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Mathematical theorem
In complex analysis, the Riemann mapping theorem states that if U {\displaystyle U} is a non-empty simply connected open subset of the complex number
Riemann_mapping_theorem
Topics referred to by the same term
Mapping theorem may refer to Continuous mapping theorem, a statement regarding the stability of convergence under mappings Mapping theorem (point process)
Mapping_theorem
Theorem about metric spaces
Banach fixed-point theorem (also known as the contraction mapping theorem or contractive mapping theorem or Banach–Caccioppoli theorem) is an important
Banach_fixed-point_theorem
Mathematical function that preserves angles
conformal mappings are precisely the locally invertible complex analytic functions. In three and higher dimensions, Liouville's theorem sharply limits
Conformal_map
Probability theorem
In probability theory, the continuous mapping theorem states that continuous functions preserve limits even if their arguments are sequences of random
Continuous_mapping_theorem
Index of articles associated with the same name
Open mapping theorem may refer to: Open mapping theorem (functional analysis) (also known as the Banach–Schauder theorem), states that a surjective continuous
Open_mapping_theorem
Topics referred to by the same term
In mathematics, inverse mapping theorem may refer to: the inverse function theorem on the existence of local inverses for functions with non-singular derivatives
Inverse_mapping_theorem
Condition for a linear operator to be open
In functional analysis, the open mapping theorem, also known as the Banach–Schauder theorem or the Banach theorem (named after Stefan Banach and Juliusz
Open mapping theorem (functional analysis)
Open_mapping_theorem_(functional_analysis)
Mathematical theorem regarding operators
Blackwell's contraction mapping theorem provides a set of sufficient conditions for an operator to be a contraction mapping. It is widely used in areas
Blackwell's contraction mapping theorem
Blackwell's_contraction_mapping_theorem
Form of a matrix indicating its eigenvalues and their algebraic multiplicities
Using the Jordan normal form, direct calculation gives a spectral mapping theorem for the polynomial functional calculus: Let A be an n × n matrix with
Jordan_normal_form
Theorem on holomorphic functions
In complex analysis, the open mapping theorem states that if U {\displaystyle U} is a domain of the complex plane C {\displaystyle \mathbb {C} } and f
Open mapping theorem (complex analysis)
Open_mapping_theorem_(complex_analysis)
Theorem in complex analysis
Carathéodory's theorem is a theorem in complex analysis, named after Constantin Carathéodory, which extends the Riemann mapping theorem. The theorem, published
Carathéodory's theorem (conformal mapping)
Carathéodory's_theorem_(conformal_mapping)
Area of mathematics
Banach–Steinhaus theorem is one of the fundamental results in functional analysis. Together with the Hahn–Banach theorem and the open mapping theorem, it is considered
Functional_analysis
Theorem limiting types of conformal mappings in Euclidean space of dimension > 2
In mathematics, Liouville's theorem, proved by Joseph Liouville in 1850, is a rigidity theorem about conformal mappings in Euclidean space. It states
Liouville's theorem (conformal mappings)
Liouville's_theorem_(conformal_mappings)
Theorems connecting continuity to closure of graphs
graph theorem employs the open mapping theorem. It simply uses a general recipe of obtaining the closed graph theorem from the open mapping theorem; see
Closed graph theorem (functional analysis)
Closed_graph_theorem_(functional_analysis)
Theorem about zeros of holomorphic functions
Rouché's theorem is to prove the open mapping theorem for analytic functions. We refer to the article for the proof. A stronger version of Rouché's theorem was
Rouché's_theorem
Riemann mapping theorem (conformal mapping) Mittag-Leffler's theorem (complex analysis) Monodromy theorem (complex analysis) Montel's theorem (complex
List_of_theorems
Theorem in complex analysis
In mathematics, the Cauchy integral theorem (also known as the Cauchy–Goursat theorem) in complex analysis, named after Augustin-Louis Cauchy (and Édouard
Cauchy's_integral_theorem
Theorem in mathematics
to prove a fixed point theorem using the contraction mapping theorem. The inverse function theorem is not often stated separately for one variable, because
Inverse_function_theorem
Simply connected Riemann surface is equivalent to an open disk, complex plane, or sphere
the complex plane, or the Riemann sphere. The theorem is a generalization of the Riemann mapping theorem from simply connected open subsets of the plane
Uniformization_theorem
