I agree that this site is using cookies. You can find further informations
here
.
X
Login
My folder (
0
)
Home
About us
Home About us
Our history
Profile
Press & public relations
Friends
The library in figures
Exhibitions
Projects
Training, internships, careers
Films
Services & Information
Home Services & Information
Lending and interlibrary loans
Returns and renewals
Training and library tours
My Account
Library cards
New to the library?
Download Information
Opening hours
Learning spaces
PC, WLAN, copy, scan and print
Catalogs and collections
Home Catalogs and Collections
Rare books and manuscripts
Digital collections
Subject Areas
Our sites
Home Our sites
Central Library
Law Library (Juridicum)
BB Business and Economics (BB11)
BB Physics and Electrical Engineering
TB Engineering and Social Sciences
TB Economics and Nautical Sciences
TB Music
TB Art & Design
TB Bremerhaven
Contact the library
Home Contact the library
Staff Directory
Open access & publishing
Home Open access & publishing
Reference management: Citavi & RefWorks
Publishing documents
Open Access in Bremen
Show Desktop-Version
Toggle navigation
Matzke, Kilian
18
results:
Search for persons
X
Format
Online (18)
Mediatypes
Articles (Online) (4)
OpenAccess-fulltext (13)
Thesis (Online) (1)
Sorted by: Relevance
Sorted by: Year
?
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/..
?
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/..
?
3
On phase transitions in random spatial systems:
Matzke, Kilian
, 2020
Link:
https://nbn-resolving.de..
?
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/..
?
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/..
?
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...
?
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..
?
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...
?
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..
?
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..
?
11
Critical site percolation in high dimension:
Heydenreich, Markus
;
Matzke, Kilian
http://arxiv.org/abs/1911.04159. , 2019
Link:
http://arxiv.org/abs/191..
?
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-..
?
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..
?
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-..
?
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-..
1-15