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	Robusno modelovanje mešavina ×	Робусна анализа латентних класа ×
Oblast	Statistika	Statistika
Porodica	Latent structure	Latent structure
Godina nastanka≠	2000–2008	2000s
Tvorac≠	Peel & McLachlan (t-mixture); Garcia-Escudero et al. (trimming framework)	Building on Hennig (2004) and Vermunt & Magidson (2004)
Tip≠	Latent-class probabilistic clustering with outlier protection	Robust latent variable / mixture model
Temeljni izvor≠	Garcia-Escudero, L. A., Gordaliza, A., Matran, C. & Mayo-Iscar, A. (2008). A general trimming approach to robust cluster analysis. Annals of Statistics, 36(3), 1324–1345. DOI ↗	Hennig, C. (2004). Breakdown points for maximum likelihood estimators of location-scale mixtures. Annals of Statistics, 32(4), 1313–1340. DOI ↗
Drugi nazivi≠	robust mixture model, robust GMM, outlier-robust mixture model, trimmed mixture model	robust LCA, outlier-resistant latent class analysis, trimmed-likelihood latent class analysis
Srodne≠	5	6
Sažetak≠	Robust mixture modeling fits finite mixture models — probabilistic clustering methods that assume data arise from a blend of underlying subpopulations — using component distributions or estimation strategies designed to be insensitive to outliers and heavy-tailed noise. The two dominant approaches replace Gaussian components with heavier-tailed distributions such as the multivariate t, or trim a fixed proportion of the most extreme observations before fitting.	Robust latent class analysis (robust LCA) extends the standard latent class model by incorporating outlier-resistant estimation techniques — such as trimmed likelihood, M-estimation, or downweighting — so that atypical response patterns do not distort the recovered class structure or class membership probabilities.
ScholarGateSkup podataka ↗	v1 2 Izvori PUBLISHED	v1 2 Izvori PUBLISHED

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