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Tellus A: Dynamic Meteorology and Oceanography Volume 70, 2018 - Issue 1
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Research Article

Improvement of the ocean pollutant transport model by using the surface spline interpolation

Xiaolong ZongPhysical Oceanography Laboratory, Ocean University of China, Qingdao, China; ;Qingdao National Laboratory for Marine Science and Technology, Qingdao, China; View further author information
,
Minjie XuPhysical Oceanography Laboratory, Ocean University of China, Qingdao, China; ;Qingdao National Laboratory for Marine Science and Technology, Qingdao, China; View further author information
,
Junli XuSchool of Mathematics and Physics, Qingdao University of Science and Technology, Qingdao, ChinaView further author information
&
Xianqing LvPhysical Oceanography Laboratory, Ocean University of China, Qingdao, China; ;Qingdao National Laboratory for Marine Science and Technology, Qingdao, China; Correspondence[email protected]
View further author information
Pages 1-13 | Received 14 Jun 2017, Accepted 21 May 2018, Published online: 06 Aug 2018

References

  • Arkhipov, B., Koterov, V., Solbakov, V., Shapochkin, D. and Yurezanskaya, Y. 2007. Numerical simulation of pollution and oil spill spreading by the stochastic discrete particle method. Comput. Math. Math. Phys. 47, 280–292. DOI:10.1134/S096554250702011X.
  • Boehm, P., Murray, K. and Cook, L. 2016. Distribution and attenuation of polycyclic aromatic hydrocarbons in Gulf of Mexico seawater from the deepwater horizon oil accident. Environ. Sci. Technol. 50, 584–592. DOI:10.1021/acs.est.5b03616.
  • Chen, H., Cao, A., Zhang, J., Miao, C. and Lv, X. 2014. Estimation of spatially varying open boundary conditions for a numerical internal tidal model with adjoint method. Math. Comput. Simul. 97, 14–38. DOI:10.1016/j.matcom.2013.08.005.
  • Chen, H-Z., Li, D-M. and Li, X. 2007. Mathematical modeling of oil spill on the sea and application of the modeling in Daya Bay. J. Hydrodynam. 19, 282–291. DOI:10.1016/S1001-6058(07)60060-2.
  • Correa, S., Araujo, J., Penha, J., Cunha, C., Stevenson, P. and co-authors. 2015. Overfishing disrupts an ancient mutualism between frugivorous fishes and plants in Neotropical wetlands. Biol. Conserv. 191, 159–167. DOI:10.1016/j.biocon.2015.06.019.
  • Debreu, L., Marchesiello, P., Penven, P. and Cambon, G. 2012. Two-way nesting in split-explicit ocean models: algorithms, implementation and validation. Ocean Model. 49–50, 1–21. DOI:10.1016/j.ocemod.2012.03.003.
  • Dimet, F. L. E. and Talagrand, O. 1986. Variational algorithms for analysis and assimilation of meteorological observations: theoretical aspects. Tellus A. 38, 97–110. DOI:10.3402/tellusa.v38i2.11706.
  • Egbert, G. D. and Erofeeva, S. Y. 2002. Efficient inverse modeling of barotropic ocean tides. J. Atmos. Ocean. Technol. 19, 183–204. DOI:10.1175/1520-0426(2002)019<0183:EIMOBO>2.0.CO;2.
  • Eyring, V., Köhler, H., Aardenne, J. and Lauer, A. 2005. Emissions from international shipping: 1. the last 50 years. J. Geophys. Res. 110, 3928–3950.
  • Faghihifard, M. and Badri, M. 2016. Simulation of oil pollution in the Persian Gulf near Assaluyeh oil terminal. Mar. Pollut. Bull. 105, 143–149. DOI:10.1016/j.marpolbul.2016.02.034.
  • Fan, W. and Lv, X. 2009. Data assimilation in a simple marine ecosystem model based on spatial biological parameterizations. Ecol. Model. 220, 1997–2008. DOI:10.1016/j.ecolmodel.2009.04.050.
  • Guo, Z., Pan, H., Fan, W. and Lv, X. 2017. Application of surface spline interpolation in inversion of bottom friction coefficients. J. Atmos. Ocean. Technol. 34, 2021–2028. DOI:10.1175/JTECH-D-17-0012.1.
  • Harder, R. and Desmarais, R. 17972. Interpolation using surface splines. J. Aircr. 9, 189–191. DOI:10.2514/3.44330.
  • Huang, H., Chen, G. and Zhang, Q. 2010. The distribution characteristics of pollutants released at different cross-sectional positions of a river. Environ. Pollut. 158, 1327–1333. DOI:10.1016/j.envpol.2010.01.010.
