simplest non-trivial closed knot with three crossings
3 = 0 {\displaystyle z^{2}+w^{3}=0} . Then this fiber bundle has the Milnor map ϕ ( z , w ) = ( z 2 + w 3 ) / | z 2 + w 3 | {\displaystyle \phi (z
Trefoil_knot
curvature Milnor construction Milnor K-theory Milnor fibration Milnor invariants Milnor manifold Milnor map Milnor–Moore theorem Milnor number Milnor ring
List of things named after John Milnor
List_of_things_named_after_John_Milnor
Unique knot with a crossing number of four
isolated critical point of a real-polynomial map F: R4→R2, so (according to a theorem of John Milnor) the Milnor map of F is actually a fibration. Bernard Perron
Figure-eight knot (mathematics)
Figure-eight_knot_(mathematics)
Smooth manifold that is homeomorphic but not diffeomorphic to a sphere
(hence the name "exotic"). The first exotic spheres were constructed by John Milnor (1956) in dimension n = 7 {\displaystyle n=7} as S 3 {\displaystyle S^{3}}
Exotic_sphere
Belgian mathematician
its investigations. His work in complex singularity theory generalized Milnor maps into an algebraic setting and extended the Picard-Lefschetz formula beyond
Pierre_Deligne
Algebraic invariant
mathematics, Milnor K-theory is an algebraic invariant (denoted K ∗ ( F ) {\displaystyle K_{*}(F)} for a field F {\displaystyle F} ) defined by John Milnor (1970)
Milnor_K-theory
Point without a tangent space
multiplicity two and the tangent cone is not singular outside its vertex. Milnor map Resolution of singularities Singularity theory Zariski tangent space Hartshorne
Singular point of an algebraic variety
Singular_point_of_an_algebraic_variety
Abelian group, in mathematics
mathematics, especially differential topology and cobordism theory, a Kervaire–Milnor group is an abelian group defined as the h-cobordism classes of homotopy
Kervaire–Milnor_group
Concept in differential topology
manifold, but vanishes on all smooth manifolds of dimension 10. Kervaire & Milnor (1963) computes the group of exotic spheres (in dimension greater than 4)
Kervaire_invariant
mathematical subject of geometric group theory, the Švarc–Milnor lemma (sometimes also called Milnor–Švarc lemma, with both variants also sometimes spelling
Švarc–Milnor_lemma
Way to create new manifolds out of disk bundles
first described by John Milnor (1956) and subsequently used extensively in surgery theory to produce manifolds and normal maps with given surgery obstructions
Plumbing_(mathematics)
Invariant that plays a role in algebraic geometry and singularity theory
the Milnor number, named after John Milnor, is an invariant of a function germ. If f is a complex-valued holomorphic function germ then the Milnor number
Milnor_number
Subject area in mathematics
called the Galois symbol map. The relation between étale (or Galois) cohomology of the field and Milnor K-theory modulo 2 is the Milnor conjecture, proven by
Algebraic_K-theory
Mathematical theory in topological dynamics
The Milnor–Thurston kneading theory is a mathematical theory which analyzes the iterates of piecewise monotone mappings of an interval into itself. The
Milnor–Thurston kneading theory
Milnor–Thurston_kneading_theory
embedding Link concordance Link group Link (knot theory) Milnor conjecture (topology) Milnor map Möbius energy Mutation (knot theory) Physical knot theory
List_of_knot_theory_topics
American civil engineer (1810-1881)
William Milnor Roberts (February 12, 1810 – July 14, 1881) was an American civil engineer. Roberts was one of the most prolific and prominent civil engineers
William_Milnor_Roberts
