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Mathematical parametrization of vector spaces by another space
In mathematics, a vector bundle is a topological construction that makes precise the idea of a family of vector spaces parameterized by another space
Vector_bundle
Defines a notion of parallel transport on a bundle
vector bundles, the Levi-Civita connection on the tangent bundle of a pseudo-Riemannian manifold, which gives a standard way to differentiate vector fields
Connection_(vector_bundle)
Tangent spaces of a manifold
tangent bundle of a differentiable manifold M {\displaystyle M} is a manifold T M {\displaystyle TM} which assembles all the tangent vectors in M {\displaystyle
Tangent_bundle
Right inverse of a fiber bundle map
classes. For example, a principal bundle has a global section if and only if it is trivial. On the other hand, a vector bundle always has a global section,
Section_(fiber_bundle)
Complex vector bundle on a complex manifold
In mathematics, a holomorphic vector bundle is a complex vector bundle over a complex manifold X such that the total space E is a complex manifold and
Holomorphic_vector_bundle
complex vector bundle is a vector bundle whose fibers are complex vector spaces. Any complex vector bundle can be viewed as a real vector bundle through
Complex_vector_bundle
Continuous surjection satisfying a local triviality condition
bundle I-bundle Natural bundle Principal bundle Projective bundle Pullback bundle Quasifibration Universal bundle Vector bundle Wu–Yang dictionary Seifert
Fiber_bundle
System of moving vectors in differential geometry
covariant derivative or connection on the tangent bundle), then this connection allows one to transport vectors of the manifold along curves so that they stay
Parallel_transport
Fiber bundle whose fibers are group torsors
principal bundle is the frame bundle F ( E ) {\displaystyle F(E)} of a vector bundle E {\displaystyle E} , which consists of all ordered bases of the vector space
Principal_bundle
Principal bundle associated to a vector bundle
In mathematics, a frame bundle is a principal fiber bundle F ( E ) {\displaystyle F(E)} associated with any vector bundle E {\displaystyle E} . The fiber
Frame_bundle
Algebraic structure in linear algebra
algebra. A vector bundle is a family of vector spaces parametrized continuously by a topological space X. More precisely, a vector bundle over X is a
Vector_space
Generalization of vector bundles
information. Coherent sheaves can be seen as a generalization of vector bundles. Unlike vector bundles, they form an abelian category, and so they are closed under
Coherent_sheaf
Set of topological invariants
invariants of a real vector bundle that describe the obstructions to constructing everywhere independent sets of sections of the vector bundle. Stiefel–Whitney
Stiefel–Whitney_class
Vector bundle existing over a Grassmannian
In mathematics, the tautological bundle is a vector bundle occurring over a Grassmannian in a natural tautological way: for a Grassmannian of k {\displaystyle
Tautological_bundle
Study of vector bundles, principal bundles, and fibre bundles
gauge theory is the general study of connections on vector bundles, principal bundles, and fibre bundles. Gauge theory in mathematics should not be confused
Gauge_theory_(mathematics)
Vector bundle of rank 1
tangent bundle is a way of organising these. More formally, in algebraic topology and differential topology, a line bundle is defined as a vector bundle of
Line_bundle
Concept in mathematics
a field of mathematics, a normal bundle is a particular kind of vector bundle, complementary to the tangent bundle, and coming from an embedding (or
Normal_bundle
Generalization of an orientation of a vector space
orientation of a real vector bundle is a generalization of an orientation of a vector space; thus, given a real vector bundle π: E →B, an orientation
Orientation of a vector bundle
Orientation_of_a_vector_bundle
Term in differential geometry
canonical vector-valued 1-form on the frame bundle, the torsion Θ {\displaystyle \Theta } of the connection form ω {\displaystyle \omega } is the vector-valued
Curvature_form
vector bundle is a (holomorphic or algebraic) vector bundle that is stable in the sense of geometric invariant theory. Any holomorphic vector bundle may
Stable_vector_bundle
Geometric structure
g ) , {\displaystyle (M,g),\,} one defines the spinor bundle to be the complex vector bundle π S : S → M {\displaystyle \pi _{\mathbf {S} }\colon {\mathbf
Spinor_bundle
Mathematical concept in particularly differential topology
secondary vector bundle structure refers to the natural vector bundle structure (TE, p∗, TM) on the total space TE of the tangent bundle of a smooth vector bundle
