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In algebraic geometry, the Grassmann d-plane bundle of a vector bundle E on an algebraic scheme X is a scheme over X: p : G d ( E ) → X {\displaystyle
Grassmann_bundle
Vector bundle existing over a Grassmannian
also tautological bundles on a projective bundle of a vector bundle, as well as a Grassmann bundle. The older term canonical bundle has dropped out of
Tautological_bundle
Short exact sequence of sheaves on projective space
The Euler sequence generalizes to that of a projective bundle as well as a Grassmann bundle (see the latter article for this generalization.) Let P A
Euler_sequence
Mathematical space
Grassmannian G r k ( V ) {\displaystyle \mathbf {Gr} _{k}(V)} , also known as a Grassmann manifold, is a differentiable manifold that parameterizes the set of all
Grassmannian
Fiber bundle whose fibers are projective spaces
projective bundle of a vector bundle E is the same thing as the Grassmann bundle G 1 ( E ) {\displaystyle G_{1}(E)} of 1-planes in E. The projective bundle P(E)
Projective_bundle
Bundle of linear subspaces of the tangent bundle
the contact bundle is obtained by combining Grassmannians of the tangent spaces at each point, it is a special case of the Grassmann bundle and of the
Contact_bundle
Differential geometry topic
tangent k-planes in the tangent bundle TM. The target space for the Gauss map N is a Grassmann bundle built on the tangent bundle TM. In the case where M =
Gauss_map
Hermann Grassmann: Grassmann's laws Grassmann algebra Grassmann bundle Grassmann dimensions Grassmann graph Grassmann integral Grassmann number Grassmann variables
List of things named after Hermann Grassmann
List_of_things_named_after_Hermann_Grassmann
Continuous surjection satisfying a local triviality condition
In mathematics, and particularly topology, a fiber bundle (Commonwealth English: fibre bundle) is a space that is locally a product space, but globally
Fiber_bundle
Algebra associated to any vector space
In mathematics, the exterior algebra or Grassmann algebra of a vector space V {\displaystyle V} is an associative algebra that contains V , {\displaystyle
Exterior_algebra
point, then a flag bundle is a flag variety and if the length of the flag is one, then it is the Grassmann bundle; hence, a flag bundle is a common generalization
Flag_bundle
Mathematical function, in linear algebra
Mixed tensor Antisymmetric tensor Symmetric tensor Tensor operator Tensor bundle Two-point tensor Operations Covariant derivative Exterior covariant derivative
Linear_map
Concept in mathematics
mathematics, the tensor bundle of a manifold is the direct sum of all tensor products of the tangent bundle and the cotangent bundle of that manifold. To
Tensor_bundle
Algebraic operation on coordinate vectors
Christoffel Albert Einstein Leonhard Euler Carl Friedrich Gauss Hermann Grassmann Tullio Levi-Civita Gregorio Ricci-Curbastro Bernhard Riemann Jan Arnoldus
Dot_product
projective space P 3 ˘ {\displaystyle {\breve {\mathbb {P} ^{3}}}} as the Grassmann bundle p : P 3 ˘ → ∗ {\displaystyle p:{\breve {\mathbb {P} ^{3}}}\to *} parametrizing
Segre_class
Assignment of a tensor continuously varying across a region of space
language of vector bundles, the determinant bundle of the tangent bundle is a line bundle that can be used to 'twist' other bundles w times. While locally
Tensor_field
Isomorphism between the tangent and cotangent bundles of a manifold
isomorphism) is an isomorphism between the tangent bundle T M {\displaystyle \mathrm {T} M} and the cotangent bundle T ∗ M {\displaystyle \mathrm {T} ^{*}M} of
Musical_isomorphism
Specification of a derivative along a tangent vector of a manifold
contrasted with the approach given by a principal connection on the frame bundle – see affine connection. In the special case of a manifold isometrically
Covariant_derivative
Algebraic structure in linear algebra
et fils Grassmann, Hermann (1844), Die Lineale Ausdehnungslehre - Ein neuer Zweig der Mathematik (in German), O. Wigand, reprint: Grassmann, Hermann
Vector_space
Matrix operation which flips a matrix over its diagonal
Christoffel Albert Einstein Leonhard Euler Carl Friedrich Gauss Hermann Grassmann Tullio Levi-Civita Gregorio Ricci-Curbastro Bernhard Riemann Jan Arnoldus
Transpose