In mathematics, the measurable Riemann mapping theorem is a theorem proved in 1960 by Lars Ahlfors and Lipman Bers in complex analysis and geometric function
Measurable Riemann mapping theorem
Measurable_Riemann_mapping_theorem
Study of space and shapes locally given by a convergent power series
analytic functions. A fundamental result in the theory is the Riemann mapping theorem. The following are some of the most important topics in geometric function
Geometric_function_theory
Particular kind of algebraic structure
of σ ( x ) . {\displaystyle \sigma (x).} Furthermore, the spectral mapping theorem holds: σ ( f ( x ) ) = f ( σ ( x ) ) . {\displaystyle \sigma (f(x))=f(\sigma
Banach_algebra
Every Riemannian manifold can be isometrically embedded into some Euclidean space
differential equations to an elliptic system, to which the contraction mapping theorem could be applied. Given an m-dimensional Riemannian manifold (M, g)
Nash_embedding_theorems
Theorem relating continuity to graphs
spaces, then the theorem can also be deduced from the open mapping theorem for such spaces; see § Relation to the open mapping theorem. Non-Hausdorff spaces
Closed_graph_theorem
Branch of mathematics studying functions of a complex variable
complex dimension (such as conformality) do not carry over. The Riemann mapping theorem about the conformal relationship of certain domains in the complex
Complex_analysis
Concept of complex analysis
In complex analysis, the residue theorem, sometimes called Cauchy's residue theorem, is a powerful tool to evaluate line integrals of analytic functions
Residue_theorem
Number of times a curve wraps around a point in the plane
the winding number in the complex plane are given by the following theorem: Theorem. Let γ : [ α , β ] → C {\displaystyle \gamma :[\alpha ,\beta ]\to \mathbb
Winding_number
Generalization of closed graph, open mapping, and uniform boundedness theorem
and convex analysis, the Ursescu theorem is a theorem that generalizes the closed graph theorem, the open mapping theorem, and the uniform boundedness principle
Ursescu_theorem
American mathematician and statistician (1919–2010)
Rao–Blackwell theorem, and is also known for the Blackwell channel, Blackwell's contraction mapping theorem, Blackwell's approachability theorem, and the Blackwell
David_Blackwell
Mapping theorem in topology
mathematics, the Lefschetz fixed-point theorem is a formula that counts the fixed points of a continuous mapping from a compact topological space X {\displaystyle
Lefschetz_fixed-point_theorem
Functions in mathematics
principle; a theorem of removal of singularities as well as a Liouville theorem holds for them in analogy to the corresponding theorems in complex functions
Harmonic_function
Type of random mathematical object
point process, and this result is sometimes referred to as the mapping theorem. The theorem involves some Poisson point process with mean measure Λ {\displaystyle
Poisson_point_process
Type of function in mathematics
of analytic functions are analytic is an easy consequence of Morera's theorem. The set A ∞ ( Ω ) {\displaystyle A_{\infty }(\Omega )} of all bounded
Analytic_function
Conformal mapping in complex analysis
a simple polygon. Such a map is guaranteed to exist by the Riemann mapping theorem (stated by Bernhard Riemann in 1851); the Schwarz–Christoffel formula
Schwarz–Christoffel_mapping
Statement in complex analysis
Schwarz–Pick theorem (after Georg Pick), characterizes the analytic automorphisms of the unit disc, i.e. bijective holomorphic mappings of the unit disc
Schwarz_lemma
Partial differential equation
quasiconformal mappings. Various uniformization theorems can be proved using the equation, including the measurable Riemann mapping theorem and the simultaneous
Beltrami_equation
Integral criterion for holomorphy
mathematics, Morera's theorem, named after Giacinto Morera, gives a criterion for proving that a function is holomorphic. Morera's theorem states that a continuous
Morera's_theorem
Theorem in topology
Brouwer's fixed-point theorem is a fixed-point theorem in topology, named after L. E. J. (Bertus) Brouwer. It states that for any continuous function f
Brouwer_fixed-point_theorem
Mathematical theorem in complex analysis
{\displaystyle D} . This statement can be viewed as a special case of the open mapping theorem, which states that a nonconstant holomorphic function maps open sets
Maximum_modulus_principle
Theorem about the range of an analytic function
In complex analysis, Picard's great theorem and Picard's little theorem are related theorems about the range of an analytic function. They are named after
Picard_theorem
Way to divide polygon into smaller parts
subdivision rule is "conformal", as described in the combinatorial Riemann mapping theorem. Applications of subdivision rules. Islamic Girih tiles in Islamic
Finite_subdivision_rule
