NONINTERSECTING RANDOM WALKS IN THE NEIGHBORHOOD OF A SYMMETRIC TACNODE
NONINTERSECTING RANDOM WALKS IN THE NEIGHBORHOOD OF A SYMMETRIC TACNODE
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Hayward: Institute of Mathematical Statistics
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Language
English
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Hayward: Institute of Mathematical Statistics
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Consider a continuous time random walk in ℤ with independent and exponentially distributed jumps ±1. The model in this paper consists in an infinite number of such random walks starting from the complement of {-m, -m + 1,..., m - 1, m} at time -t, returning to the same starting positions at time t, and conditioned not to intersect. This yields a de...
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Full title
NONINTERSECTING RANDOM WALKS IN THE NEIGHBORHOOD OF A SYMMETRIC TACNODE
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TN_cdi_projecteuclid_primary_oai_CULeuclid_euclid_aop_1372859761
Permalink
https://devfeature-collection.sl.nsw.gov.au/record/TN_cdi_projecteuclid_primary_oai_CULeuclid_euclid_aop_1372859761
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ISSN
0091-1798
E-ISSN
2168-894X
DOI
10.1214/11-AOP726