Operation that pairs a left and a right R-module into an abelian group
bundles T M , T ∗ M {\displaystyle TM,T^{*}M} are viewed as locally free sheaves on M. The exterior bundle on M is the subbundle of the tensor bundle
Tensor_product_of_modules
Mathematical operation on vector spaces
Mixed tensor Antisymmetric tensor Symmetric tensor Tensor operator Tensor bundle Two-point tensor Operations Covariant derivative Exterior covariant derivative
Tensor_product
Method for specifying point positions
Christoffel Albert Einstein Leonhard Euler Carl Friedrich Gauss Hermann Grassmann Tullio Levi-Civita Gregorio Ricci-Curbastro Bernhard Riemann Jan Arnoldus
Coordinate_system
Straight path on a curved surface or a Riemannian manifold
double tangent bundle TTM into horizontal and vertical bundles: T T M = H ⊕ V . {\displaystyle TTM=H\oplus V.} The double tangent bundle can be visualized
Geodesic
Type of unphysical field in quantum field theory which provides mathematical consistency
gauge-field fiber bundle.) Used in the above identity for the determinant, these fields become the Fadeev-Popov ghost fields. Because Grassmann numbers anti-commute
Faddeev–Popov_ghost
Set of vectors used to define coordinates
père et fils Grassmann, Hermann (1844), Die Lineale Ausdehnungslehre - Ein neuer Zweig der Mathematik (in German), reprint: Hermann Grassmann. Translated
Basis_(linear_algebra)
Shorthand notation for tensor operations
Christoffel Albert Einstein Leonhard Euler Carl Friedrich Gauss Hermann Grassmann Tullio Levi-Civita Gregorio Ricci-Curbastro Bernhard Riemann Jan Arnoldus
Einstein_notation
Array of numbers describing a metric connection
frame bundle, with each "frame" being a possible choice of a coordinate frame. An invariant metric implies that the structure group of the frame bundle is
Christoffel_symbols
Universal construction in multilinear algebra
Mixed tensor Antisymmetric tensor Symmetric tensor Tensor operator Tensor bundle Two-point tensor Operations Covariant derivative Exterior covariant derivative
Tensor_algebra
Expression that may be integrated over a region
aspects of the exterior algebra of differential forms appears in Hermann Grassmann's 1844 work, Die Lineale Ausdehnungslehre, ein neuer Zweig der Mathematik
Differential_form
Type of derivative in differential geometry
principal bundle. Now, if we're given a vector field Y over M (but not the principal bundle) but we also have a connection over the principal bundle, we can
Lie_derivative
Construct allowing differentiation of tangent vector fields of manifolds
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
System of moving vectors in differential geometry
affine connection (a covariant derivative or connection on the tangent bundle), then this connection allows one to transport vectors of the manifold along
Parallel_transport
Concept in geometry
tautological bundle of the Grassmann bundle G i {\displaystyle G_{i}} of rank rk E i {\displaystyle \operatorname {rk} E_{i}} sub-bundles of E i ⊗ E i
Localized_Chern_class
Math/physics concept
formulated subsequent to Cartan's initial work. In particular, on a principal bundle, a principal connection is a natural reinterpretation of the connection
Connection_form
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
Topological space that locally resembles Euclidean space
and there is no intrinsic notion of a normal bundle, but instead there is an intrinsic stable normal bundle. The n-sphere Sn is a generalisation of the
Manifold
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
Mathematical function of two variables; outputs 1 if they are equal, 0 otherwise
Mixed tensor Antisymmetric tensor Symmetric tensor Tensor operator Tensor bundle Two-point tensor Operations Covariant derivative Exterior covariant derivative
Kronecker_delta
Vector behavior under coordinate changes
indices, because it has parts that live in the tangent bundle as well as the cotangent bundle. A contravariant vector is one which transforms like d x
Covariance and contravariance of vectors
Covariance_and_contravariance_of_vectors
Branch of mathematics
and applications involve single vectors, mathematicians such as Hermann Grassmann considered structures involving pairs, triplets, and multivectors that
Multilinear_algebra
Differential form of degree one or section of a cotangent bundle