Characteristic property of holomorphic functions
Cauchy–Riemann system, and Liouville's theorem implies, under suitable smoothness assumptions, that any such mapping is a Möbius transformation. One might
Cauchy–Riemann_equations
Provides integral formulas for all derivatives of a holomorphic function
{f(z)}{z-a}}\,dz.} The proof of this statement uses the Cauchy integral theorem and like that theorem, it only requires f {\displaystyle f} to be complex differentiable
Cauchy's_integral_formula
Homeomorphism between plane domains
quasiconformal mappings in two dimensions is the measurable Riemann mapping theorem, proved by Lars Ahlfors and Lipman Bers. The theorem generalizes the
Quasiconformal_mapping
Bijective holomorphic function with a holomorphic inverse
complex plane is biholomorphic to the unit disc (this is the Riemann mapping theorem). The situation is very different in higher dimensions. For example
Biholomorphism
Concept in complex analysis
Riemann–Roch theorem. Argument principle Control theory § Stability Filter design Filter (signal processing) Gauss–Lucas theorem Hurwitz's theorem (complex
Zeros_and_poles
Branch of functional analysis
exactly the same way for an element in A. It is known that the spectral mapping theorem holds for the polynomial functional calculus: for any polynomial p
Holomorphic functional calculus
Holomorphic_functional_calculus
Attribute of a mathematical function
allow the determination of general contour integrals via the residue theorem. The residue of a meromorphic function f {\displaystyle f} at an isolated
Residue_(complex_analysis)
Theorem in differential topology
fixed-point theorem. Since the Betti numbers of a 2-sphere are 1, 0, 1, 0, 0, ... the Lefschetz number (total trace on homology) of the identity mapping is 2
Hairy_ball_theorem
Study of convergence properties of statistical estimators
{\displaystyle \tau _{n}\xrightarrow {a.s.} \tau } , then by the continuous mapping theorem θ n → a . s . f ( τ ) {\displaystyle \theta _{n}\xrightarrow {a.s.}
Asymptotic theory (statistics)
Asymptotic_theory_(statistics)
Two theorems about families of holomorphic functions
Picard's theorem. Montel space Fundamental normality test Riemann mapping theorem Hartje Kriete (1998). Progress in Holomorphic Dynamics. CRC Press.
Montel's_theorem
= 1 {\displaystyle n=1} , Kuratowski's free set theorem is superseded by Hajnal's set mapping theorem. P. Erdős, A. Hajnal, A. Máté, R. Rado: Combinatorial
Kuratowski's_free_set_theorem
Complex-differentiable (mathematical) function
holomorphic functions are complex analytic functions, and vice versa, is a major theorem in complex analysis. Holomorphic functions are also sometimes referred
Holomorphic_function
Theorem in probability theory
in distribution to (X, c) (see here). Next we apply the continuous mapping theorem, recognizing the functions g(x,y) = x + y, g(x,y) = xy, and g(x,y) = x
Slutsky's_theorem
Extends the Jordan curve theorem to characterize the inner and outer regions
Jordan-Schoenflies theorem for continuous curves can be proved using Carathéodory's theorem on conformal mapping. It states that the Riemann mapping between the
Schoenflies_problem
Theorem in complex analysis
In complex analysis, Liouville's theorem states that every bounded entire function must be constant. That is, every holomorphic function f {\displaystyle
Liouville's theorem (complex analysis)
Liouville's_theorem_(complex_analysis)
Theorem stating that pointwise boundedness implies uniform boundedness
Banach–Steinhaus theorem is one of the fundamental results in functional analysis. Together with the Hahn–Banach theorem and the open mapping theorem, it is considered
Uniform_boundedness_principle
Function that transforms a point process
coordinates. Provided that the mapping (or transformation) adheres to some conditions, then a result sometimes known as the Mapping theorem says that if the original
Point_process_operation
On topological spaces where the intersection of countably many dense open sets is dense
functional analysis, BCT1 can be used to prove the open mapping theorem, the closed graph theorem and the uniform boundedness principle. BCT1 also shows
Baire_category_theorem
Type of vector space in math
the Eberlein–Šmulian theorem. Any general property of Banach spaces continues to hold for Hilbert spaces. The open mapping theorem states that a continuous
Hilbert_space
Power series with negative powers
contour γ {\displaystyle \gamma } is an immediate consequence of Green's theorem. One may also obtain the Laurent series for a complex function f ( z )
Laurent_series
On the homology of continuous maps between compact metric spaces
The Vietoris–Begle mapping theorem is a result in the mathematical field of algebraic topology. It is named for Leopold Vietoris and Edward G. Begle.