Secondary vector bundle structure
Secondary_vector_bundle_structure
Structure defining distance on a manifold
Sg defines a section of the bundle Hom(TM, T*M) of vector bundle isomorphisms of the tangent bundle to the cotangent bundle. This section has the same
Metric_tensor
Differential geometry construct on fiber bundles
on any smooth fiber bundle. In particular, it does not rely on the possible vector bundle structure of the underlying fiber bundle, but nevertheless, linear
Ehresmann_connection
Math/physics concept
covariant derivative. A connection form associates to each basis of a vector bundle a matrix of differential forms. The connection form is not tensorial
Connection_form
Fiber bundle whose fibers are projective spaces
projective bundle is of the form P ( E ) {\displaystyle \mathbb {P} (E)} for some vector bundle (locally free sheaf) E. Every vector bundle over a variety
Projective_bundle
In mathematics, a double vector bundle is the combination of two compatible vector bundle structures, which contains in particular the tangent T E {\displaystyle
Double_vector_bundle
Concept in algebraic geometry
The pullback of a vector bundle is a vector bundle of the same rank. In particular, the pullback of a line bundle is a line bundle. (Briefly, the fiber
Ample_line_bundle
Generalization of a fiber bundle
alike, unlike fiber bundles, where the fibers must all be isomorphic (in the case of vector bundles) and homeomorphic. A bundle is a triple (E, p, B)
Bundle_(mathematics)
Mathematics concept
vertical bundle and the horizontal bundle are vector bundles associated to a smooth fiber bundle. More precisely, given a smooth fiber bundle π : E → B
Vertical and horizontal bundles
Vertical_and_horizontal_bundles
Type of vector bundle
In mathematics, a Higgs bundle is a pair ( E , φ ) {\displaystyle (E,\varphi )} consisting of a holomorphic vector bundle E and a Higgs field φ {\displaystyle
Higgs_bundle
Vector bundle of cotangent spaces at every point in a manifold
mathematics, especially differential geometry, the cotangent bundle of a smooth manifold is the vector bundle of all the cotangent spaces at every point in the manifold
Cotangent_bundle
Correspondsnce between Higgs bundles and fundamental group representations
Narasimhan–Seshadri theorem which defines a correspondence between stable vector bundles and unitary representations of the fundamental group of a compact Riemann
Nonabelian Hodge correspondence
Nonabelian_Hodge_correspondence
Isomorphism between the tangent and cotangent bundles of a manifold
tangent bundle and cotangent bundle of a (pseudo-)Riemannian manifold ( M , g ) {\displaystyle (M,g)} . They are canonical isomorphisms of vector bundles that
Musical_isomorphism
Construction for vector bundles
geometry, the determinant line bundle is a construction, which assigns every vector bundle over paracompact spaces a line bundle. Its name comes from using
Determinant_line_bundle
Branch of mathematics
mathematics, K-theory is, roughly speaking, the study of a ring generated by vector bundles over a topological space or scheme. In algebraic topology, it is a cohomology
K-theory
Characteristic classes of vector bundles
the Chern classes are characteristic classes associated with complex vector bundles. They have since become fundamental concepts in many branches of mathematics
Chern_class
Assignment of a vector to each point in a subset of Euclidean space
setting, a vector field gives a tangent vector at each point of the manifold (that is, a section of the tangent bundle to the manifold). Vector fields are
Vector_field
Construct allowing differentiation of tangent vector fields of manifolds
the simplest methods of defining differentiation of the sections of vector bundles. The notion of an affine connection has its roots in 19th-century geometry
Affine_connection
Concept in differential geometry
holonomy of connections in vector bundles, holonomy of Cartan connections, and holonomy of connections in principal bundles. In each of these cases, the
Holonomy
Concept in mathematics
any fiber bundle associated to P {\displaystyle P} via the associated bundle construction. In particular, on any associated vector bundle the principal
Connection_(principal_bundle)
Assignment of a tensor continuously varying across a region of space
the fiber is a vector space and the tensor bundle is a special kind of vector bundle. The vector bundle is a natural idea of "vector space depending
Tensor_field
In mathematics, a vector bundle is said to be flat if it is endowed with a linear connection with vanishing curvature, i.e. a flat connection. Let π :
Flat_vector_bundle
Function in mathematics
