Search references for CONTINUITY IN-PROBABILITY. Phrases containing CONTINUITY IN-PROBABILITY
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Equation describing the transport of some quantity
Brownian motion, then there is a continuity equation for its probability distribution. The flux in this case is the probability per unit area per unit time
Continuity_equation
{\displaystyle s} . Feller processes are continuous in probability at t = 0 {\displaystyle t=0} . Continuity in probability is a sometimes used as one of the defining
Continuity_in_probability
Stochastic process that is a continuous function of time or index parameter
particular: continuity with probability one implies continuity in probability; continuity in mean-square implies continuity in probability; continuity with probability
Continuous_stochastic_process
Topics referred to by the same term
applied to the conic sections and related shapes In probability theory Continuous stochastic process Continuity equations applicable to conservation of mass
Continuity
Statistical model
process, continuity in probability is equivalent to mean-square continuity and continuity with probability one is equivalent to sample continuity. The latter
Gaussian_process
Value for the flow of probability in quantum mechanics
current (i.e. the probability current density) is related to the probability density function via a continuity equation. The probability current is invariant
Probability_current
Notions of probabilistic convergence, applied to estimation and asymptotic analysis
In probability theory, there exist several different notions of convergence of sequences of random variables, including convergence in probability, convergence
Convergence of random variables
Convergence_of_random_variables
Approximation in mathematics
probability distribution functions accurately, continuity corrections played an important role in the practical application of statistical tests in which
Continuity_correction
Stochastic process in probability theory
{\displaystyle X_{t}-X_{s}\,} is equal in distribution to X t − s ; {\displaystyle X_{t-s};\,} Continuity in probability: For any ε > 0 {\displaystyle \varepsilon
Lévy_process
Absolute continuity of a measure with respect to another measure Continuous probability distribution: Sometimes this term is used to mean a probability distribution
List of continuity-related mathematical topics
List_of_continuity-related_mathematical_topics
Result in probability theory
In probability theory, Lévy’s continuity theorem, or Lévy's convergence theorem, named after the French mathematician Paul Lévy, connects convergence in
Lévy's_continuity_theorem
Interpretation of probability
Bayesian probability (/ˈbeɪziən/ BAY-zee-ən or /ˈbeɪʒən/ BAY-zhən) is an interpretation of the concept of probability, in which, instead of frequency or
Bayesian_probability
Form of continuity for functions
In calculus and real analysis, absolute continuity is a smoothness property of functions that is stronger than continuity and uniform continuity. The notion
Absolute_continuity
Probability saying
subsets of probability 0. Some examples of the use of this concept include the strong and uniform versions of the law of large numbers, the continuity of the
Almost_surely
Statistical method
In statistics, Yates's correction for continuity (or Yates's chi-squared test) is a statistical test commonly used when analyzing count data organized
Yates's correction for continuity
Yates's_correction_for_continuity
series) Le Cam's theorem (probability theory) Lévy continuity theorem (probability) Lévy's modulus of continuity theorem (probability) Martingale representation
List_of_theorems
Fourier transform of the probability density function
In probability theory and statistics, the characteristic function of any real-valued random variable completely defines its probability distribution.
