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Advances in
Applied Probability
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Author |
Title |
Pages |
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BAI, Z. D., LEE,
S. AND PENROSE, M. D. |
Rooted edges of a
minimal directed spanning tree on random points |
1–30 |
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BIERMÉ, H. AND ESTRADE, A. |
Poisson random
balls: self-similarity and X-ray images |
853–872 |
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BORDENAVE, C.,
GOUSSEAU, Y. AND ROUEFF, F. |
The dead leaves
model: a general tessellation modelling occlusion |
31–46 |
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CALKA, P. AND SCHREIBER, T. |
Large deviation
probabilities for the number of vertices of random polytopes in the ball |
47–58 |
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COWAN, R. |
A more comprehensive
complementary theorem for the analysis of Poisson point processes |
581–601 |
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DEIJFEN, M. AND MEESTER, R. |
Generating
stationary random graphs on Z with
prescribed independent, identically distributed degrees |
287–298 |
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ESTRADE, A. see BIERMÉ, H. |
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GOUSSEAU, Y. see BORDENAVE, C. |
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HUCKEMANN, S. AND ZIEZOLD, H. |
Principal
component analysis for Riemannian manifolds, with an application to
triangular shape spaces |
299–319 |
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LAST, G. |
Stationary
partitions and Palm probabilities |
602–620 |
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LEE, S. see BAI, Z. D. |
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MCCULLAGH, P. AND MØLLER, J. |
The permanental process |
873–888 |
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MEESTER, R. see DEIJFEN, M. |
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MØLLER, J. see MCCULLAGH, P. |
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NORROS, |
On a conditionally
Poissonian graph process |
59–75 |
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PANARETOS, V. M. |
The diffusion of
Radon shape |
320–335 |
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PANTLE, U., SCHMIDT, V. AND SPODAREV, E. |
Central limit
theorems for functionals of stationary germ–grain
models |
76–94 |
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PENROSE, M. D. AND WADE, A. R. |
On the total
length of the random minimal directed spanning tree |
336–372 |
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PENROSE, M. D. see BAI, Z. D. |
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REITTU, H. see NORROS, I. |
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ROUEFF, F. see BORDENAVE, C. |
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SCHMIDT, V. see PANTLE, U. |
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SCHREIBER, T. see CALKA, P. |
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SPODAREV, E. see PANTLE, U. |
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VAN LIESHOUT, M. N. M. |
Maximum likelihood
estimation for random sequential adsorption |
889–898 |
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WADE, A. R. see PENROSE, M. D. |
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ZIEZOLD, H. see HUCKEMANN, S. |
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