2007
DOI: 10.1016/j.anihpb.2006.07.005
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Self-intersection local time of (α,d,β)(α,d,β)-superprocess☆

Abstract: Abstract. The existence of self-intersection local time (SILT), when the time diagonal is intersected, of the (α, d, β)-superprocess is proved for d/2 < α and for a renormalized SILT when d/(2 + (1 + β) −1 ) < α ≤ d/2. We also establish Tanaka-like formula for SILT.

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Cited by 3 publications
(9 citation statements)
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“…In [15], Mytnik and Villa introduced a truncation method for (α, β)processes with β < 1, which can be used to study (α, β)-processes with β < 1, especially to extend results of (α, 1)-processes to (α, β)-processes with β < 1. Specifically, for the (α, β)-process ξ with β < 1, we define the stopping time τ K = inf{t > 0 : ∆ξ t > K} for any constant K > 0.…”
Section: Truncated Superprocesses and Local Finitenessmentioning
confidence: 99%
See 3 more Smart Citations
“…In [15], Mytnik and Villa introduced a truncation method for (α, β)processes with β < 1, which can be used to study (α, β)-processes with β < 1, especially to extend results of (α, 1)-processes to (α, β)-processes with β < 1. Specifically, for the (α, β)-process ξ with β < 1, we define the stopping time τ K = inf{t > 0 : ∆ξ t > K} for any constant K > 0.…”
Section: Truncated Superprocesses and Local Finitenessmentioning
confidence: 99%
“…Proof: Follow Lemma 4.4 in [11], then use Lemma 3 of [15] and Lemma 3.2(ii). ✷ Now we consider the neighborhood measures of the clusters η K h associated with the truncated K-process ξ K .…”
Section: Hitting Bounds and Neighborhood Measuresmentioning
confidence: 99%
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“…When the region contains any part of the diagonal, through renormalization, the SILT for super Brownian motion has been shown by Adler & Lewin (1992) to exist in d ≤ 3, and further renormalization processes have been found to establish existence in higher dimensions by Rosen (1992) and Adler & Lewin (1991). In regards to non-Gaussian superprocesses, the SILT has been shown to exist for certain α– stable processes by Adler & Lewin (1991), and more recently, encompassing more α values, by Mytnik & Villa (2007). Of important note, as the L 2 –limit of an appropriate approximating process, Adler & Lewin have shown the existence of a class of renormalized SILT’s (indexed on λ > 0) for the super Brownian motion in dimensions d = 4 and 5 and for the super α -stable processes for d ∈ [2 α , 3 α ).…”
Section: Introductionmentioning
confidence: 99%