Generalized intervals and topology
نویسندگان
چکیده
منابع مشابه
Fiducial Generalized Confidence Intervals
Generalized pivotal quantities (GPQs) and generalized confidence intervals (GCIs) have proven to be useful tools for making inferences in many practical problems. Although GCIs are not guaranteed to have exact frequentist coverage, a number of published and unpublished simulation studies suggest that the coverage probabilities of such intervals are sufficiently close to their nominal value so a...
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For binary outcome data from epidemiological studies, this article investigates the interval estimation of several measures of interest in the absence or presence of categorical covariates. When covariates are present, the logistic regression model as well as the log-binomial model are investigated. The measures considered include the common odds ratio (OR) from several studies, the number need...
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Ateya and Madhagi (2011) introduced a multivariate form of truncated generalized Cauchy distribution (TGCD), which introduced by Ateya and Al-Hussaini (2007). The multivariate version of (TGCD) is denoted by (MVTGCD). Among the features of this form are that subvectors and conditional subvectors of random vectors, distributed according to this distribution, have the same form of distribution ...
متن کاملSemantic Tolerancing with Generalized Intervals
A new tolerance modeling scheme, semantic tolerance modeling, was recently developed to enable interpretable tolerance analysis. In this paper, a new dimensioning and tolerancing practice, semantic tolerancing, is proposed with the theoretical support of semantic tolerance models. Following principles of interpretability, this new tolerancing approach captures more design intent, including flex...
متن کاملGeneralized Kurepa and Mad Families and Topology
Closing a Kurepa family under finite intersection yields a Kurepa family of the same cardinality, so we may assume N = {Nα : α ∈ μ} is closed under finite intersection. For each N ∈ N let m(N) = {α : Nα ⊂ N}. Since N is a Kurepa family, m(N) is a countable subset of μ. Also, m(N1 ∩N2) = m(N1) ∩m(N2) and so K = {m(N) : N ∈ N and m(N) is infinite} is a Kurepa family of cardinality no greater than...
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ژورنال
عنوان ژورنال: Czechoslovak Mathematical Journal
سال: 1976
ISSN: 0011-4642,1572-9141
DOI: 10.21136/cmj.1976.101426