AI & ChatGPT searches , social queriess for LIPSCHITZ CONTINUITY
Search references for LIPSCHITZ CONTINUITY. Phrases containing LIPSCHITZ CONTINUITY
See searches and references containing LIPSCHITZ CONTINUITY!
Search references for LIPSCHITZ CONTINUITY. Phrases containing LIPSCHITZ CONTINUITY
See searches and references containing LIPSCHITZ CONTINUITY!LIPSCHITZ CONTINUITY
Strong form of uniform continuity
mathematical analysis, Lipschitz continuity, named after German mathematician Rudolf Lipschitz, is a strong form of uniform continuity for functions. Intuitively
Lipschitz_continuity
German mathematician (1832–1903)
Cauchy–Lipschitz theorem Lipschitz domain Lipschitz quaternion Lipschitz continuity Uniform, Hölder and Lipschitz continuity Lipschitz distance Lipschitz-continuous
Rudolf_Lipschitz
Mathematical function with no sudden changes
= 1 {\displaystyle \alpha =1} is referred to as Lipschitz continuity. That is, a function is Lipschitz continuous if there is a constant K such that the
Continuous_function
Form of continuity for functions
continuous and, for a compact interval, continuously differentiable ⊆ Lipschitz continuous ⊆ absolutely continuous ⊆ bounded variation ⊆ differentiable
Absolute_continuity
Function in mathematical analysis
the same modulus of continuity are exactly equicontinuous families. For instance, the modulus ω(t) := kt describes the k-Lipschitz functions, the moduli
Modulus_of_continuity
Calculus of functions of several variables
: R n → R m {\displaystyle f:\mathbb {R} ^{n}\to \mathbb {R} ^{m}} is Lipschitz continuous (with the appropriate normed spaces as needed) in the neighbourhood
Multivariable_calculus
Degree of differentiability of a function or map
condition is stronger than ordinary continuity. When α = 1 {\displaystyle \alpha =1} , it implies the Lipschitz continuity of the k-th derivative, which is
Smoothness
Surname list
describe a function that satisfies the Lipschitz condition, a strong form of continuity, named after Rudolf Lipschitz. The surname may refer to: Daniel Lipšic
Lipschitz
Unsolved problem about inscribing a square in a Jordan curve
the endpoints of the curves and both of which obey a Lipschitz continuity condition with Lipschitz constant less than one. Tao also formulated several
Inscribed_square_problem
Uniform restraint of the change in functions
However, any Lipschitz map between metric spaces is uniformly continuous, in particular any isometry (distance-preserving map). Although continuity can be defined
Uniform_continuity
In mathematics, the Dini–Lipschitz criterion is a sufficient condition for the Fourier series of a periodic function to converge uniformly at all real
Dini–Lipschitz_criterion
Nondeterministic Newtonian mechanical system
a violation of the principle of Lipschitz continuity (the force that appears in Newton's second law is not a Lipschitz continuous function of the particle's
Norton's_dome
Theorem regarding the existence of a solution to a differential equation
assumes more and concludes more. It requires Lipschitz continuity, while the Peano theorem requires only continuity; but it proves both existence and uniqueness
Peano_existence_theorem
Method in Itô calculus
Itô process, provided μ , σ {\displaystyle \mu ,\sigma } satisfy Lipschitz continuity and linear growth conditions with respect to x {\displaystyle x}
Euler–Maruyama_method
Kind of linear transformation
{\displaystyle L} is uniformly continuous, and even Lipschitz continuous. Conversely, it follows from the continuity at the zero vector that there exists a ε >
Bounded_operator
Criterion for model selection
made mathematically rigorous under the technical assumptions of Lipschitz continuity and strong convexity, as follows. Lemma. (Lemma 2.82 ) Define ℓ n
Bayesian information criterion
Bayesian_information_criterion
Inequality from distance to a zero of a real analytic function
[ 0 , 1 ] {\textstyle t\in [0,1]} and use the L {\textstyle L} -Lipschitz continuity to show that f ( y ) − f ( x ) = g ( 1 ) − g ( 0 ) = ∫ 0 1 g ′ (
Łojasiewicz_inequality
Rudolf Lipschitz. Let f be a function on [0,2π], let t be some point and let δ be a positive number. We define the local modulus of continuity at the
Dini_test