Characteristic function (probability theory)
Characteristic_function_(probability_theory)
Collection of random variables
In probability theory and related fields a stochastic (/stəˈkæstɪk/) or random process is a mathematical object usually defined as a family of random variables
Stochastic_process
Probability distribution
In probability theory and statistics, the binomial distribution with parameters n and p is the discrete probability distribution of the number of successes
Binomial_distribution
catalog of articles in probability theory. For distributions, see List of probability distributions. For journals, see list of probability journals. For contributors
List_of_probability_topics
Complex number whose squared absolute value is a probability
In quantum mechanics, a probability amplitude is a complex number used for describing the behaviour of systems. The square modulus of this quantity at
Probability_amplitude
In measure theory, a branch of mathematics, a continuity set of a measure μ is any Borel set B such that μ ( ∂ B ) = 0 , {\displaystyle \mu (\partial B)=0
Continuity_set
lists articles related to probability theory. In particular, it lists many articles corresponding to specific probability distributions. Such articles
Catalog of articles in probability theory
Catalog_of_articles_in_probability_theory
Mathematical rule for inverting probabilities
conditional probabilities, allowing the probability of a cause to be found given its effect. For example, with Bayes' theorem, the probability that a patient
Bayes'_theorem
Cadlag in probability theory
An additive process, in probability theory, is a cadlag, continuous in probability stochastic process with independent increments. An additive process
Additive_process
In probability theory, two sequences of probability measures are said to be contiguous if asymptotically they share the same support. Thus the notion
Contiguity (probability theory)
Contiguity_(probability_theory)
Discrete probability distribution
In probability theory and statistics, the Poisson distribution (/ˈpwɑːsɒn/) is a discrete probability distribution that expresses the probability of a
Poisson_distribution
Mathematical description of quantum state
}{m}}{\text{Im}}(\psi ^{*}\nabla \psi )} , is known as the probability flux in accordance with the continuity equation form of the above equation. Using the following
Wave_function
Types of numerical variables in mathematics
problems. In statistical theory, the probability distributions of continuous variables can be expressed in terms of probability density functions. In continuous-time
Continuous or discrete variable
Continuous_or_discrete_variable
Probability theory operation
In probability theory, the probability integral transform (also known as universality of the uniform) relates to the result that data values that are modeled
Probability integral transform
Probability_integral_transform
Type of probability distribution
In probability theory, a probability distribution is infinitely divisible if it can be expressed as the probability distribution of the sum of an arbitrary
Infinite divisibility (probability)
Infinite_divisibility_(probability)
validity Contiguity (probability theory) Contingency table Continuity correction Continuous distribution – see Continuous probability distribution Continuous
List_of_statistics_articles
Branch of mathematics
introduced the modern definition of continuity in 1816, but Bolzano's work did not become widely known until the 1870s. In 1821, Cauchy began to put calculus
Mathematical_analysis
Average uncertainty in variable's states
xi) and Ηn(p1, ..., pn) = Η(X). Continuity: H should be continuous, so that changing the values of the probabilities by a very small amount should only
Entropy_(information_theory)
Method in probability theory
In mathematics, the second moment method is a technique used in probability theory and analysis to show that a random variable has positive probability
Second_moment_method
Property of functions which is weaker than continuity
In mathematical analysis, semicontinuity (or semi-continuity) is a property of extended real-valued functions that is weaker than continuity. An extended
Semi-continuity
French mathematician (1886-1971)
December 1971) was a French mathematician who was active especially in probability theory, introducing fundamental concepts such as local time, stable
Paul_Lévy_(mathematician)
Stochastic process generalizing Brownian motion
mathematically explains the ubiquity of Brownian motion in natural phenomena. The unconditional probability density function follows a normal distribution with
Wiener_process
Description of a quantum-mechanical system
square of the wavefunction need not be time independent. The continuity equation for probability in nonrelativistic quantum mechanics is stated as: ∂ ∂ t ρ
Schrödinger_equation
Class of distance functions defined between probability distributions
In probability theory, integral probability metrics are types of distance functions between probability distributions, defined by how well a class of
Integral_probability_metric
modulus of continuity theorem is a theorem that gives a result about an almost sure behaviour of an estimate of the modulus of continuity for Wiener process
Lévy's modulus of continuity theorem
Lévy's_modulus_of_continuity_theorem
