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Volumn 25, Issue 1, 1998, Pages 235-242

A limit theorem for solutions of inequalities

Author keywords

Aumann expectation; Hausdorff metric; Level set; Polar set; Quantile; Random set; Weak convergence

Indexed keywords


EID: 0032362040     PISSN: 03036898     EISSN: None     Source Type: Journal    
DOI: 10.1111/1467-9469.00100     Document Type: Article
Times cited : (50)

References (19)
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    • Molchanov, I.S.1
  • 11
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    • The excess-mass ellipsoid
    • Nolan, D. (1991). The excess-mass ellipsoid. J. Multivar. Anal. 39, 348-371.
    • (1991) J. Multivar. Anal. , vol.39 , pp. 348-371
    • Nolan, D.1
  • 12
    • 0042387204 scopus 로고
    • Semicontinuous processes in multi-dimensional extreme-value theory
    • Norberg, T. (1987). Semicontinuous processes in multi-dimensional extreme-value theory. Stochastic Process. Appl. 25, 27-55.
    • (1987) Stochastic Process. Appl. , vol.25 , pp. 27-55
    • Norberg, T.1
  • 13
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    • Measuring mass concentrations and estimating density contour clusters - An excess mass approach
    • Polonik, W. (1995). Measuring mass concentrations and estimating density contour clusters - an excess mass approach. Ann. Statist. 23, 855-881.
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    • Polonik, W.1
  • 14
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    • Princeton University Press, Princeton, NJ
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    • Rockafellar, R.T.1
  • 15
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    • On the convergence in distribution of measurable multifunctions (random sets), normal integrands, stochastic processes and stochastic infima
    • Salinetti, G. & Wets, R. J.-B. (1986). On the convergence in distribution of measurable multifunctions (random sets), normal integrands, stochastic processes and stochastic infima. Math. Oper. Res. 11, 385-419.
    • (1986) Math. Oper. Res. , vol.11 , pp. 385-419
    • Salinetti, G.1    Wets, R.J.-B.2
  • 18
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    • An alternate formulation of mean value for random geometric figures
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    • An application of the central limit theorem for Banach-space-valued random variables to the theory of random sets
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    • Weil, W.1


* 이 정보는 Elsevier사의 SCOPUS DB에서 KISTI가 분석하여 추출한 것입니다.