analysis) Kachurovskii's theorem (convex analysis) Kirszbraun theorem (Lipschitz continuity) M. Riesz extension theorem (functional analysis) Milman–Pettis theorem
List_of_theorems
Mathematical optimization method
local Lipschitz constant for the gradient ∇ f {\displaystyle \nabla f\,} near the point x {\displaystyle \mathbf {x} } (see Lipschitz continuity). If the
Backtracking_line_search
Solution to a stochastic differential equation
condition and local martingale property. Uniqueness follows from the Lipschitz continuity of σ , b {\displaystyle \sigma \!,\!b} . In fact, L a ; b + ∂ ∂ s
Diffusion_process
worked on the Dirichlet principle Rudolf Lipschitz (1832–1903), mathematician, named the Lipschitz continuity condition Alfred Clebsch (1833–1872), mathematician
List of people from Königsberg
List_of_people_from_Königsberg
Public university in Bonn, Germany
topology and algebraic geometry. The Hirzebruch–Riemann–Roch theorem, Lipschitz continuity, the Petri net, the Schönhage–Strassen algorithm, Faltings' theorem
University_of_Bonn
Type of continuity of a complex-valued function
below). If α = 1 {\displaystyle \alpha =1} , then the function satisfies a Lipschitz condition. For any α > 0 {\displaystyle \alpha >0} , the condition implies
Hölder_condition
Solution to a specific type of stochastic differential equation
Brownian motion and b : Rn → Rn and σ : Rn → Rn×m satisfy the usual Lipschitz continuity condition | b ( x ) − b ( y ) | + | σ ( x ) − σ ( y ) | ≤ C | x −
Itô_diffusion
Mathematical function often applied to matrices
"one-sided Lipschitz constant" (for nonlinear maps), although the concept neither relates to measure theory nor implies Lipschitz continuity. For clarity
Logarithmic_norm
Special form of continuity
mathematical analysis, Dini continuity is a refinement of continuity. Every Dini continuous function is continuous. Every Lipschitz continuous function and
Dini_continuity
Mathematical notion
For linear operators between normed vector spaces, Lipschitz continuity is equivalent to continuity—an operator satisfying either of these conditions is
Equivalence_of_metrics
Mathematical space with a notion of distance
completeness, as well as uniform, Lipschitz, and Hölder continuity can be defined for metric spaces. Other notions, such as continuity, compactness, and open and
Metric_space
of a function Uniform continuity Modulus of continuity Lipschitz continuity Semi-continuity Equicontinuous Absolute continuity Hölder condition – condition
List_of_real_analysis_topics
unconventional value for sgn(0).) The signum function does not satisfy the Lipschitz continuity condition required for the usual theorems guaranteeing existence
Tanaka_equation
Function that is continuous everywhere but differentiable nowhere
better behaved classes of continuous functions do exist, for example the Lipschitz functions, whose set of non-differentiability points must be a Lebesgue
Weierstrass_function
are special cases of metric spaces, and thus one has a notion of Lipschitz continuity, Hölder condition, together with a coarse structure, which leads
Maps_of_manifolds
Boundary condition for generalized functions
^{n}} for n ∈ N {\textstyle n\in \mathbb {N} } be a bounded domain with Lipschitz boundary. Then there exists a bounded linear trace operator T : W 1 ,
Trace_operator
study was mainly focused on the study of differential equations and Lipschitz continuity. some of his notable contributions include: On the Composition Operator
Nelson_Merentes
Continuous-time stochastic process
by hypothesis, depends continuously upon x. Every Itô diffusion with Lipschitz-continuous drift and diffusion coefficients is a Feller-continuous process
Feller-continuous_process
Numerical problem-solving method
then it also has the convergence order p {\displaystyle p} . The Lipschitz continuity of the process function as an additional requirement for stability
One-step_method
Inclusions, Springer-Verlag, Berlin (1984). Dupuis, P. and Ishii, H., On Lipschitz continuity of the solution mapping to the Skorokhod Problem, with applications
Projected_dynamical_system
it equals 3/4 must involve a change in t of at least δ/4 by the Lipschitz continuity condition. Hence each orbit must intersect the set Ω of x for which
Ergodic_flow
