Characterizing the distributions of three independent $n$-dimensional random variables, $X_{1},\,X_{2},\,X_{3},$ having analytic characteristic functions by the joint distribution of $(X_{1}+X_{3},\,X_{2}+X_{3})$.
Miller, Paul G.
Pacific J. Math., Tome 35 (1970) no. 3, p. 487-491 / Harvested from Project Euclid
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Publié le : 1970-05-14
Classification:  60.20 
@article{1102971643,
     author = {Miller, Paul G.},
     title = {Characterizing the distributions of three independent $n$-dimensional random variables, $X\_{1},\,X\_{2},\,X\_{3},$ having analytic characteristic functions by the joint distribution of $(X\_{1}+X\_{3},\,X\_{2}+X\_{3})$.},
     journal = {Pacific J. Math.},
     volume = {35},
     number = {3},
     year = {1970},
     pages = { 487-491},
     language = {en},
     url = {http://dml.mathdoc.fr/item/1102971643}
}

Miller, Paul G. Characterizing the distributions of three independent $n$-dimensional random variables, $X_{1},\,X_{2},\,X_{3},$ having analytic characteristic functions by the joint distribution of $(X_{1}+X_{3},\,X_{2}+X_{3})$.. Pacific J. Math., Tome 35 (1970) no. 3, pp.  487-491. http://gdmltest.u-ga.fr/item/1102971643/