cotangent bundle. Equivalently, a one-form on a manifold M {\displaystyle M} is a smooth mapping of the total space of the tangent bundle of M {\displaystyle
One-form
Algebraic object with geometric applications
tensors, and the Riemann curvature tensor. The exterior algebra of Hermann Grassmann, from the middle of the nineteenth century, is itself a tensor theory
Tensor
Supergeometric generalization of a manifold
equipped with an Grassmann-odd symplectic structure. All natural geometric objects on a supermanifold are graded. In particular, the bundle of two-forms is
Supermanifold
Exterior algebraic map taking tensors from p forms to n-p forms
can play a role in differential geometry when applied to the cotangent bundle of a pseudo-Riemannian manifold, and hence to differential k-forms. This
Hodge_star_operator
Branch of mathematics
differential geometry. A smooth manifold always carries a natural vector bundle, the tangent bundle. Loosely speaking, this structure by itself is sufficient only
Differential_geometry
Study of curves from a differential point of view
Mixed tensor Antisymmetric tensor Symmetric tensor Tensor operator Tensor bundle Two-point tensor Operations Covariant derivative Exterior covariant derivative
Differentiable_curve
Construct in differenital geometry
mathematics, a metric connection is a connection in a vector bundle E equipped with a bundle metric; that is, a metric for which the inner product of any
Metric_connection
Operation in mathematics
Mixed tensor Antisymmetric tensor Symmetric tensor Tensor operator Tensor bundle Two-point tensor Operations Covariant derivative Exterior covariant derivative
Tensor_contraction
Tensor in differential geometry
curvature form of the canonical line bundle. The canonical line bundle is the top exterior power of the bundle of holomorphic Kähler differentials: κ
Ricci_curvature
Second-rank tensor in quantum chromodynamics
the spacetime with values in the adjoint bundle of the chromodynamical SU(3) gauge group (see vector bundle for necessary definitions). Throughout this
Gluon_field_strength_tensor
Affine connection on the tangent bundle of a manifold
the Levi-Civita connection is the unique affine connection on the tangent bundle of a manifold that preserves the (pseudo-)Riemannian metric and is torsion-free
Levi-Civita_connection
British mathematician and philosopher (1845–1879)
British mathematician and philosopher. Building on the work of Hermann Grassmann, he introduced what is now termed geometric algebra. This is a special
William_Kingdon_Clifford
Manifold with supersymmetry structure
{\displaystyle A} is a C Z ∞ {\displaystyle C_{Z}^{\infty }} -sheaf of Grassmann algebras of rank m {\displaystyle m} where C Z ∞ {\displaystyle C_{Z}^{\infty
Graded_manifold
Differential form
{\displaystyle n} -form. It is an element of the space of sections of the line bundle ⋀ n ( T ∗ M ) {\displaystyle \textstyle {\bigwedge }^{n}(T^{*}M)} , denoted
Volume_form
Function that is invariant under all permutations of its variables
Mixed tensor Antisymmetric tensor Symmetric tensor Tensor operator Tensor bundle Two-point tensor Operations Covariant derivative Exterior covariant derivative
Symmetric_function
Non-tensorial representation of the spin group
forms a spinor bundle associated to the principal spin bundle and a chosen spin representation; spinor fields are sections of this bundle. In flat spacetime
Spinor
Tensor operator generalizes the notion of operators which are scalars and vectors
Christoffel Albert Einstein Leonhard Euler Carl Friedrich Gauss Hermann Grassmann Tullio Levi-Civita Gregorio Ricci-Curbastro Bernhard Riemann Jan Arnoldus
Tensor_operator
French mathematician (1905–1979)
classical Lie groups, such as Grassmann manifolds and other homogeneous spaces. He developed the concept of fiber bundle, and the related notions of Ehresmann
Charles_Ehresmann
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
Array of numbers
Christoffel Albert Einstein Leonhard Euler Carl Friedrich Gauss Hermann Grassmann Tullio Levi-Civita Gregorio Ricci-Curbastro Bernhard Riemann Jan Arnoldus
Matrix_(mathematics)
Tensor describing energy momentum density in spacetime
Christoffel Albert Einstein Leonhard Euler Carl Friedrich Gauss Hermann Grassmann Tullio Levi-Civita Gregorio Ricci-Curbastro Bernhard Riemann Jan Arnoldus