Study of mathematical algorithms for optimization problems
found for minimization problems with convex functions and other locally Lipschitz functions, which meet in loss function minimization of the neural network
Mathematical_optimization
closure axioms Unicoherent Solenoid (mathematics) Uniform continuity Lipschitz continuity Uniform isomorphism Uniform property Uniformly connected space
List of general topology topics
List_of_general_topology_topics
Fractal curve resembling a blancmange pudding
variation on no non-empty open set; it is not even locally Lipschitz, but it is quasi-Lipschitz, indeed, it admits the function ω ( t ) := t ( | log 2
Blancmange_curve
Technique in integral evaluation
theory, integration by substitution is used with Lipschitz functions. A bi-Lipschitz function is a Lipschitz function φ : U → Rn which is injective and whose
Integration_by_substitution
Argentine mathematician
differential equations, from interpolation theory to Cauchy integrals on Lipschitz curves, from ergodic theory to inverse problems in electrical prospection
Alberto_Calderón
Vector space of functions in mathematics
{\displaystyle p=\infty } and Ω {\displaystyle \Omega } has Lipschitz boundary, then the function is Lipschitz continuous. The Sobolev space W 1 , 2 ( Ω ) {\displaystyle
Sobolev_space
Differential equations involving stochastic processes
{\displaystyle \alpha } . Suppose α {\displaystyle \alpha } satisfies some local Lipschitz condition, i.e., for t ≥ 0 {\displaystyle t\geq 0} and some compact set
Stochastic differential equation
Stochastic_differential_equation
Relation among continuous functions
equicontinuous on the Fatou set. The set of all Lipschitz-continuous functions is not equicontinuous, as the maximal Lipschitz-constant is unbounded. The sequence
Equicontinuity
Theorem about inclusions between Sobolev spaces
boundary and the boundary is Lipschitz (meaning that the boundary can be locally represented as a graph of a Lipschitz continuous function). M is a complete
Sobolev_inequality
Theorem in mathematics
derivatives of f {\displaystyle f} are bounded, f {\displaystyle f} is Lipschitz continuous (and therefore uniformly continuous). As an application of
Mean_value_theorem
Variety of proofs provided for the different types of convergence of random variables
{\displaystyle \mathbb {E} [f(X_{n})]\to \mathbb {E} [f(X)]} for all bounded, Lipschitz functions f {\displaystyle f} ; lim sup Pr ( X n ∈ C ) ≤ Pr ( X ∈
Proofs of convergence of random variables
Proofs_of_convergence_of_random_variables
infinitesimal calculus, is a mathematical discipline focused on limits, continuity, derivatives, integrals, and infinite series. Many elements of calculus
History_of_calculus
function is a constant function. Lipschitz 1. A map f {\displaystyle f} between metric spaces is said to be Lipschitz continuous if sup x ≠ y d ( f (
Glossary of real and complex analysis
Glossary_of_real_and_complex_analysis
American mathematician and Nobel Laureate (1928–2015)
October 11, 2022. Müller, S.; Šverák, V. (2003). "Convex integration for Lipschitz mappings and counterexamples to regularity". Annals of Mathematics. Second
John_Forbes_Nash_Jr.
Topics referred to by the same term
derivative Dini test Dini's theorem Dini criterion Dini's surface Dini continuity Dini–Lipschitz criterion Umar Said Salim Al Dini, Yemeni held in extrajudicial
Dini
Comics character
wants to use Swamp Thing to further his career. He and his assistant Lipschitz, are trapped for days in a limo being driven by a monstrous and insane
Roy_Raymond_(character)
Concept in stochastic analysis
theory of L. C. Young, the geometric algebra of Kuo-Tsai Chen, and the Lipschitz function theory of Hassler Whitney, while remaining compatible with key
Rough_path
Instantaneous rate of change (mathematics)
Under mild conditions (for example, if the function is a monotone or a Lipschitz function), this is true. However, in 1872, Weierstrass found the first
Derivative
Multivariate functions can be written using univariate functions and summing
remains true if we require all ϕ i {\displaystyle \phi _{i}} to be 1-Lipschitz continuous. Kolmogorov-Arnold Networks Bar-Natan, Dror. "Dessert: Hilbert's
Kolmogorov–Arnold representation theorem