Vietoris–Begle mapping theorem
Vietoris–Begle_mapping_theorem
On tangency patterns of circles
Circle packings have applications in conformal mapping, the construction of polyhedra, planar separator theorems, graph drawing, and the theory of random walks
Circle_packing_theorem
Geometric representation of the complex numbers
giving a contour integral that is not necessarily zero, by the residue theorem. Cutting the complex plane ensures not only that Γ(z) is holomorphic in
Complex_plane
Theorem in complex analysis
analysis, the argument principle (or Cauchy's argument principle) is a theorem relating the difference between the number of zeros and poles of a meromorphic
Argument_principle
Concept in functional analysis
considerable importance in functional analysis and the famous open mapping theorem gives a sufficient condition for a continuous linear map between Fréchet
Topological_homomorphism
Space where open mapping and closed graph theorems hold
designed with the goal of allowing the results of the open mapping theorem and the closed graph theorem to hold for a wider class of linear maps whose codomains
Webbed_space
Notions of probabilistic convergence, applied to estimation and asymptotic analysis
notation Skorokhod's representation theorem The Tweedie convergence theorem Slutsky's theorem Continuous mapping theorem Bickel et al. 1998, A.8, page 475
Convergence of random variables
Convergence_of_random_variables
Function reducing distance between all points
1). A contraction mapping has at most one fixed point. Moreover, the Banach fixed-point theorem states that every contraction mapping on a non-empty complete
Contraction_mapping
Topics referred to by the same term
beginning with Mapping All pages with titles containing Mapping Mapping theorem (disambiguation) Mappings (poetry) Surveying, the field work of gathering map
Mapping
Finnish mathematician (1907–1996)
finiteness theorem Ahlfors function Ahlfors measure conjecture Beurling–Ahlfors transform Schwarz–Ahlfors–Pick theorem Measurable Riemann mapping theorem Ahlfors
Lars_Ahlfors
Riemann multiple integral Riemann invariant Riemann mapping theorem Measurable Riemann mapping theorem Riemann problem Riemann solver Riemann sphere Riemann–Hilbert
List of things named after Bernhard Riemann
List_of_things_named_after_Bernhard_Riemann
Open 3-manifold that is contractible but not homeomorphic to R3
is "yes". In dimension 2, it follows, for example, from the Riemann mapping theorem. Dimension 3 presents the first counterexample: the Whitehead manifold
Whitehead_manifold
Topics referred to by the same term
mathematics contraction theorem may refer to: The Banach contraction mapping theorem in functional analysis Castelnuovo's contraction theorem in algebraic geometry
Contraction_theorem
Dirichlet problem can be used to prove a strong form of the Riemann mapping theorem for simply connected domains with smooth boundary. The method also
Sobolev spaces for planar domains
Sobolev_spaces_for_planar_domains
Principle in control theory
The covector mapping principle is a special case of Riesz' representation theorem, which is a fundamental theorem in functional analysis. The name was
Covector_mapping_principle
The mapping theorem is a theorem in the theory of point processes, a sub-discipline of probability theory. It describes how a Poisson point process is
Mapping theorem (point process)
Mapping_theorem_(point_process)
Functions that send open (resp. closed) subsets to open (resp. closed) subsets
analysis, the open mapping theorem states that every continuous linear surjection between Banach spaces is an open map. This theorem has been generalized
Open_and_closed_maps
Mathematical concept
Bieberbach conjecture Koebe quarter theorem – Statement in complex analysis Riemann mapping theorem – Mathematical theorem Nevanlinna's criterion – Characterization
Univalent_function
Extension of the Brouwer fixed-point theorem
fixed point. (A compact mapping in this context is one for which the image of every bounded set is relatively compact.) The theorem was conjectured and proven
Schauder_fixed-point_theorem
Locally convex topological vector space that is also a complete metric space
in functional analysis, like the open mapping theorem, the closed graph theorem, and the Banach–Steinhaus theorem, still hold. Recall that a seminorm ‖
Fréchet_space
Characterization of surjectivity
Fréchet spaces is surjective. The importance of this theorem is related to the open mapping theorem, which states that a continuous linear surjection between