defines directional derivative for sections of a vector bundle more general than the tangent bundle. Connections also lead to convenient formulations
Connection_(mathematics)
Construct in differenital geometry
a connection in a vector bundle E equipped with a bundle metric; that is, a metric for which the inner product of any two vectors will remain the same
Metric_connection
In mathematics, vector bundles on algebraic curves may be studied as holomorphic vector bundles on compact Riemann surfaces, which is the classical approach
Vector bundles on algebraic curves
Vector_bundles_on_algebraic_curves
Characteristic class of oriented, real vector bundles
oriented, real vector bundles. Like other characteristic classes, it measures how "twisted" the vector bundle is. In the case of the tangent bundle of a smooth
Euler_class
Elliptic differential operators in geometry mathematics
be a compact, oriented manifold equipped with a metric. Let E be a vector bundle over M equipped with a fiber metric and a compatible connection, ∇ {\displaystyle
Laplace operators in differential geometry
Laplace_operators_in_differential_geometry
a Chern connection associated to an inner product on a holomorphic vector bundle over a Kähler manifold that satisfies an analogue of Einstein's equations:
Hermitian Yang–Mills connection
Hermitian_Yang–Mills_connection
Topological space associated to a vector bundle
topology and differential topology is a topological space associated to a vector bundle, over any paracompact space. One way to construct this space is as follows
Thom_space
Type of vector bundle
In mathematics, an essentially finite vector bundle is a particular type of vector bundle defined by Madhav V. Nori, as the main tool in the construction
Essentially finite vector bundle
Essentially_finite_vector_bundle
{\displaystyle n} , its tangent bundle as a smooth vector bundle is a real rank 2 n {\displaystyle 2n} vector bundle T M {\displaystyle TM} on M {\displaystyle
Holomorphic_tangent_bundle
Vector bundles theorem
Donaldson–Uhlenbeck–Yau theorem) relates stable vector bundles over a complex manifold to Einstein–Hermitian vector bundles. The correspondence is named after Shoshichi
Kobayashi–Hitchin correspondence
Kobayashi–Hitchin_correspondence
Mathematical operation on vector bundles
the dual bundle is an operation on vector bundles extending the operation of duality for vector spaces. The dual bundle of a vector bundle π : E → X
Dual_bundle
Theorem in algebraic geometry
varieties, proved by Jean-Pierre Serre. The basic version applies to vector bundles on a smooth projective variety, but Alexander Grothendieck found wide
Serre_duality
Partial differential equations whose solutions are instantons
system of partial differential equations for a connection on a vector bundle or principal bundle. They arise in physics as the Euler–Lagrange equations of
Yang–Mills_equations
Mathematical technique for vector bundles
technique used to reduce questions about vector bundles to the case of line bundles. In the theory of vector bundles, one often wishes to simplify computations
Splitting_principle
values in some vector bundle E over M. Ordinary differential forms can be viewed as R-valued differential forms. An important case of vector-valued differential
Vector-valued differential form
Vector-valued_differential_form
In conformal geometry, the tractor bundle is a particular vector bundle constructed on a conformal manifold whose fibres form an effective representation
Tractor_bundle
Special type of principal bundle
} Unlike the associated vector bundle, a complex plane bundle, the adjoint vector bundle is a orientable real vector bundle of third rank. Also since
Principal_SU(2)-bundle
Possibility of a consistent definition of "clockwise" in a mathematical space
also be expressed in terms of the tangent bundle. The tangent bundle is a vector bundle, so it is a fiber bundle with structure group GL ( n , R ) {\displaystyle
Orientability
Mathematical operation
N} is a smooth map, then the pullback bundle ϕ ∗ E {\displaystyle \phi ^{*}E} is a vector bundle (or fiber bundle) over M {\displaystyle M} whose fiber
Pullback (differential geometry)
Pullback_(differential_geometry)
Concept in differential geometry
tangent bundle TM.) The bundle of spinors πS: S → M over M is then the complex vector bundle associated with the corresponding principal bundle πP: P →
Spin_structure
Concept in differential geometry
differentiable principal bundle or vector bundle with a connection. Let G be a Lie group and P → M be a principal G-bundle on a smooth manifold M. Suppose
Exterior_covariant_derivative
Infinitesimal version of Lie groupoid
In mathematics, a Lie algebroid is a vector bundle A → M {\displaystyle A\rightarrow M} together with a Lie bracket on its space of sections Γ ( A ) {\displaystyle
