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Matzke, Kilian
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1

The direct-connectedness function in the random connection ..:

Jansen, Sabine ; Kolesnikov, Leonid ; Matzke, Kilian
Advances in Applied Probability.  55 (2022)  1 - p. 179-222 , 2022
Link: https://doi.org/10.1017/..
 
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2

Expansion for the critical point of site percolation: the f..:

Heydenreich, Markus ; Matzke, Kilian
Combinatorics, Probability and Computing.  31 (2021)  3 - p. 430-454 , 2021
Link: https://doi.org/10.1017/..
 
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3

On phase transitions in random spatial systems:

Matzke, Kilian , 2020
Link: https://nbn-resolving.de..
 
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4

Critical Site Percolation in High Dimension:

Heydenreich, Markus ; Matzke, Kilian
Journal of Statistical Physics.  181 (2020)  3 - p. 816-853 , 2020
Link: https://doi.org/10.1007/..
 
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5

Reptilings and space-filling curves for acute triangles:

Gottschau, Marinus ; Haverkort, Herman ; Matzke, Kilian
Discrete & Computational Geometry.  60 (2017)  1 - p. 170-199 , 2017
Link: https://doi.org/10.1007/..
 
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6

Expansion for the critical point of site percolation: the f..:

Heydenreich, Markus ; Matzke, Kilian
https://opus.bibliothek.uni-augsburg.de/opus4/frontdoor/index/index/docId/103766.  , 2022
Link: https://opus.bibliothek...
 
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7

The Direct-Connectedness Function in the Random Connection ..:

Jansen, Sabine ; Kolesnikov, Leonid ; Matzke, Kilian
http://arxiv.org/abs/2010.03826.  , 2020
Link: http://arxiv.org/abs/201..
 
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8

Critical site percolation in high dimension:

Heydenreich, Markus ; Matzke, Kilian
https://opus.bibliothek.uni-augsburg.de/opus4/frontdoor/index/index/docId/103770.  , 2020
Link: https://opus.bibliothek...
 
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9

Expansion for the critical point of site percolation: the f..:

Heydenreich, Markus ; Matzke, Kilian
http://arxiv.org/abs/1912.04584.  , 2019
Link: http://arxiv.org/abs/191..
 
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10

Lace Expansion and Mean-Field Behavior for the Random Conne..:

Heydenreich, Markus ; van der Hofstad, Remco ; Last, Günter.
http://arxiv.org/abs/1908.11356.  , 2019
Link: http://arxiv.org/abs/190..
 
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11

Critical site percolation in high dimension:

Heydenreich, Markus ; Matzke, Kilian
http://arxiv.org/abs/1911.04159.  , 2019
Link: http://arxiv.org/abs/191..
 
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12

PHASE TRANSITION FOR A NON-ATTRACTIVE INFECTION PROCESS IN ..:

Gottschau, Marinus ; Heydenreich, Markus ; Matzke, Kilian.
info:eu-repo/grantAgreement//680275/EU/A mathematical approach to the liquid-glass transition: kinetically constrained models, cellular automata and mixed order phase transitions/MALIG.  , 2018
Link: https://hal.science/hal-..
 
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13

PHASE TRANSITION FOR A NON-ATTRACTIVE INFECTION PROCESS IN ..:

Gottschau, Marinus ; Heydenreich, Markus ; Matzke, Kilian.
info:eu-repo/grantAgreement//680275/EU/A mathematical approach to the liquid-glass transition: kinetically constrained models, cellular automata and mixed order phase transitions/MALIG.  , 2018
Link: https://hal.archives-ouv..
 
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14

PHASE TRANSITION FOR A NON-ATTRACTIVE INFECTION PROCESS IN ..:

Gottschau, Marinus ; Heydenreich, Markus ; Matzke, Kilian.
info:eu-repo/grantAgreement//680275/EU/A mathematical approach to the liquid-glass transition: kinetically constrained models, cellular automata and mixed order phase transitions/MALIG.  , 2018
Link: https://hal.science/hal-..
 
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15

PHASE TRANSITION FOR A NON-ATTRACTIVE INFECTION PROCESS IN ..:

Gottschau, Marinus ; Heydenreich, Markus ; Matzke, Kilian.
info:eu-repo/grantAgreement//680275/EU/A mathematical approach to the liquid-glass transition: kinetically constrained models, cellular automata and mixed order phase transitions/MALIG.  , 2018
Link: https://hal.science/hal-..
 
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