In probability theory, a rule for assigning epistemic probabilities
insufficient reason) is a rule for assigning epistemic probabilities. The principle of indifference states that in the absence of any relevant evidence, agents
Principle_of_indifference
Calculus of functions of several variables
s(t)} does not imply multivariate continuity. Continuity in each argument not being sufficient for multivariate continuity can also be seen from the following
Multivariable_calculus
Statistical confidence interval for success counts
In statistics, a binomial proportion confidence interval is a confidence interval for the probability of success calculated from the outcome of a series
Binomial proportion confidence interval
Binomial_proportion_confidence_interval
Right continuous function with left limits
correspond to the probability of being lower or equal than r {\displaystyle r} , namely P [ X ≤ r ] {\displaystyle \mathbb {P} [X\leq r]} . In other words,
Càdlàg
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
Method of estimating the parameters of a statistical model, given observations
In statistics, maximum likelihood estimation (MLE) is a method of estimating the parameters of an assumed probability distribution, given some observed
Maximum_likelihood_estimation
run over Borel probability measures on A and B. The theorem is useful if f and g are interpreted as mixed strategies of two players in the context of
Glicksberg's_theorem
Any individual whose preferences satisfy four axioms has a utility function
refers to a situation in which L is received with probability p and N is received with probability (1–p). Instead of continuity, an alternative axiom
Von Neumann–Morgenstern utility theorem
Von_Neumann–Morgenstern_utility_theorem
Paradigm in machine learning
discuss] the distribution of data points belonging to each class. The probability p ( y | x ) {\displaystyle p(y|x)} that a given point x {\displaystyle
Weak_supervision
Theorem in probability theory
lemma is a result in measure theory. It is often stated in the context of probability theory, where it is used to study whether, in a given sequence of
Borel–Cantelli_lemma
Branch of mathematics
points in a domain. Or, it can be used in probability theory to determine the expectation value of a continuous random variable given a probability density
Calculus
statistics and probability is a list of definitions of terms and concepts used in the mathematical sciences of statistics and probability, their sub-disciplines
Glossary of probability and statistics
Glossary_of_probability_and_statistics
Averages of repeated trials converge to the expected value
In probability theory, the law of large numbers is a mathematical law which states that the average of the results obtained from a large number of independent
Law_of_large_numbers
Expressing a measure as an integral of another
subsets are sets of points; or the probability of an event, which is a subset of possible outcomes within a wider probability space. One way to derive a new
Radon–Nikodym_theorem
Statistical test comparing two probability distributions
2.2), one-dimensional probability distributions. It can be used to test whether a sample came from a given reference probability distribution (one-sample
Kolmogorov–Smirnov_test
Mathematical concept
some of the statements. The statements in this section are however all correct if μn is a sequence of probability measures on a Polish space. The various
Convergence_of_measures
Mathematical function having a characteristic S-shaped curve or sigmoid curve
and Student's t probability density functions. The logistic sigmoid function is invertible, and its inverse is the logit function. In mathematics, a unitary
Sigmoid_function
Probability distribution in mathematics
In probability theory and statistics, the zeta distribution is a discrete probability distribution. If X is a zeta-distributed random variable with parameter
Zeta_distribution
Special form of continuity
local Dini continuity implies convergence of a Fourier transform. Stenflo, Örjan (2001). "A note on a theorem of Karlin". Statistics & Probability Letters
Dini_continuity
Continuous-time stochastic process
mathematician William Feller. Let X : [0, +∞) × Ω → Rn, defined on a probability space (Ω, Σ, P), be a stochastic process. For a point x ∈ Rn, let Px
Feller-continuous_process
Indexed set in mathematics
used in abstract algebra, homological algebra (where they are related in an important way to spectral sequences), and in measure theory and probability theory
Filtration_(mathematics)
Statistical function that defines the quantiles of a probability distribution
In probability and statistics, the quantile function of a probability distribution is the inverse of its cumulative distribution function. That is, the
Quantile_function
Validating efficacy of recovery plans
technology (IT) to run their operations, business continuity planning (and its subset IT service continuity planning) covers the entire organization, while
Business continuity and disaster recovery auditing
Business_continuity_and_disaster_recovery_auditing
Theorem in measure theory
In measure theory Prokhorov's theorem relates tightness of measures to relative compactness (and hence weak convergence) in the space of probability measures
Prokhorov's_theorem
American lawyer
