[1] LAVRENOV I V. The wave energy concentration at the Agulhas current off South Africa[J]. Natural Hazards, 1998, 17(2):117-127. [2] LAWTON G. Monsters of the deep (the perfect wave)[J]. New Scientist, 2001, 170(2297): 28-32. [3] KJELDSEN S P. Dangerous wave groups[J]. Norwegian Maritime Research, 1984, 12(2): 4-6. [4] DIEKISON D. Huge waves[J]. Outside Magazine, 1995: 3-5. [5] HAVER S. A possible freak wave event measured at the Draupner Jacket January 1 1995[C]// Rogue Waves 2004. Brest, France: Ifremer, 2004:1-8. [6] WARWIEK R W. Hurricane Luis, the Queen Elizabeth 2 and a rogue wave[J]. Marine Observer, 1996, 66: 134. [7] HOLLIDAY N P, YELLAND M J, PASEAL R W, et al. Were extreme waves in the Rockall through the largest ever recorded? [J]. Geophysical Research Letters, 2006, 33(5): 151-162. [8] DIDENKULOVA I I, SLUNYAEV A V, PELINOVSKY E N, et al. Freak waves in 2005[J]. Natural Hazards and Earth System Sciences,2006, 6: 1007-1015. [9] SOLLI D R, ROPERS C, KOONATH P, et al. Optical rogue waves[J]. Nature,2007, 54: 1054-1057. [10] KIBLER B, FATOME J, FINOT C, et al. The Peregrine soliton in nonlinear fibre optics[J]. Nature Physics, 2010, 6(10): 790-795. [11] LAVEDER D, PASSOT T T, SULEM P, et al. Rogue waves in Alfvénic turbulence[J]. Physics Letters A, 2011, 375: 3997-4002. [12] BLUDOV Y, KONOTOP V, AKHMEDIEV N. Matter rogue waves[J]. Physical Review A, 2009, 80(3): 033610. [13] MOSLEM W M, SHUKLA P K,ELIASSON B. Surface plasma rogue waves[J]. Europhys Lett, 2011, 96(2): 25002- 25005. [14] MOSLEM W M, SABRY R, EL-LABANY S K, et al. Dust-acoustic rogue waves in a nonextensive plasma[J]. Physical Review E, 2011, 84(6): 066402. [15] YAN Z, KONOTOP V V, AKHMEDIEV N. Three-dimensional rogue waves in nonstationary parabolic potentials[J]. Phys Rev E, 2010, 82: 036610. [16] YAN Zhenya. Financial rogue waves[J]. Communications in Theoretical Physics, 2010, 54: 947-949. [17] YAN Z . Vector financial rogue waves[J]. Physics Letters A, 2011, 375(48): 4274-4279. [18] ZHANG X,CHEN Y. Rogue wave and a pair of resonance stripe solitons to a reduced (3+1)-dimensional Jimbo-Miwa equation[J].Communications in Nonlinear Science and Numerical Simulation, 2017, 52: 24-31. [19] HUANG L L, CHEN Y. Lump solutions and interaction phenomenon for (2+1)-dimensional Sawada-Kotera equation[J]. Communications in Theoretical Physics, 2017, 67(5): 473-478. [20] ZHENG P F, JIA M. A more general form of lump solution, lumpoff, and instanton/rogue wave solutions of a reduced (3+1)-dimensional nonlinear evolution equation[J]. Chin Phys B, 2018, 27(12): 120201. [21] ZOU L, YU Z B, TIAN S F, et al. Lump solutions with interaction phenomena in the (2+1)-dimensional Ito equation[J]. Modern Physics Letters B, 2018: 1850104. [22] ZHANG Xiaoen, CHEN Yong. Rogue wave and a pair of resonance stripe solitons to a reduced generalized (3+1)-dimensional KP equation[DB/OL]. [2018-01-01]. https://arxiv.org/abs/1610.09507. [23] JIA S L, GAO Y T, HU W Q, et al. Solitons and breather waves for a (2+1)-dimensional Sawada-Kotera equation[J]. Modern Physics Letters B, 2017, 31(22): 1750129. [24] FERMI E, PASTA J, ULAM S. Studies of nonlinear problems[R]. Los Alamos, NM: Los Alamos Scientific Lab, 1955: Report No. LA-1940. [25] LANDOU L D, LIFSHITZ E M. Mechanics[M]. 3rd ed. Moscow: Nauka, 1993: 79. [26] ZHANG X, CHEN Y. Rogue wave and a pair of resonance stripe solitons to a reduced (3+1)-dimensional Jimbo-Miwa equation[J]. Communications in Nonlinear Science Numerical Simulation, 2017, 52: 24-31. [27] CHEN M D, LI X, WANG Y, et al. A pair of resonance stripe solitons and lump solutions to a reduced (3+1)-dimensional nonlinear evolution equation[J]. Communications in Theoretical Physics, 2017, 67(6): 595-600. [28] HUANG L L, CHEN Y. Lump solutions and interaction phenomenon for (2+1)-dimensional Sawada-Kotera equation[J]. Communications in Theoretical Physics, 2017, 67(5): 473-478. [29] ZHANG Xiaoen, CHEN Yong. Deformation rogue wave to the (2+1)-dimensional KdV equation[J]. Nonliear Dynamics, 2017, 90: 755-763.
() () |