Comptes rendus de l'Académie des sciences, 166: 26–28 Milnor, John Willard (2006), "On Lattès maps", Dynamics on the Riemann sphere, Eur. Math. Soc., pp
Lattès_map
Theorem relating Milnor K-theory and Galois cohomology
the norm residue isomorphism theorem is a long-sought result relating Milnor K-theory and Galois cohomology. The result has a relatively elementary formulation
Norm residue isomorphism theorem
Norm_residue_isomorphism_theorem
Techniques in topology used to produce one finite-dimensional manifold from another
manifold from another in a 'controlled' way, introduced by John Milnor (1961). Milnor called this technique surgery, while Andrew Wallace called it spherical
Surgery_theory
Concept in topology
basic result here is a theorem of Milnor which says that the mapping space Map ( X , Y ) {\displaystyle \operatorname {Map} (X,Y)} has the homotopy type
Mapping_space
Topological space defined by the union of circles
dimensions. Such a generalization was used by Michael Barratt and John Milnor to provide examples of compact, finite-dimensional spaces with nontrivial
Hawaiian_earring
topology, the Milnor–Wood inequality is an obstruction to endow circle bundles over surfaces with a flat structure. It is named after John Milnor and John
Milnor–Wood_inequality
Fiber bundle of the 3-sphere over the 2-sphere, with 1-spheres as fibers
similar properties, but different from the Hopf fibrations, were used by John Milnor to construct exotic spheres. There is also a fibration of C P 2 n + 1 {\displaystyle
Hopf_fibration
Concept in topology
M. (1976). Differential topology. Springer-Verlag. ISBN 0-387-90148-5. Milnor, J.W. (1997). Topology from the Differentiable Viewpoint. Princeton University
Degree of a continuous mapping
Degree_of_a_continuous_mapping
Mandelbar Set
by W. D. Crowe, R. Hasson, P. J. Rippon, and P. E. D. Strain-Clark. John Milnor found tricorn-like sets as a prototypical configuration in the parameter
Tricorn_(mathematics)
Branch of mathematics
module Milnor's theorem on Kan complexes Fibration of simplicial sets Shape theory Absolute neighborhood retract May, Ch. 8. § 3. May, Ch 4. § 5. Milnor 1959
Homotopy_theory
Isomorphism of differentiable manifolds
example was constructed by John Milnor in dimension 7. He constructed a smooth 7-dimensional manifold (called now Milnor's sphere) that is homeomorphic to
Diffeomorphism
Algebra term
field Milnor & Husemoller (1973) p. 14 Lorenz (2008) p. 30 Milnor & Husemoller (1973) p. 65 Milnor & Husemoller (1973) p. 66 Lorenz (2008) p. 37 Milnor &
Witt_group
Set of topological invariants
Milnor & Stasheff 74; Chapter 4, Axiom 4 and Example 2 Milnor & Stasheff 74, before Lemma 4.1 on p. 40 Lawson & Michelson 90, Equation (B.8) Milnor &
Stiefel–Whitney_class
Topological space that locally resembles Euclidean space
analogues of the Poincaré conjecture, had been done earlier by René Thom, John Milnor, Stephen Smale and Sergei Novikov. A very pervasive and flexible technique
Manifold
Quadratic polynomial
complex quadratic mappings Mandelbrot set Julia set Milnor–Thurston kneading theory Tent map Logistic map Poirier, Alfredo (1993). "On postcritically finite
Complex_quadratic_polynomial
2π times turning number of a curve
the knot. This invariant has the value 2π for the unknot, but by the Fáry–Milnor theorem it is at least 4π for any other knot. Chen, Bang-Yen (2000), "Riemannian
Total_curvature
Journalistic adage on questions in headlines
sparingly. Freelance writer R. Thomas Berner calls them "gimmickry". Grant Milnor Hyde observed that they give the impression of uncertainty in a newspaper's
Betteridge's_law_of_headlines