Lie_algebroid
Concept in mathematics
representation: for each vector v in V, there is a finite-dimensional G-submodule of V that contains v. A definition is simpler for a vector bundle (i.e., a variety
Equivariant_sheaf
Mathematical result in differential geometry
symbol of a differential operator between two vector bundles E and F is a section of the pullback of the bundle Hom(E, F) to the cotangent space of X. The
Atiyah–Singer_index_theorem
Structure group sub-bundle on a tangent frame bundle
{\displaystyle GL(n)} -bundle, the frame bundle. In particular, every smooth manifold has a canonical vector bundle, the tangent bundle. For a Lie group G
G-structure_on_a_manifold
Mathematical theory
Chern–Weil theory that computes topological invariants of vector bundles and principal bundles on a smooth manifold M in terms of connections and curvature
Chern–Weil_homomorphism
Geometric space whose points represent algebro-geometric objects of some fixed kind
physics, the number of moduli of vector bundles and the closely related problem of the number of moduli of principal G-bundles has been found to be significant
Moduli_space
vector bundles E, F (over the same space X) is a vector bundle, denoted by E ⊗ F, whose fiber over each point x ∈ X is the tensor product of vector spaces
Tensor_product_bundle
Characteristic class for real vector bundles
classes of real vector bundles. The Pontryagin classes lie in cohomology groups with degrees a multiple of four. Given a real vector bundle E {\displaystyle
Pontryagin_class
Result in algebraic geometry
for line bundles on compact Riemann surfaces. Riemann–Roch type theorems relate Euler characteristics of the cohomology of a vector bundle with their
Grothendieck–Riemann–Roch theorem
Grothendieck–Riemann–Roch_theorem
Specification of a derivative along a tangent vector of a manifold
covariant differentiation in a vector bundle by means of what is known today as a Koszul connection or a connection on a vector bundle. Using ideas from Lie algebra
Covariant_derivative
Relates the geometric vector bundles to algebraic projective modules
theorem, also called Swan's theorem, relates the geometric notion of vector bundles to the algebraic concept of projective modules and gives rise to a common
Serre–Swan_theorem
Type of vector bundle
In mathematics, a Nori semistable vector bundle is a particular type of vector bundle whose first definition has been first implicitly suggested by Madhav
Nori-semistable_vector_bundle
Concept in algebraic geometry
canonical bundle of a non-singular algebraic variety V {\displaystyle V} of dimension n {\displaystyle n} over a field is the line bundle Ω n = ω {\displaystyle
Canonical_bundle
Fiber bundle
\mathrm {SL} (n)} . Given a smooth manifold, its tangent bundle, or more generally, a vector bundle of rank n {\displaystyle n} over it, is also a principal
Associated_bundle
Superconductivity theory
Ginzburg–Landau functional can be formulated in the general setting of a complex vector bundle over a compact Riemannian manifold. This is the same functional as given
Ginzburg–Landau_theory
Generalization of a vector bundle
In algebraic geometry, a cone is a generalization of a vector bundle. Specifically, given a scheme X, the relative Spec C = Spec X R {\displaystyle
Cone_(algebraic_geometry)
Special type of principal bundle
{\displaystyle \operatorname {U} (1)} -bundle E ↠ B {\displaystyle E\twoheadrightarrow B} , there is an associated vector bundle E × U ( 1 ) C ↠ B {\displaystyle
Principal_U(1)-bundle
Algebraic object with geometric applications
projective modules is treated. The global sections of sections of a vector bundle over a compact space form a projective module over the ring of smooth
Tensor
Branch of mathematics
considerable interest in physics. The apparatus of vector bundles, principal bundles, and connections on bundles plays an extraordinarily important role in modern
Differential_geometry
a vector bundle, often viewed as a differential operator (a Koszul connection or covariant derivative); a principal connection on the frame bundle of
Linear_connection
Concept in mathematics
is a manifold. As such, the fiber is a vector space and the tensor bundle is a special kind of vector bundle. Lee, John M. (2012). Introduction to Smooth
Tensor_bundle
Operation in differential geometry
E)} form a vector bundle over M, the k-th-order jet bundle of E, denoted by Jk(E). Example: The first-order jet bundle of the tangent bundle. We work in
Jet_(mathematics)
Broad concept generalizing scalars in mathematics and physics
three-dimensional linear algebra and vector calculus Vector bundle, a topological construction that makes precise the idea of a family of vector spaces parameterized