Surjection_of_Fréchet_spaces
Type of geometric transformation
of a shear mapping can be used for results involving area. For instance, the Pythagorean theorem has been illustrated with shear mapping as well as the
Shear_mapping
Theorem about right triangles
In Euclidean geometry, the right triangle altitude theorem or geometric mean theorem is a relation between the altitude on the hypotenuse in a right triangle
Geometric_mean_theorem
conformal mappings, the area theorem gives an inequality satisfied by the power series coefficients of certain conformal mappings. The theorem is called
Area theorem (conformal mapping)
Area_theorem_(conformal_mapping)
Concept in topology
continuous. Secondly, there is a version of the open mapping theorem or the closed graph theorem due to Kuratowski: a continuous surjective homomorphism
Polish_space
Second-order partial differential equation
{\displaystyle u} is harmonic in D {\displaystyle D} , then the divergence theorem implies the compatibility condition ∫ ∂ D ∂ u ∂ ν d S = 0. {\displaystyle
Laplace's_equation
Riemann mapping theorem Carathéodory's theorem (conformal mapping) Riemann–Roch theorem Amplitwist Antiderivative (complex analysis) Bôcher's theorem Cayley
List of complex analysis topics
List_of_complex_analysis_topics
Property of artificial neural networks
Realization of Continuous Mappings by Neural Networks . In this report, he reinterpreted the Kolmogorov–Arnold–Sprecher theorem from the perspective of
Universal approximation theorem
Universal_approximation_theorem
Limit of roots of sequence of functions
corresponding to the real value 1 − (1/n). Hurwitz's theorem is used in the proof of the Riemann mapping theorem, and also has the following two corollaries as
Hurwitz's theorem (complex analysis)
Hurwitz's_theorem_(complex_analysis)
Problem of solving a partial differential equation subject to prescribed boundary values
version of the Riemann mapping theorem. Bell (1992) has outlined a different approach for establishing the smooth Riemann mapping theorem, based on the reproducing
Dirichlet_problem
Concept in topology
See also: Grauert's approximation theorem A basic result here is a theorem of Milnor which says that the mapping space Map ( X , Y ) {\displaystyle
Mapping_space
Normed vector space that is complete
for example) and guarantees that the Banach–Steinhaus theorem holds. The open mapping theorem implies that when τ 1 {\displaystyle \tau _{1}} and τ 2
Banach_space
Relation between sides of a right triangle
In mathematics, the Pythagorean theorem or Pythagoras's theorem is a fundamental relation in Euclidean geometry between the three sides of a right triangle
Pythagorean_theorem
Theorem
at the point and vice versa.) Among the corollaries of this theorem are the identity theorem that two holomorphic functions that agree at every point of
Analyticity of holomorphic functions
Analyticity_of_holomorphic_functions
Space which has no holes through it
connecting u {\displaystyle u} and v , {\displaystyle v,} The Riemann mapping theorem states that any non-empty open simply connected subset of C {\displaystyle
Simply_connected_space
Topics referred to by the same term
Carathéodory's theorem may refer to one of a number of results of Constantin Carathéodory: Carathéodory's theorem (conformal mapping), about the extension
Carathéodory's_theorem
Method in statistics
{P}}\,\theta } and since g′(θ) is continuous, applying the continuous mapping theorem yields g ′ ( θ ~ ) → P g ′ ( θ ) , {\displaystyle g'({\tilde {\theta
Delta_method
Matrix equation in control theory
{\displaystyle p(A)=0} due to the Cayley–Hamilton theorem; meanwhile, the spectral mapping theorem tells us σ ( p ( − B ) ) = p ( σ ( − B ) ) , {\displaystyle
Sylvester_equation
MAPPING THEOREM
MAPPING THEOREM
Surname or Lastname
English
English : patronymic from Abel, which was a popular Middle English personal name. Compare Aplin.
Surname or Lastname
English
English : perhaps an altered form of Malin.
Surname or Lastname
English and Irish
English and Irish : probably a hypercorrected form of Lappin.
Surname or Lastname
English
English : variant of Markin.
Girl/Female
Tamil
Sapling, Newborn
Surname or Lastname
English and Irish
English and Irish : reduced form of Mannering.
Girl/Female
Hindu
Making
Surname or Lastname
English
English : from Old English Tæpping, an unattested patronymic from Tæppa. Compare Tapp.Joseph Tapping (d. 1678) is buried in King’s Chapel Burying Ground, Boston, MA.