Characteristic class of oriented, real vector bundles
Stasheff 74, Property 9.7 Milnor & Stasheff 74, Property 9.3 Milnor & Stasheff 74, Property 9.5 Milnor & Stasheff 74, Property 9.3 Milnor & Stasheff 74, Corollary
Euler_class
Theorem in topology
MR 1454127. Milnor, John W. (1965). Topology from the differentiable viewpoint. Charlottesville: University Press of Virginia. MR 0226651. Milnor, John W
Brouwer_fixed-point_theorem
Poem found graffitied in Pompeii
Pitts & Hallett 2022, p. 290. Milnor 2014, pp. 196, 226. Milnor 2014, p. 197. Milnor 2014, p. 198. Milnor 2014, p. 219. Milnor 2014, p. 199. Graverini 2014
CIL_4.5296
Fractal named after mathematician Benoit Mandelbrot
2 + c {\displaystyle z\mapsto {\bar {z}}^{2}+c} . It was encountered by Milnor in his study of parameter slices of real cubic polynomials.[citation needed]
Mandelbrot_set
Invariant of algebraic varieties and of more general schemes
K_{j}^{M}(k)\cong H^{j}(k,\mathbf {Z} (j)),} where KjM(k) is the jth Milnor K-group of k. Since Milnor K-theory of a field is defined explicitly by generators and
Motivic_cohomology
Theorem in algebraic geometry
algebraically closed fields of positive characteristic by Pierre Deligne (1980). Milnor 1963, Theorem 7.3 and Corollary 7.4 Voisin 2003, Theorem 1.23 Lefschetz
Lefschetz_hyperplane_theorem
Mathematics of smooth surfaces
216–224. Gray, Abbena & Salamon 2006, p. 386. Berger 2004; Wilson 2008; Milnor 1963. Eisenhart 2004, p. 131; Berger 2004, p. 39; do Carmo 2016, p. 248;
Differential geometry of surfaces
Differential_geometry_of_surfaces
Topological degree is the only homotopy invariant of continuous maps to spheres
) {\displaystyle \deg(f)=\deg(g)} if and only if f and g are homotopic. Milnor, John W. (1997). Topology from the Differentiable Viewpoint. Princeton University
Hopf_theorem
American mathematician
Weinstein (1934–2002, née Savanuck, also published as Tilla Klotz and Tilla K. Milnor) was an American mathematician known for her mentorship of younger women
Tilla_Weinstein
Type of topological space
then Hom(X,Y) is homotopy equivalent to a CW complex by a theorem of John Milnor (1959). Note that X and Y are compactly generated Hausdorff spaces, so Hom(X
CW_complex
Scalar-valued bilinear function
Algebra, vol. I (2nd ed.), Courier Corporation, ISBN 978-0-486-47189-1 Milnor, J.; Husemoller, D. (1973), Symmetric Bilinear Forms, Ergebnisse der Mathematik
Bilinear_form
Unsolved problem in topology
University Press, pp. 195–224, ISBN 978-0-691-04937-3, MR 1747536 John Milnor and James D. Stasheff, Characteristic Classes, Annals of Mathematics Studies
Novikov_conjecture
Point where the derivative of a function is zero or undefined (in certain cases)
define the variety. Singular point of a curve Singularity theory Nullcline Milnor, John (1963). Morse Theory. Princeton University Press. ISBN 0-691-08008-9
Critical_point_(mathematics)
Tool in homological algebra
Miller spectral sequence converging to the mod p stable homology of a space. Milnor spectral sequence is another name for the bar spectral sequence. Moore spectral
Spectral_sequence
Proposition in mathematics that is unproven
is now known to be false. The non-manifold version was disproved by John Milnor in 1961 using Reidemeister torsion. The manifold version is true in dimensions
Conjecture
Theorem in mathematical analysis
in Mathematics. Vol. 139. Springer. pp. 531–534. ISBN 978-0-387-97926-7. Milnor, John W. (1965). Topology from a Differentiable Viewpoint. University of
Sard's_theorem
higher local reciprocity map which describes abelian extensions of the field in terms of open subgroups of finite index in the Milnor K-group of the field