Stress–energy_tensor
Element of an exterior algebra
have properties similar to the homogeneous coordinates of points, called Grassmann coordinates. Points in a real projective space Pn are defined to be lines
Multivector
Coordinate-free definition of a tensor
Mixed tensor Antisymmetric tensor Symmetric tensor Tensor operator Tensor bundle Two-point tensor Operations Covariant derivative Exterior covariant derivative
Tensor_(intrinsic_definition)
In mathematics, invariant of square matrices
n} -dimensional vectors of anti-commuting Grassmann numbers (aka "supernumbers"), taken from the Grassmann algebra. The exp {\displaystyle \exp } here
Determinant
Type of physical quantity
pseudo-volume form, due to the additional sign twist (tensoring with the sign bundle). The volume element is a pseudotensor density according to the first definition
Pseudotensor
Tensor invariant under permutations of vectors it acts on
Mixed tensor Antisymmetric tensor Symmetric tensor Tensor operator Tensor bundle Two-point tensor Operations Covariant derivative Exterior covariant derivative
Symmetric_tensor
Mathematical object that describes the electromagnetic field in spacetime
Christoffel Albert Einstein Leonhard Euler Carl Friedrich Gauss Hermann Grassmann Tullio Levi-Civita Gregorio Ricci-Curbastro Bernhard Riemann Jan Arnoldus
Electromagnetic_tensor
Mixed tensor Antisymmetric tensor Symmetric tensor Tensor operator Tensor bundle Two-point tensor Operations Covariant derivative Exterior covariant derivative
Tensors in curvilinear coordinates
Tensors_in_curvilinear_coordinates
Antisymmetric permutation object acting on tensors
Christoffel Albert Einstein Leonhard Euler Carl Friedrich Gauss Hermann Grassmann Tullio Levi-Civita Gregorio Ricci-Curbastro Bernhard Riemann Jan Arnoldus
Levi-Civita_symbol
Scalar measure of the rotational inertia with respect to a fixed axis of rotation
Christoffel Albert Einstein Leonhard Euler Carl Friedrich Gauss Hermann Grassmann Tullio Levi-Civita Gregorio Ricci-Curbastro Bernhard Riemann Jan Arnoldus
Moment_of_inertia
Mapping from p forms to p-1 forms
Christoffel Albert Einstein Leonhard Euler Carl Friedrich Gauss Hermann Grassmann Tullio Levi-Civita Gregorio Ricci-Curbastro Bernhard Riemann Jan Arnoldus
Interior_product
Tensor used in general relativity
Christoffel Albert Einstein Leonhard Euler Carl Friedrich Gauss Hermann Grassmann Tullio Levi-Civita Gregorio Ricci-Curbastro Bernhard Riemann Jan Arnoldus
Einstein_tensor
Tensor index notation for tensor-based calculations
}B^{\gamma }{}_{\delta \cdots ;\epsilon }\,.} A Koszul connection on the tangent bundle of a differentiable manifold is called an affine connection. A connection
Ricci_calculus
Physics concept
Christoffel Albert Einstein Leonhard Euler Carl Friedrich Gauss Hermann Grassmann Tullio Levi-Civita Gregorio Ricci-Curbastro Bernhard Riemann Jan Arnoldus
Covariant_transformation
Decomposition in multilinear algebra
Mixed tensor Antisymmetric tensor Symmetric tensor Tensor operator Tensor bundle Two-point tensor Operations Covariant derivative Exterior covariant derivative
Tensor_rank_decomposition
Tensor equal to the negative of any of its transpositions
Mixed tensor Antisymmetric tensor Symmetric tensor Tensor operator Tensor bundle Two-point tensor Operations Covariant derivative Exterior covariant derivative
Antisymmetric_tensor
Object in differential geometry
characterization of torsion, applies to the frame bundle FM of the manifold M. This principal bundle is equipped with a connection form ω, a gl(n)-valued
Torsion_tensor
Property of a mathematical space
Christoffel Albert Einstein Leonhard Euler Carl Friedrich Gauss Hermann Grassmann Tullio Levi-Civita Gregorio Ricci-Curbastro Bernhard Riemann Jan Arnoldus
Dimension
Mathematical notation for tensors and spinors
Mixed tensor Antisymmetric tensor Symmetric tensor Tensor operator Tensor bundle Two-point tensor Operations Covariant derivative Exterior covariant derivative
Abstract_index_notation
Abbreviation in the fields of special and general relativity
Mixed tensor Antisymmetric tensor Symmetric tensor Tensor operator Tensor bundle Two-point tensor Operations Covariant derivative Exterior covariant derivative
Four-tensor
Electromagnetism in general relativity