Boy/Male
American, Anglo, Australian, British, English
Son of the Hero
Girl/Female
Indian
Sapling, Newborn
Surname or Lastname
English (common in Lancashire and northern Ireland)
English (common in Lancashire and northern Ireland) : from a patronymic or pet form of Topp, or possibly from an unattested Old English personal name Topping.
Surname or Lastname
English
English : patronymic from Mann 1 and 2.Irish : adopted as an English equivalent of Gaelic Ó MainnÃn ‘descendant of MainnÃn’, probably an assimilated form of MainchÃn, a diminutive of manach ‘monk’. This is the name of a chieftain family in Connacht. It is sometimes pronounced Ó MaingÃn and Anglicized as Mangan.Anstice Manning, widow of Richard Manning of Dartmouth, England, came to MA with her children in 1679. Her great-great-grandson Robert, born at Salem, MA, in 1784, was the uncle and protector of author Nathaniel Hawthorne. Another early bearer of the relatively common British name was Jeffrey Manning, one of the earliest settlers in Piscataway township, Middlesex Co., NJ. His great-grandson James Manning (1738–91) was a founder and the first president of Rhode Island College (Brown University).
Surname or Lastname
English and Irish
English and Irish : nickname for a timid person, from Old French lapin ‘rabbit’.Polish and Jewish (eastern Ashkenazic) : variant of Lapin.
Girl/Female
Tamil
Making
Boy/Male
English American
Son of a hero.
Surname or Lastname
English
English : variant of Coppin.English : topographic name for someone who lived on the top of a hill, from a derivative Old English of copp ‘summit’ (see Copp 1).
Surname or Lastname
English
English : from a medieval personal name, originally an Old English patronymic from a personal name or byname Tippa, for which there is evidence in place names such as Tiptree, but which is of uncertain origin.
Surname or Lastname
English and Scottish
English and Scottish : probably from an unattested Middle English word hoping, denoting a dweller in a valley (see Hope).
Surname or Lastname
English
English : variant of Merlin.
Surname or Lastname
English (Devon)
English (Devon) : variant spelling of Appling.
MAPPING THEOREM
MAPPING THEOREM
Girl/Female
Tamil
Fresh butter, Gentle, Soft, Always new
Boy/Male
Hindu
Lord Shiva
Boy/Male
English American Greek
Follower of Christ. Chris is used as a diminutive of many masculine and feminine names beginning...
Girl/Female
Greek
Light.
Girl/Female
American, British, English
Bitter; Variant of Marlene; Derived from Madeline; Woman from Magdala
Boy/Male
Indian, Sanskrit
Lord Krishna
Girl/Female
Indian
Strong, Beautiful, Salty or graceful or brownish color
Girl/Female
Muslim
Arrows
Girl/Female
Indian
Beautiful, Lovely
Boy/Male
African, American, British, English, Jamaican
From the Wide Valley
MAPPING THEOREM
MAPPING THEOREM
MAPPING THEOREM
MAPPING THEOREM
MAPPING THEOREM
a.
Biting; pinching; painful; destructive; as, a nipping frost; a nipping wind.
p. pr. & vb. n.
of Rap
p. pr. & vb. n.
of Sap
n.
The act or process of raising a nap, as on cloth.
n.
The process of making, or of becoming malt.
a.
Pertaining to the harp; as, harping symphonies.
n.
The act of one who, or that which, marks; the mark or marks made; arrangement or disposition of marks or coloring; as, the marking of a bird's plumage.
p. pr. & vb. n.
of Cap
p. pr. & vb. n.
of Tap
p. pr. & vb. n.
of Nap
n.
Yelping.
n.
The process of cleaning or brightening sheet metal or metalware, esp. brass, by dipping it in acids, etc.
n.
The act of topping, lopping, or cropping, as trees or hedges.
n.
A sheet of partially felted fur before it is united to the hat body.
n.
A small European bird of the Plover family (Vanellus cristatus, or V. vanellus). It has long and broad wings, and is noted for its rapid, irregular fight, upwards, downwards, and in circles. Its back is coppery or greenish bronze. Its eggs are the "plover's eggs" of the London market, esteemed a delicacy. It is called also peewit, dastard plover, and wype. The gray lapwing is the Squatarola cinerea.
n.
A kind of machine blanket or wrapping material used by calico printers.
p. pr. & vb. n.
of Map
p. pr. & vb. n.
of Mop
p. pr. & vb. n.
of Rap
p. pr. & vb. n.
of Lap