Studies 317 (2004) (with Susan Athey & Kyle Bagwell) The Role of Absolute Continuity in Merging of Opinions and Rational Learning, 29 1/2 Games and Economic
Chris_William_Sanchirico
Method of statistical inference
BAY-zhən) is a method of statistical inference in which Bayes' theorem is used to calculate a probability of a hypothesis, given prior evidence, and update
Bayesian_inference
Statistical test used on paired nominal data
p_{c}\end{aligned}}} Here pa, etc., denote the theoretical probability of occurrences in cells with the corresponding label. The McNemar test statistic
McNemar's_test
Relations between flows and forces, or gradients, in thermodynamic systems
vector. The formulation of energy conservation is generally not in the form of a continuity equation because it includes contributions both from the macroscopic
Onsager_reciprocal_relations
Discrete probability distribution
The Skellam distribution is the discrete probability distribution of the difference N 1 − N 2 {\displaystyle N_{1}-N_{2}} of two statistically independent
Skellam_distribution
Function related to statistics and probability theory
calculating the probability of seeing that data under different parameter values of the model. It is constructed from the joint probability distribution
Likelihood_function
Mathematical concept
X} in the L 1 {\displaystyle L^{1}} norm if and only if it converges in measure to X {\displaystyle X} and it is uniformly integrable. In probability terms
Uniform_integrability
Smoothly functioning political system
stability experience a decreased probability of encountering major political upheavals, civil unrest, or sudden changes in leadership. Political stability
Political_stability
Probability concept
right continuity of functions R ≥ 0 → S {\displaystyle \mathbb {R} _{\geq 0}\to S} . A continuous-time Markov chain is defined by: A probability vector
Continuous-time_Markov_chain
Probability theory term
is formalized in probability theory by conditioning. Conditional probabilities, conditional expectations, and conditional probability distributions are
Conditioning_(probability)
Interpretation of quantum mechanics
corresponds to the probability density ρ ( x , t ) = | ψ ( x , t ) | 2 {\displaystyle \rho (\mathbf {x} ,t)=|\psi (\mathbf {x} ,t)|^{2}} . Continuity equation:
De_Broglie–Bohm_theory
Statistical hypothesis test
skewed, Pearson, in a series of articles published from 1893 to 1916, devised the Pearson distribution, a family of continuous probability distributions
Chi-squared_test
Nonparametric test of the null hypothesis
of the sizes of the two samples being compared. This measure is the probability that the value of a random observation from the higher group will be
Mann–Whitney_U_test
Variety of proofs provided for the different types of convergence of random variables
X_{n}} converges in probability to X {\displaystyle X} . If Xn are independent random variables assuming value one with probability 1/n and zero otherwise
Proofs of convergence of random variables
Proofs_of_convergence_of_random_variables
Soviet mathematician (1903–1987)
1987) was a Soviet mathematician who played a central role in the creation of modern probability theory. He also gave fundamental contributions to the mathematics
Andrey_Kolmogorov
Totality of psychological phenomena
operational stage to abstract ideas, probabilities, and possibilities. Other important processes shaping the mind in this period are socialization and enculturation
Mind
American mathematician and professor (1938–2020)
published over a hundred papers in peer-reviewed journals and authored several books. His specialty was probability theory and statistics, especially
Richard_M._Dudley
Concept in probability theory
In probability theory, Dudley's theorem is a result relating the expected upper bound and regularity properties of a Gaussian process to its entropy and
Dudley's_theorem
French mathematician and lawyer (1601–1665)
analytic geometry, probability, and optics. He is best known for his Fermat's principle for light propagation and his Fermat's Last Theorem in number theory
Pierre_de_Fermat
Soviet and Russian mathematician (born 1934)
(ICM) in Nice. In 1978 he was a Plenary Speaker with talk Absolute Continuity and Singularity of Probability Measures in Functional Spaces at the ICM in Helsinki
Albert_Shiryaev
conservatism in China is the continuity of the Chinese civilizational tradition and opposition to Western secular modernity. Summarizing research in the Chinese
Politics_of_China
Indicator function of positive numbers
continuous probability distribution that is peaked around zero and has a parameter that controls for variance can serve as an approximation, in the limit
Heaviside_step_function
Field of analytic philosophy
argues that the relevant continuity to be preserved in conceptual engineering is that of topics; as long as there is continuity in the topics our concepts
Conceptual_engineering
System for reasoning about vagueness
logic is different in character from probability, and is not a replacement for it. He fuzzified probability to fuzzy probability and also generalized
Fuzzy_logic
Test of statistical significance
repeated experiments produce binary data. If one assumes an underlying probability π 0 {\displaystyle \pi _{0}} between 0 and 1, the null hypothesis is
Binomial_test
Mathematics of real numbers and real functions