Local_class_field_theory
map from pairs of elements of a number field to an abelian group satisfying some identities found by Mennicke (1965). They were named by Bass, Milnor
Mennicke_symbol
Manifold upon which it is possible to perform calculus
equivalent in the sense given above. This was originally discovered by John Milnor in the form of the exotic 7-spheres. Every one-dimensional connected smooth
Differentiable_manifold
Analysis of datasets using techniques from topology
methods in modern mathematics, Proceedings of the symposium in honor of John Milnor's sixtieth birthday held at the State University of New York, Stony Brook
Topological_data_analysis
How spheres of various dimensions can wrap around each other
therefore by the work of Kervaire-Milnor, the sphere S56 has a unique smooth structure. The Kahn–Priddy map induces a map of Adams spectral sequences from
Homotopy_groups_of_spheres
Branch of mathematics
Dupont (2005), Théorème 1. Milnor (2006), problem 14-2. Zdunik (1990), Theorem 2; Berteloot & Dupont (2005), introduction. Milnor (2006), problem 5-3. Cantat
Complex_dynamics
Components of the Fatou set
theorem John Domains Basins of attraction wikibooks : parabolic Julia sets Milnor, John W. (1990), Dynamics in one complex variable, arXiv:math/9201272, Bibcode:1992math
Classification of Fatou components
Classification_of_Fatou_components
Branch of mathematics studying (smooth) functions of manifolds
spheres by Kervaire and Milnor (1963) led to the emergence of surgery theory as a major tool in high-dimensional topology. Category:Maps of manifolds List of
Geometric_topology
Characteristic classes of vector bundles
symmetric polynomials in α i {\displaystyle \alpha _{i}} 's. Milnor & Stasheff 74, Lemma 14.2 Milnor & Stasheff 74, Equation (14.7) Lawson & Michelson 90, Equation
Chern_class
Algebraic construct classifying topological spaces
S O ( 4 ) ) {\displaystyle \pi _{4}(\mathrm {SO} (4))} has two-torsion. Milnor used the fact π 3 ( S O ( 4 ) ) = Z ⊕ Z {\displaystyle \pi _{3}(\mathrm
Homotopy_group
Concept in linear algebra
Berlin, New York: Springer-Verlag, ISBN 978-0-387-90093-3, Zbl 0288.15002 Milnor, J.; Husemoller, D. (1973), Symmetric Bilinear Forms, Ergebnisse der Mathematik
Orthogonal_complement
Limiting set in dynamical systems
(2004). Nonlinear time series analysis. Cambridge university press. John Milnor (1985). "On the concept of attractor". Communications in Mathematical Physics
Attractor
Algebraic structure used in analysis
ISBN 0-691-09089-0, MR 1880691 Milnor, John (2010) [1986], "Remarks on infinite-dimensional Lie groups", Collected Papers of John Milnor, vol. 5, American Mathematical
Lie_algebra
Polynomial with all terms of degree two
American Mathematical Society. ISBN 0-8218-1095-2. MR 2104929. Zbl 1068.11023. Milnor, J.; Husemoller, D. (1973). Symmetric Bilinear Forms. Ergebnisse der Mathematik
Quadratic_form
Algebra in algebraic topology
(graded) linear dual A ∗ {\displaystyle A_{*}} of A into an algebra. John Milnor (1958) proved, for p = 2 {\displaystyle p=2} , that A ∗ {\displaystyle A_{*}}
Steenrod_algebra
Smooth manifold with an inner product on each tangent space
x_{n-1}+y_{n}x_{n-1},x_{n}y_{n}).} Lee 2018, Example 3.16f. Lee 2018, p. 72; Milnor 1976. Kobayashi & Nomizu 1963, Theorem IV.4.5. Besse 1987, Section 7C. Petersen
Riemannian_manifold
American mathematician and Nobel Laureate (1928–2015)
2307/1969840. JSTOR 1969840. MR 0065993. Zbl 0058.37703. Kalisch, G. K.; Milnor, J. W.; Nash, J. F.; Nering, E. D. (1954). "Some experimental n-person games"
John_Forbes_Nash_Jr.
