Year |
Citation |
Score |
2023 |
Cabezas M, Fribergh A, Holmes M, Perkins E. Historical Lattice Trees. Communications in Mathematical Physics. 401: 435-496. PMID 37360187 DOI: 10.1007/s00220-023-04641-9 |
0.32 |
|
2020 |
Holmes M, Perkins E. On the range of lattice models in high dimensions. Probability Theory and Related Fields. 176: 941-1009. PMID 32355386 DOI: 10.1007/S00440-019-00933-1 |
0.353 |
|
2020 |
Hong J, Mytnik L, Perkins E. On the topological boundary of the range of super-Brownian motion Annals of Probability. 48: 1168-1201. DOI: 10.1214/19-Aop1386 |
0.362 |
|
2017 |
Mueller C, Mytnik L, Perkins E. On the boundary of the support of super-Brownian motion Annals of Probability. 45: 3481-3534. DOI: 10.1214/16-Aop1141 |
0.357 |
|
2017 |
Hofstad RRvd, Holmes MM, Perkins E. A criterion for convergence to super-Brownian motion on path space Annals of Probability. 45: 278-376. DOI: 10.1214/14-Aop953 |
0.437 |
|
2014 |
Mueller C, Mytnik L, Perkins E. Nonuniqueness for a parabolic SPDE with $\frac{3}{4}-\varepsilon $-Hölder diffusion coefficients Annals of Probability. 42: 2032-2112. DOI: 10.1214/13-Aop870 |
0.32 |
|
2007 |
Holmes MM, Perkins E. Weak convergence of measure-valued processes and r-point functions Annals of Probability. 35: 1769-1782. DOI: 10.1214/009117906000001088 |
0.396 |
|
2005 |
Durrett R, Mytnik L, Perkins E. Competing super-Brownian motions as limits of interacting particle systems Electronic Journal of Probability. 10. DOI: 10.1214/Ejp.V10-229 |
0.334 |
|
2003 |
Mytnik L, Perkins E. Regularity and irregularity of $\bolds{(1+\beta)}$-stable super-Brownian motion Annals of Probability. 31: 1413-1440. DOI: 10.1214/Aop/1055425785 |
0.365 |
|
1992 |
Perkins E. Measure-valued branching diffusions with spatial interactions Probability Theory and Related Fields. 94: 189-245. DOI: 10.1007/Bf01192444 |
0.328 |
|
1990 |
Perkins E. Polar Sets and Multiple Points for Super-Brownian Motion Annals of Probability. 18: 453-491. DOI: 10.1214/Aop/1176990841 |
0.332 |
|
1990 |
Evans SN, Perkins E. Measure-valued Markov branching processes conditioned on non-extinction Israel Journal of Mathematics. 71: 329-337. DOI: 10.1007/Bf02773751 |
0.369 |
|
1983 |
Greenwood P, Perkins E. A Conditioned Limit Theorem for Random Walk and Brownian Local Time on Square Root Boundaries The Annals of Probability. 11: 227-261. DOI: 10.1214/Aop/1176993594 |
0.369 |
|
1982 |
Perkins E. On the construction and distribution of a local martingale with a given absolute value Transactions of the American Mathematical Society. 271: 261-281. DOI: 10.1090/S0002-9947-1982-0648092-2 |
0.302 |
|
1982 |
Perkins E. Local time is a semi-martingale Probability Theory and Related Fields. 60: 79-117. DOI: 10.1007/Bf01957098 |
0.403 |
|
1982 |
Perkins E. Weak invariance principles for local time Probability Theory and Related Fields. 60: 437-451. DOI: 10.1007/Bf00535709 |
0.363 |
|
1982 |
Emery M, Perkins E. La filtration de B + L Probability Theory and Related Fields. 59: 383-390. DOI: 10.1007/Bf00532229 |
0.321 |
|
1981 |
Perkins E. A Global Intrinsic Characterization of Brownian Local Time Annals of Probability. 9: 800-817. DOI: 10.1214/Aop/1176994309 |
0.336 |
|
1981 |
Perkins E. The exact Hausdorff measure of the level sets of Brownian motion Probability Theory and Related Fields. 58: 373-388. DOI: 10.1007/Bf00542642 |
0.38 |
|
1981 |
Chacon RV, Jan YL, Perkins E, Taylor SJ. Generalised arc length for brownian motion and Lévy processes Probability Theory and Related Fields. 57: 197-211. DOI: 10.1007/Bf00535489 |
0.356 |
|
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