Kolmogorov–Arnold_representation_theorem
Distance function defined between probability distributions
this case: a function f {\displaystyle f} is c-convex iff it is Lipschitz, with Lipschitz constant ≤ 1 {\displaystyle \leq 1} . In this case, f c = − f
Wasserstein_metric
Hebrew ethno-religious group in Canaan during the Iron Age
Returned as One!": Critical Notes on the Myth of the Mass Return". In Lipschitz, Oded; Oeming, Manfred (eds.). Judah and the Judeans in the Persian Period
Israelites
Notions of probabilistic convergence, applied to estimation and asymptotic analysis
{\displaystyle \mathbb {E} f(X_{n})\to \mathbb {E} f(X)} for all bounded, Lipschitz functions f {\displaystyle f} ; lim inf E f ( X n ) ≥ E f ( X ) {\displaystyle
Convergence of random variables
Convergence_of_random_variables
celestial mechanics Wave action in continuum mechanics Bloch equations Continuity equation for conservation laws Maxwell's equations Poynting's theorem
List of named differential equations
List_of_named_differential_equations
Founder of the Achaemenid Empire
New York: Chelsea House Publishers. p. 80. ISBN 978-0-7910-9636-9. Oded Lipschitz; Manfred Oeming, eds. (2006). "The "Persian Documents" in the Book of
Cyrus_the_Great
specifically, the above estimate above shows that Busemann functions are Lipschitz functions with constant 1. By Dini's theorem, the functions F t ( x )
Busemann_function
is a Hilbert space and M is closed and convex, then pM is Lipschitz continuous with Lipschitz constant 1.[citation needed] Metric projections are used
Metric_projection
Nemytskii operators are a class of nonlinear operators on Lp spaces with good continuity and boundedness properties. They take their name from the mathematician
Nemytskii_operator
Mathematical theorem
differential form of Grönwall's inequality, potentially involving any Lipschitz-over-u right part. Gronwall, Thomas H. (1919), "Note on the derivatives
Grönwall's_inequality
Generalisation of convexity
B(0,1) can be replaced by any other bounded Lipschitz domain. Quasiconvex functions are locally Lipschitz-continuous. In the definition the space W 0
Quasiconvexity (calculus of variations)
Quasiconvexity_(calculus_of_variations)
Motion of particles in a fluid
Lipschitz-continuous. Then φ : R n × R → R n {\displaystyle \varphi :\mathbb {R} ^{n}\times \mathbb {R} \to \mathbb {R} ^{n}} is also Lipschitz-continuous
Flow_(mathematics)
Type of mathematical space
Consider the set K of all functions f : [0, 1] → [0, 1] satisfying the Lipschitz condition |f(x) − f(y)| ≤ |x − y| for all x, y ∈ [0,1]. Consider on K
Compact_space
Mathematical concept
over the set of those measurable functions from X to [−1, 1] which have Lipschitz constant at most 1; and also in contrast to the Radon metric, where the
Convergence_of_measures
Optimization algorithm
u\rightarrow \infty } . In addition, ∇ J {\displaystyle \nabla J} must be Lipschitz continuous, bounded and the ODE u ˙ = g ( u ) {\displaystyle {\dot {u}}=g(u)}
Simultaneous perturbation stochastic approximation
Simultaneous_perturbation_stochastic_approximation
known as interpolation inequalities. Let Ω {\displaystyle \Omega } be a Lipschitz domain in R n {\displaystyle \mathbb {R} ^{n}} for n = 2 or 3 {\displaystyle
Ladyzhenskaya's_inequality
Class of distance functions defined between probability distributions
{\mathcal {F}}} the set of 1-Lipschitz functions. The related Dudley metric is generated by the set of bounded 1-Lipschitz functions. The total variation
Integral_probability_metric
Ethnoreligious group native to the Levant
Samaritan Temple on Mt Gerizim in Light of Archaeological Evidence". In Lipschitz, Oded; Knoppers, Gary N.; Albertz, Rainer (eds.). Judah and the Judeans
Samaritans
When are solutions in the calculus of variations analytic
step is needed: one must prove that the solution w {\displaystyle w} is Lipschitz continuous, i.e. the gradient D w {\displaystyle Dw} is an L ∞ {\displaystyle
Hilbert's_nineteenth_problem
Motivating example in mathematical study
the free boundary. In general, the solution is continuous and possesses Lipschitz continuous first derivatives, but that the solution is generally discontinuous
Obstacle_problem
