The Schelling model on Z, with T.Hirscher, submitted.

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.