F(\nabla )} of a U(1)-connection ∇ {\displaystyle \nabla } on a principal U(1)-bundle whose sections represent charged fields. The connection is much like the
Maxwell's equations in curved spacetime
Maxwell's_equations_in_curved_spacetime
algebraic geometry, standard monomial theory describes the sections of a line bundle over a generalized flag variety or Schubert variety of a reductive algebraic
Standard_monomial_theory
Branch of physics which studies the behavior of materials modeled as continuous media
Christoffel Albert Einstein Leonhard Euler Carl Friedrich Gauss Hermann Grassmann Tullio Levi-Civita Gregorio Ricci-Curbastro Bernhard Riemann Jan Arnoldus
Continuum_mechanics
Four-dimensional analog of the icosahedron
due to Schläfli, who discovered them before 1853 — a time when Cayley, Grassmann and Möbius were the only other people who had ever conceived the possibility
600-cell
Generalization of tensor fields
also be regarded as a section of the tensor product of a tensor bundle with a density bundle. In physics and related fields, it is often useful to work with
Tensor_density
Polish military leader (1746–1817)
Julian Ursyn (1965). Budka, Mechie J. (ed.). Under Your Vine and Fig Tree. Grassmann Pub. Co., 398 pages. ISBN 9780686818083. Niemcewicz, Julian Ursyn (1844)
Tadeusz_Kościuszko
Notation used for Weyl spinors
Christoffel Albert Einstein Leonhard Euler Carl Friedrich Gauss Hermann Grassmann Tullio Levi-Civita Gregorio Ricci-Curbastro Bernhard Riemann Jan Arnoldus
Van_der_Waerden_notation
Tensor having both covariant and contravariant indices
Mixed tensor Antisymmetric tensor Symmetric tensor Tensor operator Tensor bundle Two-point tensor Operations Covariant derivative Exterior covariant derivative
Mixed_tensor
Second order tensor in vector algebra
Christoffel Albert Einstein Leonhard Euler Carl Friedrich Gauss Hermann Grassmann Tullio Levi-Civita Gregorio Ricci-Curbastro Bernhard Riemann Jan Arnoldus
Dyadics
Algebra based on a vector space with a quadratic form
references to Schönberg's papers of 1956 and 1957 as described in section "The Grassmann–Schönberg algebra Gn" of Bolivar 2001 See for ex. Oziewicz & Sitarczyk
Clifford_algebra
Theory of gravitation as curved spacetime
Christoffel Albert Einstein Leonhard Euler Carl Friedrich Gauss Hermann Grassmann Tullio Levi-Civita Gregorio Ricci-Curbastro Bernhard Riemann Jan Arnoldus
General_relativity
Covariant derivative of the metric tensor
and let ∇ {\displaystyle \nabla } be an affine connection on the tangent bundle T M {\displaystyle TM} . The nonmetricity tensor is defined (some authors
Nonmetricity_tensor
Theory of interwoven space and time by Albert Einstein
Christoffel Albert Einstein Leonhard Euler Carl Friedrich Gauss Hermann Grassmann Tullio Levi-Civita Gregorio Ricci-Curbastro Bernhard Riemann Jan Arnoldus
Special_relativity
Property of certain dynamical systems
fixed (finite or infinite) abelian group action on a (finite or infinite) Grassmann manifold. The τ-function was viewed as the determinant of a projection
Integrable_system
linear algebra building upon concepts of p-vectors and multivectors with Grassmann algebra. Multiplicative number theory a subfield of analytic number theory
Glossary of areas of mathematics
Glossary_of_areas_of_mathematics
Mathematical notation
Christoffel Albert Einstein Leonhard Euler Carl Friedrich Gauss Hermann Grassmann Tullio Levi-Civita Gregorio Ricci-Curbastro Bernhard Riemann Jan Arnoldus
Multi-index_notation
Theory proposed by Roger Penrose
turn led to remarkable formulations of scattering amplitudes in terms of Grassmann integral formulae and polytopes. These ideas have evolved more recently
Twistor_theory
Mathematical Concept
Christoffel Albert Einstein Leonhard Euler Carl Friedrich Gauss Hermann Grassmann Tullio Levi-Civita Gregorio Ricci-Curbastro Bernhard Riemann Jan Arnoldus
Voigt_notation
Mathematics of smooth surfaces
functions on the manifold, to differential operators on the tangent bundle or frame bundle. In the case of an embedded surface, the lift to an operator on
Differential geometry of surfaces
Differential_geometry_of_surfaces
GRASSMANN BUNDLE
GRASSMANN BUNDLE
Surname or Lastname
English, German (Passmann), and Jewish (Ashkenazic)
English, German (Passmann), and Jewish (Ashkenazic) : variant of Pass.