\Omega ;\\u(x)=0,&x\in \partial \Omega ;\end{cases}}} where Ω is a bounded Lipschitz domain in Rn. The corresponding weak form of the problem is to find u
Gårding's_inequality
the extension which applies in the case where the boundary is just a Lipschitz curve was constructed by Calderón using singular integral operators and
Sobolev spaces for planar domains
Sobolev_spaces_for_planar_domains
Technique for solving hyperbolic partial differential equations
enough such that a , c {\displaystyle \mathbf {a} ,c} are locally Lipschitz. By continuity, ( X ( s ) , U ( s ) ) {\displaystyle (\mathbf {X} (s),U(s))} will
Method_of_characteristics
Property of differential equations describing physical phenomena
functions. The energy method is useful for establishing both uniqueness and continuity with respect to initial conditions (i.e. it does not establish existence)
Well-posed_problem
audiences. This often causes confusion and sometimes chronological errors in continuity with respect to the story arc (for example, episode 5 "Prince of Wails"
List_of_Sliders_episodes
Spacetime manifold
for the case with no boundary, must be strengthened now into locally Lipschitz, even in the case that the boundary is C ∞ {\displaystyle C^{\infty }}
Globally_hyperbolic_spacetime
Theorem in mathematical analysis
measure and satisfies the cone condition (among those are the widely used Lipschitz domains). Both Gagliardo and Nirenberg found out that their theorem could
Gagliardo–Nirenberg interpolation inequality
Gagliardo–Nirenberg_interpolation_inequality
Real function with finite total variation
closed, bounded interval of the real line: Continuously differentiable ⊆ Lipschitz continuous ⊆ absolutely continuous ⊆ continuous and bounded variation
Bounded_variation
Returned as One!": Critical Notes on the Myth of the Mass Return". In Lipschitz, Oded; Oeming, Manfred (eds.). Judah and the Judeans in the Persian period
List of Iranian artifacts abroad
List_of_Iranian_artifacts_abroad
Ancient clay cylinder with Akkadian cuneiform script
Returned as One!": Critical Notes on the Myth of the Mass Return". In Lipschitz, Oded; Oeming, Manfred (eds.). Judah and the Judeans in the Persian period
Cyrus_Cylinder
Italian mathematician and politician (1845–1918)
Nistri, 1878) Dini continuity Dini criterion Dini derivative Dini series Dini test Dini's theorem Dini's surface Dini–Lipschitz criterion See (Ford 1920
Ulisse_Dini
Middle quantile of a data set or probability distribution
Concentration of measure – Statistical parameter for Lipschitz functions – Strong form of uniform continuityPages displaying short descriptions of redirect
Median
American mathematician (1924–2012)
Lipschitz algebras". Proc. London Math. Soc. 3 (2): 359–377. doi:10.1093/plms/s3-55_2.359. with H. G. Dales: Dales, H.; Bade, W. (1989). "Continuity of
William_G._Bade
Mathematical method in calculus
boundary Γ = ∂ Ω {\displaystyle \Gamma =\partial \Omega } need only be Lipschitz continuous, and the functions u, v need only lie in the Sobolev space
Integration_by_parts
Theorem in topology
Émile Picard, a contemporary mathematician who generalized the Cauchy–Lipschitz theorem. Picard's approach is based on a result that would later be formalised
Brouwer_fixed-point_theorem
Formula in calculus
stronger forms of differentiability, when the derivative is required to be Lipschitz continuous, Hölder continuous, etc. Differentiation itself can be viewed
Chain_rule
Dispersion of Jews around the globe
Returned as One!": Critical Notes on the Myth of the Mass Return". In Lipschitz, Oded; Oeming, Manfred (eds.). Judah and the Judeans in the Persian Period
Jewish_diaspora
Theorem in vector calculus
notion of surface measure in Lebesgue theory cannot be defined for a non-Lipschitz surface. One (advanced) technique is to pass to a weak formulation and
Stokes'_theorem
American annual mathematics conference
symplectic topology and gauge theory Jeff Cheeger, Differentiation, bi-Lipschitz nonembedding and embedding Charles Fefferman, Fitting a smooth function
Geometry_Festival
Type of differential equation
applicable to several different PDE, somewhat vague. The requirement of "continuity", in particular, is ambiguous, since there are usually many inequivalent
Partial_differential_equation