American mathematician (1946–2012)
Automatic group Cannon–Thurston map Circle packing theorem Hyperbolic volume Hyperbolic Dehn surgery Thurston boundary Milnor–Thurston kneading theory Misiurewicz–Thurston
William_Thurston
Mathematical constants related to chaotic behavior
Lyubich, Mikhail (1999). "Feigenbaum-Coullet-Tresser universality and Milnor's Hairiness Conjecture". Annals of Mathematics. 149 (2): 319–420. arXiv:math/9903201
Feigenbaum_constants
Tangent spaces of a manifold
for all n, but parallelizable only for n = 1, 3, 7 (by results of Bott-Milnor and Kervaire). One of the main roles of the tangent bundle is to provide
Tangent_bundle
Theorem in differential topology
Domingo (eds.), Collected Papers, Boston: Birkhäuser, ISBN 0-8176-3560-2 Milnor, John (1965), Lectures on the h-cobordism theorem, Princeton University
Whitney_embedding_theorem
under topological conjugation. The Milnor–Thurston theorem states that the Artin–Mazur zeta function of an interval map f {\displaystyle f} is the inverse
Artin–Mazur_zeta_function
American mathematician
dimensional counterexample to the Milnor Conjecture, Arxiv 2023 with Daniele Valtorta: Energy Identity for Stationary Harmonic Maps, Arxiv 2023 with Nicholas
Aaron_Naber
Mathematical space with a notion of distance
group theory: the Švarc–Milnor lemma states that all spaces on which a group acts geometrically are quasi-isometric. Formally, the map f : M 1 → M 2 {\displaystyle
Metric_space
Mathematical space
Example 1.36. Shafarevich 2013, p. 42, Example 1.24. Milnor & Stasheff (1974), pp. 57–59. Milnor & Stasheff 1974. Grothendieck, Alexander (1971). Éléments
Grassmannian
U.S. House district for Pennsylvania
state congressional district map was redrawn by the Supreme Court of Pennsylvania in February 2018 after ruling the previous map unconstitutional due to partisan
Pennsylvania's 1st congressional district
Pennsylvania's_1st_congressional_district
Fractal sets in complex dynamics of mathematics
d'Orsay. 2; "[op.cit.]". Prépublications mathémathiques d'Orsay. 4. 1985. Milnor, J.W. (2006) [1990]. Dynamics in One Complex Variable. Annals of Mathematics
Julia_set
Discrete valuation field
residue field level, using the border map of Milnor K-theory to create a commutative diagram involving the reciprocity map on the level of the field and the
Higher_local_field
Hospital in Hawaii, United States
practice had grown to the point that he recruited an assistant, Guy C. Milnor. Straub envisioned a clinic providing specialized care in five major fields:
Straub_Benioff_Medical_Center
Iwasa, Ryomei; Kelly, Shane (2020-09-23). "Cdh descent, cdarc descent, and Milnor excision". Mathematische Annalen. arXiv:2002.11647. doi:10.1007/s00208-020-02083-5
V-topology
Topological invariant in mathematics
Fowler, P.W. & Manolopoulos, D.E. (1995). An Atlas of Fullerenes. p. 32. Milnor, J.W. & Stasheff, James D. (1974). Characteristic Classes. Princeton University
Euler_characteristic
Algebraic structure with addition, multiplication, and division
be reinterpreted as a Galois cohomology group, namely Br(F) = H2(F, Gm). Milnor K-theory is defined as K n M ( F ) = F × ⊗ ⋯ ⊗ F × / ⟨ x ⊗ ( 1 − x ) ∣ x
Field_(mathematics)
How many times curves wind around each other
for two linked circles; given three or more circles, one can define the Milnor invariants, which are a numerical invariant generalizing linking number
Linking_number
Continuous, position-preserving mapping from a topological space into a subspace
ANR. Every ANR has the homotopy type of a CW complex, by Whitehead and Milnor. Moreover, a locally compact ANR has the homotopy type of a locally finite
Retraction_(topology)
cocommutative Hopf algebra over a field of characteristic zero, then the Milnor–Moore theorem states the universal enveloping algebra of the graded Lie
Primitive element (co-algebra)
Primitive_element_(co-algebra)
Ring in abstract algebra
Macdonald 1969, Theorems 8.5 Atiyah & Macdonald 1969, Ch. 8, Exercise 2 Milnor 1971, p. 144 Auslander, Maurice; Reiten, Idun; Smalø, Sverre O. (1995),
Artinian_ring