real analysis is sometimes called advanced calculus, and studies limits, continuity, compactness, differentiation, integration, and series. More advanced
Real_analysis
Hypothesis regarding European intellectual history
In the history of ideas, the continuity thesis is the hypothesis that there was no radical discontinuity between the intellectual development of the Middle
Continuity_thesis
Russian Airborne Troops unit
July 25, 1992. By order of the Commander of the Airborne Troops in the historical continuity this day is considered to be the day of formation of this battalion
45th_Guards_Spetsnaz_Brigade
Twentieth letter in the Greek alphabet
(2017). Probability and Statistics for Scientists and Engineers (9th ed.). Brewer, Ebenezer Cobham. The reader's handbook of famous names in fiction,
Upsilon
Exactly solvable model of coupled oscillators
{\displaystyle \int _{-\pi }^{\pi }\rho (\theta ,\omega ,t)\,d\theta =1.} The continuity equation for oscillator density will be ∂ ρ ∂ t + ∂ ∂ θ [ ρ v ] = 0 ,
Kuramoto_model
Forming something new and somehow valuable
the probability that diverse cognitive elements will in fact become associated. Together, these processes enable creativity. Barbara Fredrickson, in her
Creativity
Hypothetical process of digitally emulating a brain
copy-and-delete), based on a theory grounded in emergent materialism, functionalism, and psychological continuity theory. According to him, psychological identity
Mind_uploading
Math problem notebook in Lwów (1930s–1941)
before the German attack on the Soviet Union. The problem involved the probability distribution of matches within a matchbox, a question motivated by Banach's
Scottish_Book
Mathematical statistics distance measure
distance: a measure of how much an approximating probability distribution Q is different from a true probability distribution P. Mathematically, it is defined
Kullback–Leibler_divergence
Technique for the generative modeling of a continuous probability distribution
_{0}=\pi _{1}} . The probability path and the velocity field also satisfy the continuity equation, in the sense of probability distribution: ∂ t p t
Diffusion_model
CONTINUITY IN-PROBABILITY
CONTINUITY IN-PROBABILITY
Boy/Male
French, German, Polish
Long
Surname or Lastname
English (rare in England)
English (rare in England) : apparently a habitational name from Huccaby in Devon, possibly so named from Old English woh ‘crooked’ + byge ‘river bend’, or Uckerby in North Yorkshire, named with an unattested Old Norse personal name, Úkyrri or Útkári, + býr ‘farmstead’.
Surname or Lastname
English (found mainly in Wales)
English (found mainly in Wales) : variant of Glasscock 2.
Surname or Lastname
English (rare in England)
English (rare in England) : variant of Hug 1.
Female
Irish
Irish form of French Madeline, MADAILÉIN means "of Magdala."
Surname or Lastname
English (also frequent in Wales)
English (also frequent in Wales) : patronymic from the personal name Watkin.
Surname or Lastname
English (frequent in eastern England)
English (frequent in eastern England) : ethnic name from Norman French aleman ‘German’ or alemayne ‘Germany’ (Late Latin Alemannus and Alemannia, from a Germanic tribal name that probably originally meant ‘all the men’). In some cases the surname may be from the region of Normandy known as Allemagne (south of Caen), probably named as a Germanic-speaking enclave in a Celtic area in Roman times. In North America, the form Allman has probably absorbed some cases of cognates from other languages, in particular Spanish Aleman and French Alleman.German (Allmann) : variant of Allemann (see Alleman) or in some cases probably an Americanized form of the same name.
Surname or Lastname
English (common in West Yorkshire)
English (common in West Yorkshire) : habitational name from Hainworth in West Yorkshire, named from the Old English personal name Hagena + Old English worð ‘enclosure’.English (common in West Yorkshire) : habitational name from Ainsworth in Lancashire, from the Old English personal name Ægen + worð ‘enclosure’. Names such as de Haynesworth and de Heynesworth occur in the surrounding area in the 14th century.
Female
Irish
Variant spelling of Irish Gaelic LÃadan, LÃADÃIN means "grey lady."
Boy/Male
Hindu, Indian, Marathi
Continuing; The Best; Son
Girl/Female
Bengali, Hindu, Indian, Kannada, Sindhi, Tamil, Telugu, Traditional
Continuies Smiling Girl
Surname or Lastname
English (also established in Ireland)
English (also established in Ireland) : from a pet form of the personal name Pell.English (also established in Ireland) : nickname from Old French pele ‘bald’.
Surname or Lastname
English (formerly common in Kent)
English (formerly common in Kent) : unexplained. This name seems to have died out in Britain.
Surname or Lastname
Scottish (also found in Ireland)
Scottish (also found in Ireland) : reduced form of McDow. This surname is borne by a sept of the Buchanans.English : variant of Daw.Americanized spelling of Dutch Douw, an Old Frisian personal name.Americanized spelling of German Dau.Henry Dow (1634–1707), NH soldier and statesman, was born at Ormsby in Norfolkshire, England. His father migrated with his family to Watertown in the colony of Massachusetts Bay in 1637 and moved to Hampton in the province of NH in 1644. Henry became an influential and prosperous figure in Hampton. He married twice and had four sons.