Property of a dynamical system where solutions near an equilibrium point remain so
{\displaystyle t>t_{0}} . The right-hand side of the equation is locally Lipschitz in N {\displaystyle N} and thus a unique solution exists with a maximal
Lyapunov_stability
Certain vector fields are the sum of an irrotational and a solenoidal vector field
existence of strong derivatives). Suppose Ω is a bounded, simply-connected, Lipschitz domain. Every square-integrable vector field u ∈ (L2(Ω))3 has an orthogonal
Helmholtz_decomposition
Smooth manifold with an inner product on each tangent space
consider many other types of Riemannian metrics in this spirit, such as Lipschitz Riemannian metrics or measurable Riemannian metrics. There are situations
Riemannian_manifold
LIPSCHITZ CONTINUITY
LIPSCHITZ CONTINUITY
Boy/Male
Hindu, Indian, Kannada, Marathi, Sanskrit, Telugu
Never Ending; Persistence; Continuity; Perpetuity; Eternity; Uninterrupted Duration; Diligence; Conscientiousness; Truthful; Straightforward; Honest
Boy/Male
Tamil
Lipshit | லீபà¯à®·à®¿à®¤
Desired
Lipshit | லீபà¯à®·à®¿à®¤
Boy/Male
Hindu
Desired
LIPSCHITZ CONTINUITY
LIPSCHITZ CONTINUITY
Boy/Male
Hindu, Indian, Traditional
One who has or Gives Warmth
Boy/Male
Indian, Tamil
God Murugan
Girl/Female
Hindu, Indian, Sanskrit
Full Moon
Boy/Male
Australian, German, Teutonic
People's Ruler
Boy/Male
Italian Latin
Pious.
Girl/Female
Indian
Perception
Male
Icelandic
Icelandic form of German Wolfgang, ÚLFGANGUR means "wolf path."
Boy/Male
Arabic
One who Serves a Merciful Man
Boy/Male
Tamil
Peetavasane | பிதாவாஸநே
Wearing yellow attire signifying purity and wisdom
Boy/Male
American, Anglo, Australian, British, English, French
Golden; Name of a Historian
LIPSCHITZ CONTINUITY
LIPSCHITZ CONTINUITY
LIPSCHITZ CONTINUITY
LIPSCHITZ CONTINUITY
LIPSCHITZ CONTINUITY
v. t.
To arrange in exact continuity of line, as soldiers; commonly to adjust to a straight line and at proper distance; to align; as, to dress the ranks.
v.
Continuity or extension of anything; as, the tract of speech.
v. t.
To break the continuity of; to disconnect; to disunite; to sunder; to loosen; to undo; to separate.
n.
The pellicle which forms over a wound or breach of continuity and completes the process of healing in the latter, and which subsequently contracts and becomes white, forming the scar.
n.
A state of holding on in a continuous course; manner of continuity; constant mode; general tendency; course; career.
n.
A solution of continuity in any of the soft parts of the body, discharging purulent matter, found on a surface, especially one of the natural surfaces of the body, and originating generally in a constitutional disorder; a sore discharging pus. It is distinguished from an abscess, which has its beginning, at least, in the depth of the tissues.
n.
the state of being continuous; uninterupted connection or succession; close union of parts; cohesion; as, the continuity of fibers.
n.
An injury to the person by which the skin is divided, or its continuity broken; a lesion of the body, involving some solution of continuity.
v. t.
An interruption in continuity in writing or printing, as where there is an omission, an unfilled line, etc.
n.
The quality or property of being in fragnebts, or broken pieces, incompleteness; want of continuity.
n.
A holding together; continuity.
v. t.
To interrupt; to destroy the continuity of; to dissolve or terminate; as, to break silence; to break one's sleep; to break one's journey.
n.
A crack or breach; a gap or fissure; a defect of continuity or cohesion; as, a flaw in a knife or a vase.
v. t.
To interrupt the continuity of (rock strata) by displacement along a plane of fracture; -- chiefly used in the p. p.; as, the coal beds are badly faulted.
v. t.
An interruption of continuity; change of direction; as, a break in a wall; a break in the deck of a ship.
pl.
of Continuity
n.
The death of a part by molecular disintegration and without loss of continuity, as in the processes of degeneration and atrophy.
n.
Uninterrupted course; continuity.
n.
A dislocation of a lead, destroying continuity.
n.
An open or unoccupied space between bodies or things; an interruption of continuity; chasm; gap; as, a vacancy between buildings; a vacancy between sentences or thoughts.