Surname or Lastname
English (Kent)
English (Kent) : from Middle English shefe ‘sheaf’, ‘bundle’ (Old English scēaf), hence possibly a metonymic occupational name for a harvest worker, or for someone who paid or collected tithes, from the same term in the sense ‘tenth’ (or other proportion of produce paid as a tithe).Jacob Sheafe (d. 1658) was one of the founds of Boston MA. He is buried in the King’s Chapel Burying Ground there.
Boy/Male
Indian
Bundle of Joy
Boy/Male
American, Arabic, Australian, French, Hebrew, Latin
Eloquent or Bundle of Grain; First Son; Long Living
Girl/Female
American, Australian, Indonesian
Bright Grassland
Surname or Lastname
English
English : topographic name for someone who lived by a stone cross, from Old Norse kross (see Cross 1) + Middle English man.Altered spelling of German Crossmann or Crössmann; the first may be a habitational name from any of several places called Crossen in Saxony, Brandenburg, and East Prussia, or derived from Grossmann. The second is possibly from Middle Low German krÅs, krüs ‘pitcher’, and hence a metonymic occupational name for maker of these; alternatively it may be a metonymic occupational name for a butcher, from Middle High German kroese ‘tripe’.
Surname or Lastname
English
English : from Middle English pa(c)k ‘pack’, ‘bundle’ + the Anglo-Norman French pejorative suffix -ard, hence a derogatory occupational name for a peddler.English : pejorative derivative of the Middle English personal name Pack.English : from a Norman personal name, Pachard, Baghard, composed of the Germanic elements pac, bag ‘fight’ + hard ‘hardy’, ‘brave’, ‘strong’.Probably an Americanized spelling of German Packert, Päckert, from Germanic personal names formed with a word meaning ‘battle’ or ‘to fight’; or a variant of Packer 2 (with excrescent -t).
Surname or Lastname
English (southwest)
English (southwest) : occupational name for a digger of ditches or a builder of dikes, or a topographic name for someone who lived by a ditch or dike, from an agent derivative of Middle English diche, dike (see Dyke).English : regional name from an area of East Sussex, near Hellingly, called ‘the Dicker’ (hence also the hamlets of Upper and Lower Dicker), from Middle English dyker unit of ten (Latin decuria, from decem ‘ten’); the reason for the place being so named is not clear. It has been suggested that the reference is to a bundle of iron rods, in which sense dicras appears in Domesday Book. Such a bundle could have been the rent for property in this iron-working area. Surname forms such as atte dicker occur in the surrounding region in the 13th and 14th centuries.German and Jewish (Ashkenazic) : variant of Dick 2, from an inflected form.North German : variant of Low German Dieker, a topographic or an occupational name for someone who lived or worked at a dike (see Dieck).Americanized spelling of French Decaire.
Girl/Female
American, British, English
Bright Meadow; Bright Grassland
Surname or Lastname
English
English : occupational nickname for a peddler, from Old French trousse ‘bundle’, ‘pack’.Ukrainian : nickname from trus ‘rabbit’, typically applied to someone thought to be a coward.
Surname or Lastname
English
English : from Old French balon ‘bundle’, ‘roll’, ‘pack’, hence a nickname for a small, rotund man or possibly a metonymic occupational name for a carrier of goods and merchandise.French (Bâlon) : generally regarded as a habitational name from Baalons in the Ardennes, it may however simply be from balon ‘ball’, ‘roll’ (see 1) or a derivative of Bal.