Vector (mathematics and physics)
Vector_(mathematics_and_physics)
geometry, a stable principal bundle is a generalisation of the notion of a stable vector bundle to the setting of principal bundles. The concept of stability
Stable_principal_bundle
the second order jet bundle. Since (TM,πTM,M) is a vector bundle in its own right, its tangent bundle has the secondary vector bundle structure (TTM,(πTM)*
Double_tangent_bundle
Way to create new manifolds out of disk bundles
i , p i ) {\displaystyle \xi _{i}=(E_{i},M_{i},p_{i})} be a rank n vector bundle over an n-dimensional smooth manifold M i {\displaystyle M_{i}} for
Plumbing_(mathematics)
Mathematical concept that extends the intuitive idea of gluing in topology
descent implies a vector bundle on Y (so, a bundle given on each Xi), and our concern is to 'glue' those bundles Vi, to make a single bundle V on X. What we
Descent_(mathematics)
connection ∇ {\displaystyle \nabla } is a connection on a Hermitian vector bundle E {\displaystyle E} over a smooth manifold M {\displaystyle M} which
Hermitian_connection
British-Lebanese mathematician (1929–2019)
any vector bundle is a sum of (essentially unique) indecomposable vector bundles, and then showing that the space of indecomposable vector bundles of given
Michael_Atiyah
On the Euler characteristic of a holomorphic vector bundle on a compact complex manifold
later. The Hirzebruch–Riemann–Roch theorem applies to any holomorphic vector bundle E on a compact complex manifold X, to calculate the holomorphic Euler
Hirzebruch–Riemann–Roch theorem
Hirzebruch–Riemann–Roch_theorem
Branch of algebraic topology
K-theory is a branch of algebraic topology. It was founded to study vector bundles on topological spaces, by means of ideas now recognised as (general)
Topological_K-theory
can be extended to an arbitrary vector bundle, and to some principal fiber bundles. This metric is often called a bundle metric, or fibre metric. If M is
Bundle_metric
Mathematical term
forms of degree (p,q). Let Ω p , q {\displaystyle \Omega ^{p,q}} be the vector bundle of complex differential forms of degree ( p , q ) {\displaystyle (p
Dolbeault_cohomology
Non-tensorial representation of the spin group
symplectic manifold) has a Spinc structure. Likewise, every complex vector bundle on a manifold carries a Spinc structure. A number of Clebsch–Gordan
Spinor
Mathematical construct of fiber bundles
E. A linear isomorphism of vector bundles θ : TM → o*VE from the tangent bundle of M to the pullback of the vertical bundle of E along the distinguished
Solder_form
Concept in mathematics
In mathematics, a Banach bundle is a vector bundle each of whose fibres is a Banach space, i.e. a complete normed vector space, possibly of infinite dimension
Banach_bundle
VECTOR BUNDLE
VECTOR BUNDLE
Boy/Male
American, Australian, British, Chinese, Christian, Danish, Dutch, English, French, German, Greek, Italian, Latin, Portuguese, Shakespearean, Spanish
Steadfast; Anchor; Holds Fast; Star; Coined from Esther Vanhomrigh; Tenacious; Defend; Hold Fast; Coined from Esther Vanho
Male
Arthurian
, sir Hector de Maris; (defender).
Boy/Male
Christian & English(British/American/Australian)
Conqueror
Male
Portuguese
Portuguese form of Latin Hector, HEITOR means "defend; hold fast."
Surname or Lastname
Scottish
Scottish : Anglicized form of the Gaelic personal name Eachann (earlier Eachdonn, already confused with Norse Haakon), composed of the elements each ‘horse’ + donn ‘brown’.English : found in Yorkshire and Scotland, where it may derive directly from the medieval personal name. According to medieval legend, Britain derived its name from being founded by Brutus, a Trojan exile, and Hector was occasionally chosen as a personal name, as it was the name of the Trojan king’s eldest son. The classical Greek name, HektÅr, is probably an agent derivative of Greek ekhein ‘to hold back’, ‘hold in check’, hence ‘protector of the city’.German, French, and Dutch : from the personal name (see 2 above). In medieval Germany, this was a fairly popular personal name among the nobility, derived from classical literature. It is a comparatively rare surname in France.
Male
English
 Anglicized form of Scottish Gaelic Eachann, HECTOR means "brown horse." Compare with another form of Hector.
Male
Greek
(á¼ÎºÏ„ωÏ) Variant spelling of Greek Hektor, EKTOR means "defend; hold fast."
Boy/Male
American, British, Christian, Danish, Dutch, English, Finnish, French, German, Greek, Hindu, Indian, Irish, Jamaican, Latin, Romanian, Slovenia, Spanish, Swedish, Swiss, Tamil, Ukrainian
Victorious; Conqueror; Winner; Champion; One who Conquers; Victory
Boy/Male
Spanish American Shakespearean Greek Latin
Tenacious.
Boy/Male
Spanish
Victor.
