Random censoring in set-indexed survival analysis

“…Lemma 4.5) and (μ n (A) −μ(A)) → P 0 for every A ∈ B, (15) → P 0 by the exact same reasoning as for equation (29) in [2], while (18) …”

“…Before moving on to measurable random sets, we should note that although we are restricting ourselves to a compact set T , all of the definitions and developments throughout this work can easily be expanded to a non-compact space using the structure found in Definition 2.1 of [2] (i.e., there exists an increasing sequence of compact sets (K n ) such that…”

“…For T = [0, 1] 2 , there is a (0, 1]-valued random variable C such that ξ = [0, C ] 2 and so S = {[0, w] 2 : 0 < w ≤ 1}. This is a common censoring mechanism in medical studies involving two observations Y 1 and Y 2 on each test subject.…”

“…In recent papers, [1][2][3], the problem of survival analysis on a general partially ordered complete separable metric space was approached from the point of view of set-indexed martingales (cf. [4]).…”

Estimation of a distribution under generalized censoring

“…Lemma 4.5) and (μ n (A) −μ(A)) → P 0 for every A ∈ B, (15) → P 0 by the exact same reasoning as for equation (29) in [2], while (18) …”

“…Before moving on to measurable random sets, we should note that although we are restricting ourselves to a compact set T , all of the definitions and developments throughout this work can easily be expanded to a non-compact space using the structure found in Definition 2.1 of [2] (i.e., there exists an increasing sequence of compact sets (K n ) such that…”

“…For T = [0, 1] 2 , there is a (0, 1]-valued random variable C such that ξ = [0, C ] 2 and so S = {[0, w] 2 : 0 < w ≤ 1}. This is a common censoring mechanism in medical studies involving two observations Y 1 and Y 2 on each test subject.…”

“…In recent papers, [1][2][3], the problem of survival analysis on a general partially ordered complete separable metric space was approached from the point of view of set-indexed martingales (cf. [4]).…”

Estimation of a distribution under generalized censoring

“…The frame of set-indexed processes is not only a new step of generalization of multiparameter processes, but it provides a real tool in modeling (e. g. [13]). Then a set-indexed extension of fractional Brownian motion is hoped to provide a powerful model for multidimensional phenomena.…”

A Set-indexed Fractional Brownian Motion

Filtering of Multiparameter Processes: Theory and Applications