Branch of mathematics
&&\uparrow \\\mathbb {C} &\leftarrow &\mathbb {C} \{s\}\end{matrix}}} In fact, Milnor studied such deformations, where a singularity is deformed by a constant
Deformation_(mathematics)
Function used in local class field theory related to reciprocity laws
symbol is an example of a Steinberg symbol and thus factors over the second Milnor K-group K 2 M ( K ) {\displaystyle K_{2}^{M}(K)} , which is by definition
Hilbert_symbol
Langlands–Shelstad fundamental lemma (Ngô Bảo Châu and Gérard Laumon, 2004) Milnor conjecture (Vladimir Voevodsky, 2003) Kirillov's conjecture (Ehud Baruch
List of unsolved problems in mathematics
List_of_unsolved_problems_in_mathematics
County in North Dakota, United States
only lasted until October 8, when the county government was effected, with Milnor as the county seat. However, in 1884, in the county's first election, Forman
Sargent_County,_North_Dakota
Type of mathematical curve
Bonifant & Milnor 2017, Equations (13) and (14). Bonifant & Milnor 2017, Theorem 2.12. Bonifant & Milnor 2017, Theorem 3.1. Bonifant & Milnor 2017, Fig
Cubic_plane_curve
Result due to Kummer on cyclic extensions of fields that leads to Kummer theory
There is yet another generalization to Milnor K-theory which plays a role in Voevodsky's proof of the Milnor conjecture. Let L / K {\displaystyle L/K}
Hilbert's_Theorem_90
Branch of mathematics
Jean Leray Saunders Mac Lane Mark Mahowald J. Peter May Barry Mazur John Milnor John Coleman Moore Jack Morava Joseph Neisendorfer Emmy Noether Sergei Novikov
Algebraic_topology
Tool in algebraic topology
) (Bredon 1997, Theorem III.1.1.) (Godement 1973, II.5.12.) (Barratt & Milnor 1962) (Iversen 1986, Theorem II.3.5.) (Iversen 1986, II.3.6.) (Bredon 1997
Sheaf_cohomology
odd Chern classes of E have order 2. Holomorphic vector bundle K-theory Milnor, John Willard; Stasheff, James D. (1974), Characteristic classes, Annals
Complex_vector_bundle
Application of homotopy to algebraic varieties
construction of the derived category of mixed motives and the proof of the Milnor and Bloch-Kato conjectures. It has also recently revolutionized the theory
A¹_homotopy_theory
From a homotopy group of a special orthogonal group to a homotopy group of spheres
Manifolds, San Diego, CA: Academic Press, pp. 195ff, ISBN 0-12-421850-4 Milnor, John W. (2011), "Differential topology forty-six years later" (PDF), Notices
J-homomorphism
Group of 𝑛 × 𝑛 invertible matrices
and Algebraic Combinatorics. Springer. p. 142. ISBN 978-1-4939-0938-4. Milnor, John Willard (1971). Introduction to algebraic K-theory. Annals of Mathematics
General_linear_group
Concept in mathematics
Mathematics. Vol. 136. Springer-Verlag. ISBN 3-540-97839-9. Zbl 0768.00003. Milnor, J.; Husemoller, D. (1973). Symmetric Bilinear Forms. Ergebnisse der Mathematik
Symmetric_bilinear_form
MILNOR MAP
MILNOR MAP
Male
English
English surname transferred to forename use, form the name of various places, most of which were derived from the Old English word mylentun, MILTON means "mill settlement."
Female
English
Variant spelling of English Eleanor, ELINOR means "foreign; the other."
Girl/Female
French
Darling ('mignon' in French). Delicate.
Boy/Male
Czechoslovakian
Miller.
Surname or Lastname
English
English : variant spelling of Milner.
Surname or Lastname
English
English : variant of Melson.
Surname or Lastname
English
English : habitational name from places in Lancashire, West Yorkshire, and Derbyshire, earlier recorded as Melver, and named from ancient British words that are ancestors of Welsh moel ‘bare’ + bre ‘hill’.
Surname or Lastname
English (Devon)
English (Devon) : habitational name from any of numerous places, for example in Derbyshire, Devon, Hampshire, Norfolk, Staffordshire, and Surrey, named in Old English as ‘mill ford’, from mylen ‘mill’ (see Mill) + ford ‘ford’.Irish : Anglicized form of Gaelic Ó Maolfhoghmhair ‘descendant of Maolgfhoghmhair’, a personal name meaning ‘chief of harvest’. The Gaelic name was first Anglicized as Mullover, which was later assimilated to Milford.