Boy/Male
Christian & English(British/American/Australian)
Steadfast
Male
Portuguese
Galician-Portuguese form of Roman Latin Victor, VITOR means "conqueror."
Male
English
Short form of English Sylvester, VESTER means "from the forest."
Male
English
Roman Latin name VICTOR means "conqueror."Â
Boy/Male
Latin American Spanish
Conqueror.
Boy/Male
English American
Doctor; teacher.
Male
Russian
(Cyrillic Виктор): Slavic form of Roman Latin Victor, VIKTOR means "conqueror." In use by the Bulgarians, Russians and Serbians. Compare with another form of Viktor.
Boy/Male
Australian, Basque, Czech, Czechoslovakian, Danish, Finnish, French, German, Hungarian, Latin, Polish, Slovenia, Swedish, Swiss, Ukrainian
The Conqueror; Victory; Victorious; Conquer
Male
Scandinavian
 Scandinavian form of Roman Latin Victor, VIKTOR means "conqueror." Compare with another form of Viktor.
Boy/Male
Arthurian Legend
Father of Arthur.
VECTOR BUNDLE
VECTOR BUNDLE
Boy/Male
Tamil
Boy/Male
Arabic, Muslim, Pashtun, Sindhi
Happiness; Prosperity; Good Fortune; Blessing; Auspiciousness; Honour
Girl/Female
Tamil
Siddhiksha | ஸிதà¯à®¤à®¿à®•à¯à®·à®¾
Goddess Lakshmi, A religious ceremony
Boy/Male
Hindu
Victor, Name of Indra
Girl/Female
Latin
Feminine of Calvin.
Girl/Female
Arabic, Muslim
Courage
Boy/Male
Tamil
Clever, Skilled
Girl/Female
Indian, Tamil
Honey
Boy/Male
African, Australian, Biblical, Zimbabwe
Merchant; Trader; That Humbles and Subdues
Girl/Female
Latin
Warring.
VECTOR BUNDLE
VECTOR BUNDLE
VECTOR BUNDLE
VECTOR BUNDLE
VECTOR BUNDLE
n.
An astronomical instrument, the limb of which embraces a small portion only of a circle, used for measuring differences of declination too great for the compass of a micrometer. When it is used for measuring zenith distances of stars, it is called a zenith sector.
v. t.
To tamper with and arrange for one's own purposes; to falsify; to adulterate; as, to doctor election returns; to doctor whisky.
n.
A directed quantity, as a straight line, a force, or a velocity. Vectors are said to be equal when their directions are the same their magnitudes equal. Cf. Scalar.
a.
Of or pertaining to victory, or a victor' being a victor; bringing or causing a victory; conquering; winning; triumphant; as, a victorious general; victorious troops; a victorious day.
n.
An African weaver bird (Textor alector).
n.
Any mechanical contrivance intended to remedy a difficulty or serve some purpose in an exigency; as, the doctor of a calico-printing machine, which is a knife to remove superfluous coloring matter; the doctor, or auxiliary engine, called also donkey engine.
n.
A contrivance for removing superfluous ink or coloring matter from a roller. See Doctor, 4.
n.
A mathematical instrument, consisting of two rulers connected at one end by a joint, each arm marked with several scales, as of equal parts, chords, sines, tangents, etc., one scale of each kind on each arm, and all on lines radiating from the common center of motion. The sector is used for plotting, etc., to any scale.
n.
A belly, or protuberant part; a broad surface; as, the venter of a muscle; the venter, or anterior surface, of the scapula.
n.
A term made up of the two parts / + /1 /-1, where / and /1 are vectors.
n.
The chief elective officer of some universities, as in France and Scotland; sometimes, the head of a college; as, the Rector of Exeter College, or of Lincoln College, at Oxford.
n.
A woman who wins a victory; a female victor.
a.
Pertaining to a rector or a rectory; rectoral.
n.
The turning factor of a quaternion.
v. t.
To treat as a physician does; to apply remedies to; to repair; as, to doctor a sick man or a broken cart.
n.
The province of a rector; a parish church, parsonage, or spiritual living, with all its rights, tithes, and glebes.
n.
The ratio of one vector to another in length, no regard being had to the direction of the two vectors; -- so called because considered as a stretching factor in changing one vector into another. See Versor.
n.
Same as Radius vector.
n.
A pregnant woman; a mother; as, A has a son B by one venter, and a daughter C by another venter; children by different venters.
v. t.
To confer a doctorate upon; to make a doctor.