Competing frogs on Z^d, with T. Hirscher and F.Lopes, submitted.
The two-type Richardson model in the half-plane, with D.Ahlberg and C.Hoffman, submitted.
Competing first passage percolation on random graphs with finite variance degrees, with D.Ahlberg and S.Janson, Random Structures and Algorithms, to appear.
The tail does not determine the size of the giant, with S.Rosengren and P.Trapman, Journal of Statistical Physics 173 (special issue on complex networks), 736-745.
A spatial epidemic model with site contamination, with T.Britton and F.Lopes, Markov Processes and Related Fields 24, 25-38.
Birds of a feather or opposites attract - effects in network modelling, with R.Fitzner, Internet Mathematics 2017:11.
Friendly frogs, stable marriage, and the magic of invariance, with A.Holroyd and J.Martin, American Mathematical Monthly 124, 387-402.
First passage percolation on Z^2 - a simulation study, with S.E. Alm, Journal of Statistical Physics 161, 657-678.
Routeing on trees, with N.Gantert, Journal of Applied Probability 53, 475-488.
The winner takes it all, with R.van der Hofstad, Annals of Applied Probability 26, 2419-2453.
Bipartite stable Poisson graphs on R, with F.Lopes, Markov Processes and Related Fields 18:4, 583-594.
A weighted configuration model and inhomogeneous epidemics, with T.Britton and F.Liljeros, Journal of Statistical Physics 145, 1368-1384.
Scale-free percolation, with R.van der Hofstad and G.Hooghiemstra, Annales de l'Institute Henri Poincare 49, 817-838.
Stable Poisson graphs in one dimension, with A.Holroyd and Y.Peres, Electronic Journal of Probability 16, 1238-1253.
Epidemics and vaccination on weighted graphs, Mathematical Biosciences 232:1, 57-65.
Random networks with preferential growth and vertex death, Journal of Applied Probability 47:4, 1150-1163.
Percolation in invariant Poisson graphs with iid degrees, with O.Häggström and A.Holroyd, Arkiv för Matematik 50, 41-58.
On the speed of biased random walk in translation invariant percolation, with O.Häggström, ALEA 7, 19-40.
Growing networks with preferential deletion and addition of edges, with M.Lindholm, Physica A 388, 4297-4303.
Stationary random graphs with prescribed iid degrees on a spatial Poisson process, Electronic Communications in Probability 14, 81-89.
Epidemics on random graphs with tunable clustering, with T.Britton, A.Lagerås and M.Lindholm, Journal of Applied Probability 45:1, 743-756.
The pleasures and pains of studying the two-type Richardson model, with O.Häggström, in Analysis and Stochastics of Growth Processes and Interface Models (eds. P.Mörters, R.Moser, M.Penrose, H.Schwetlick and J.Zimmer), Oxford University Press, pp 39-54.
Random intersection graphs with tunable degree distribution and clustering, with W.Kets, Probability in the Engineering and Informational Sciences 23, 661-674.
A preferential attachment model with random initial degrees, with H.van den Esker, R.van der Hofstad and G.Hooghiemstra, Arkiv för Matematik 47:1, 41-72.
The two-type Richardson model with unbounded initial configurations, with O.Häggström, Annals of Applied Probability 17:5, 1639-1656.
Stationary random graphs on Z with prescribed iid degrees and finite mean connections, with J.Jonasson, Electronic Communications in Probability 11, 336-346.
Generating simple random graphs with prescribed degree distribution, with T.Britton and A.Martin-Löf, Journal of Statistical Physics 124:6, 1377-1397.
Generating stationary random graphs on Z with prescribed iid degrees, with R. Meester, Advances in Applied Probability 38:2, 287-298.
Nonmonotonic coexistence regions for the two-type Richardson model on graphs, with O.Häggström, Electronic Journal of Probability 11, 331--344.
Epidemispridning på sociala grafer (in Swedish), Normat 52:3, 122-136.
Coexistence in a two-type continuum growth model, with O.Häggström, Advances in Applied Probability 36:4, 973-980.
The initial configuration is irrelevant for the possibility of mutual unbounded growth in the two-type Richardson model, with O.Häggström, Combinatorics Probability and Computing 15:3, 345-353.
A stochastic model for competing growth on R^d, with O.Häggström and J.Bagley, Markov Processes and Related Fields 10:2, 217-248.
Asymptotic shape in a continuum growth model, Advances in Applied Probability 35:2, 303-318.