Surname or Lastname
German (Grassmann)
German (Grassmann) : elaborated form of of Grass 1 and 4.English : occupational name for a seller of grease, from Old French graisse, greisse, gresse ‘grease’.English : occupational name from Middle English grasman, gresman ‘cottager’, from Middle English gras, gres ‘grass’, ‘pasture’ + man.
Girl/Female
American, Australian, Chinese
Flat Grassland
Surname or Lastname
English (chiefly Lancashire)
English (chiefly Lancashire) : nickname from Middle English fitten ‘lying’, ‘deceit’ (of unknown origin).English (chiefly Lancashire) : possibly a habitational name from Fitton Hall in Cambridgeshire, named in Anglo-Scandinavian as ‘settlement (Old English tūn) on the fit (Old Norse fit)’, a term denoting grassland on the bank of a river.
Girl/Female
American, Australian, British, Chinese, Christian, Danish, English, French, German, Indian
Shining Meadow; Bright Grassland; Country Meadow; Bright Meadow
GRASSMANN BUNDLE
GRASSMANN BUNDLE
Boy/Male
American, British, English
From the Sandy Brook
Female
English
Anglicized form of Welsh Gwyneth, GYNETH means "luck, happiness." In Arthurian legend, this is the name of the daughter of King Arthur, in Sir Walter Scott's The Bridal of Triermain.Â
Girl/Female
Arabic
With Beautiful Long Hair
Boy/Male
Hindu
Well disposed
Girl/Female
Arabic, Hindu, Indian, Muslim
Correct; Agreeable
Girl/Female
Hindu
Shining star, Blomming
Boy/Male
Hindu
Kingly
Boy/Male
Latin Dutch
A Latin name based on the Greek word for kid or goatskin.
Boy/Male
Indian
Boy/Male
Gujarati, Hindu, Indian, Kannada, Punjabi, Sanskrit, Sikh, Traditional
Protector of All; Protector of God Indra; Gods Friends
GRASSMANN BUNDLE
GRASSMANN BUNDLE
GRASSMANN BUNDLE
GRASSMANN BUNDLE
GRASSMANN BUNDLE
n.
A bundle or ball of slivers of comkbed wool, from which the noils, or dust, have been taken out.
n.
A little mass, tuft, or bundle, as of hay or tow.
n.
A band or bundle of fibers; a fraenum.
n.
A bundle; a package; as, a truss of grass.
n.
A small bar, rod, bundle of fibers, or septal membrane, in the framework of an organ part.
v. t.
To tie or bind in a bundle or roll.
v. t.
To put up in bundles in order to dry, as hay.
n.
A small bundle, as of straw or other like substance.
imp. & p. p.
of Bundle
v. t.
To release, as from a bundle; to disclose.
n.
A quantity of the stalks and ears of wheat, rye, or other grain, bound together; a bundle of grain or straw.
n.
A bundle of fibers, or a loosely twisted or braided cord, tape, or tube, usually made of soft spun cotton threads, which by capillary attraction draws up a steady supply of the oil in lamps, the melted tallow or wax in candles, or other material used for illumination, in small successive portions, to be burned.
n.
A tough insensible cord, bundle, or band of fibrous connective tissue uniting a muscle with some other part; a sinew.
n.
The gathered and thrashed stalks of certain species of grain, etc.; as, a bundle, or a load, of rye straw.
n.
A number of things bound together, as by a cord or envelope, into a mass or package convenient for handling or conveyance; a loose package; a roll; as, a bundle of straw or of paper; a bundle of old clothes.
n.
Any collection of things bound together; a bundle; specifically, a bundle of arrows sufficient to fill a quiver, or the allowance of each archer, -- usually twenty-four.
a.
Having stamens joined by filaments into three bundles. See Illust. under Adelphous.
n.
A covering; -- applied especially to the bundles of longitudinal fibers in the upper part of the crura of the cerebrum.
n.
A bundle of straw, or other material, to relieve the pressure of burdens carried upon the head.
n.
That portion of a fibrovascular bundle which has developed, or will develop, into wood cells; -- distinguished from phloem.