Surname or Lastname
Swedish (common in Finland)
Swedish (common in Finland) : ornamental name formed with the common surname suffix -in and an unexplained first element.German : unexplained.English : unexplained.Spanish (FarÃn) : unexplained.
Boy/Male
Tamil
Continuing, The best, Son
Male
Croatian
, goodness.
Girl/Female
Hindu, Indian, Marathi, Sanskrit
Continuing; Forming an Interrupted Line
Boy/Male
Hindu, Indian, Kannada, Marathi, Sanskrit, Telugu
Never Ending; Persistence; Continuity; Perpetuity; Eternity; Uninterrupted Duration; Diligence; Conscientiousness; Truthful; Straightforward; Honest
Surname or Lastname
English (found chiefly in the West Midlands and in Ireland)
English (found chiefly in the West Midlands and in Ireland) : habitational name from Hodnet in Shropshire, or any of various places called Hoddnant in Wales. The place names are from Welsh hawdd ‘pleasant’, ‘peaceful’ + nant ‘valley’, ‘stream’.
CONTINUITY IN-PROBABILITY
CONTINUITY IN-PROBABILITY
Boy/Male
Tamil
The first Ray of light, Part of parents, Gift of God
Surname or Lastname
English (mainly northeastern) and Scottish
English (mainly northeastern) and Scottish : unexplained.
Girl/Female
German, Swedish
Will; Helmet; Protection
Male
Hebrew
(בָּזָק) Hebrew name BAZAK means "flash of light."
Female
Irish
Irish form of Spanish Theresa, TOIRÉASA means "harvester."
Boy/Male
Greek
Rock.
Male
Serbian
(Михаило) Serbian form of Greek Michaēl, MIHAILO means "who is like God?"
Boy/Male
American, Australian
Will; Desire and Helmet; Protection
Boy/Male
Biblical
An exaltation, a basket.
Boy/Male
Tamil
CONTINUITY IN-PROBABILITY
CONTINUITY IN-PROBABILITY
CONTINUITY IN-PROBABILITY
CONTINUITY IN-PROBABILITY
CONTINUITY IN-PROBABILITY
prep.
With reference to movement or tendency toward a certain limit or environment; -- sometimes equivalent to into; as, to put seed in the ground; to fall in love; to end in death; to put our trust in God.
v. t.
To inclose; to take in; to harvest.
adv.
With privilege or possession; -- used to denote a holding, possession, or seisin; as, in by descent; in by purchase; in of the seisin of her husband.
prep.
With reference to a whole which includes or comprises the part spoken of; as, the first in his family; the first regiment in the army.
prep.
With reference to space or place; as, he lives in Boston; he traveled in Italy; castles in the air.
prep.
With reference to physical surrounding, personal states, etc., abstractly denoted; as, I am in doubt; the room is in darkness; to live in fear.
n.
A holding together; continuity.
prep.
With reference to circumstances or conditions; as, he is in difficulties; she stood in a blaze of light.
a.
Exhibiting a dissolution of continuity; gaping.
adv.
Not out; within; inside. In, the preposition, becomes an adverb by omission of its object, leaving it as the representative of an adverbial phrase, the context indicating what the omitted object is; as, he takes in the situation (i. e., he comprehends it in his mind); the Republicans were in (i. e., in office); in at one ear and out at the other (i. e., in or into the head); his side was in (i. e., in the turn at the bat); he came in (i. e., into the house).
prep.
A prefix from Eng. prep. in, also from Lat. prep. in, meaning in, into, on, among; as, inbred, inborn, inroad; incline, inject, intrude. In words from the Latin, in- regularly becomes il- before l, ir- before r, and im- before a labial; as, illusion, irruption, imblue, immigrate, impart. In- is sometimes used with an simple intensive force.
a.
Continuing; lasting.
n.
the state of being continuous; uninterupted connection or succession; close union of parts; cohesion; as, the continuity of fibers.
n.
Uninterrupted course; continuity.
pl.
of Continuity
prep.
With reference to a limit of time; as, in an hour; it happened in the last century; in all my life.
v. t.
To place in close connection or contiguity; to juxtapose.
n.
Community of limits; contiguity.
n.
One who is in office; -- the opposite of out.
n.
The state of being contiguous; intimate association; nearness; proximity.