Surname or Lastname
English (of Norman origin)
English (of Norman origin) : from a derivative of the Continental Germanic personal name Maginhari, composed of the elements magin ‘strength’, ‘might’ + hari ‘army’.
Female
Persian/Iranian
(مینو) Persian name MINOO means "heaven, paradise."
Male
Japanese
(里) Japanese name MINORU means "truth."
Surname or Lastname
English
English : variant of Mills. Compare Milner.
Female
English
English name derived from the French word mignon, MIGNON means "charming, delicate, pretty."Â
Surname or Lastname
English (northern and eastern)
English (northern and eastern) : variant spelling of Milner.
Boy/Male
English American
From the mill farm. Famous Bearer: 17th century British poet, John Milton.
Surname or Lastname
English and Scottish
English and Scottish : occupational name for a miller. The standard modern vocabulary word represents the northern Middle English term, an agent derivative of mille ‘mill’, reinforced by Old Norse mylnari (see Milner). In southern, western, and central England Millward (literally, ‘mill keeper’) was the usual term.Southwestern and Swiss German and Jewish (Ashkenazic) : variant of Müller (see Mueller).
Surname or Lastname
English
English : variant spelling of Miner.German : nickname, meaning ‘small(er)’, from Latin minor ‘less’, ‘smaller’.French : nickname meaning ‘younger’, from the same word as in 2.
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 : occupational name for a potter or lime burner, from an agent derivative of Old English cylen(e) ‘kiln’.
Female
Japanese
(里) Japanese unisex name MINORI means "truth."
MILNOR MAP
MILNOR MAP
Boy/Male
Hindu
Welfare
Boy/Male
Hindu
Little king
Boy/Male
Arabic, Muslim
Skilled
Boy/Male
Australian, Danish, French, German, Norse, Norwegian, Swedish
Victorious Defender; Victory
Boy/Male
German, Swedish
Victory; Bright; Famous; Hardy Victory
Boy/Male
Tamil
Triambak | தà¯à®°à®¿à®‚பக
Lord Shiva
Boy/Male
Muslim
Little basilica flower
Female
German
Pet form of German Elfriede, ELFI means "elf strength."
Boy/Male
Hindu, Indian
Shiny; Fire
Female
French
Pet form of French Bernadine, BERNETTA means "bringer of victory."
MILNOR MAP
MILNOR MAP
MILNOR MAP
MILNOR MAP
MILNOR MAP
a.
Minor; in the minor mode; as, A moll, that is, A minor.
p. pr. & vb. n.
of Mirror
n.
A common American minnow (Fundulus majalis). See Minnow.
n.
Alt. of Signore
n.
The glass of a mirror; a mirror.
imp. & p. p.
of Mirror
n.
A Minorite; a Franciscan friar.
v. t.
To reflect, as in a mirror.
n.
A person of either sex who has not attained the age at which full civil rights are accorded; an infant; in England and the United States, one under twenty-one years of age.
n.
A small European woodpecker (Picus minor).
n.
See Minnow.
n.
The mud minnow.
n.
A minnow.
n.
The minor term, that is, the subject of the conclusion; also, the minor premise, that is, that premise which contains the minor term; in hypothetical syllogisms, the categorical premise. It is the second proposition of a regular syllogism, as in the following: Every act of injustice partakes of meanness; to take money from another by gaming is an act of injustice; therefore, the taking of money from another by gaming partakes of meanness.
n.
A minnow.
a.
Inferior in bulk, degree, importance, etc.; less; smaller; of little account; as, minor divisions of a body.
n.
The lesser spotted woodpecker (Dryobates minor).
a.
Less by a semitone in interval or difference of pitch; as, a minor third.
v. t.
To reflect, as in a mirror; to mirror; -- used reflexively.
n.
A moth or lepidopterous insect; -- so called because the wings appear as if covered with white dust or powder, like a miller's clothes. Called also moth miller.