  • Kojima, K., Furumai, H., Hata, A., Kasuga, I., Kurisu, F. and co-authors. 2011. Monitoring and numerical simulation of pathogenic pollution after CSO event in coastal waters of Tokyo Bay. In: Proceedings of the 12th International Conference on Urban Drainage, Porto Alegre, 87–88.
  • Lee, S., Wolberg, G. and Shin, S. 1997. Scattered data interpolation with multilevel B-splines. IEEE Trans. Vis. Comput. Graph. 3, 228–244. DOI:10.1109/2945.620490.
  • Li, X., Wang, C., Fan, W. and Lv, X. 2013. Optimization of the spatiotemporal parameters in a dynamical marine ecosystem model based on the adjoint assimilation. Math. Probl. Eng. 2013, 1–12.
  • Lu, X. and Zhang, J. 2006. Numerical study on spatially varying bottom friction coefficient of a 2D tidal model with adjoint method. Cont. Shelf. Res. 26, 1905–1923. DOI:10.1016/j.csr.2006.06.007.
  • Meissa, B. and Gascuel, D. 2015. Overfishing of marine resources: Some lessons from the assessment of demersal stocks off Mauritania. ICES J. Mar. Sci. 72, 414–427. DOI:10.1093/icesjms/fsu144.
  • Øyvind,, E., Eirik, S., Sundet, J., Dalsøren, S., Isaksen, I. and co-authors. 2003. Emission from international sea transportation and environmental impact. J. Geophys. Res. Atmos. 108, 129–144.
  • Pan, H., Guo, Z. and Lv, X. 2017. Inversion of tidal open boundary conditions of the M2constituent in the Bohai and Yellow seas. J. Atmos. Ocean. Technol. 34, 1661–1672. DOI:10.1175/JTECH-D-16-0238.1.
  • Paul, J. H., Hollander, D., Coble, P., Daly, K. L., Murasko, S. and co-authors. 2013. Toxicity and mutagenicity of Gulf of Mexico waters during and after the Deepwater Horizon oil spill. Environ. Sci. Technol. 47, 9651–9659. DOI:10.1021/es401761h.
  • Peng, S. and Xie, L. 2006. Effect of determining initial conditions by four-dimensional variational data assimilation on storm surge forecasting. Ocean Model. 14, 1–18. DOI:10.1016/j.ocemod.2006.03.005.
  • Penven, P., Debreu, L., Marchesiello, P. and McWilliams, J. C. 2006. Evaluation and application of the ROMS 1-way embedding procedure to the central California upwelling system. Ocean Model. 12, 157–187. DOI:10.1016/j.ocemod.2005.05.002.
  • Perrin, F., Pernier, J., Bertnard, O., Giard, M. H. and Echallier, J. F. 1987. Mapping of scalp potentials by surface spline interpolation. Electroencephalogr. Clin. Neurophysiol. 66, 75–81. DOI:10.1016/0013-4694(87)90141-6.
  • Sámano, M., Pérez, M., Claramunt, I. and García, A. 2016. Assessment of the zinc diffusion rate in estuarine zones. Mar. Pollut. Bull. 104, 121–128. DOI:10.1016/j.marpolbul.2016.01.052.
  • Scholkmann, F., Spichtig, S., Muehlemann, T. and Wolf, M. 2010. How to detect and reduce movement artifacts in near-infrared imaging using moving standard deviation and spline interpolation. Physiol. Meas. 31, 649. DOI:10.1088/0967-3334/31/5/004.
  • Shchepetkin, A. and McWilliams, J. 2005. The regional oceanic modeling system (ROMS): a split-explicit, free-surface, topography-following-coordinate oceanic model. Ocean. Model. 9, 347–404. DOI:10.1016/j.ocemod.2004.08.002.
  • Shen, Y., Wang, C., Wang, Y. and Lv, X. 2015. Inversion study on pollutant discharges in the Bohai Sea with the adjoint method. J. Ocean Univ. China. 14, 941–950. DOI:10.1007/s11802-015-2501-8.
  • Sidorovskaia, N., Ackleh, A., Tiemann, C., Ma, B., Ioup, J. and co-authors. 2016. Passive acoustic monitoring of the environmental impact of oil exploration on marine mammals in the Gulf of Mexico. Adv. Exp. Med. Biol. 875, 1007–1014. DOI:10.1007/978-1-4939-2981-8.
  • Tappin, A., Burton, J., Millward, G. and Statham, P. 1997. A numerical transport model for predicting the distributions of Cd, Cu, Ni, Pb and Zn in the southern North Sea: the sensitivity of model results to the uncertainties in the magnitudes of metal inputs. J. Mar. Syst. 13, 173–204. DOI:10.1016/S0924-7963(96)00112-1.
  • Walsh, J., Lenes, J., Darrow, B., Parks, A. and Weisberg, R. 2016. Impacts of combined overfishing and oil spills on the plankton trophodynamics of the West Florida shelf over the last half century of 1965–2011: A two-dimensional simulation analysis of biotic state transitions, from a zooplankton-to a bacterioplank. Cont. Shelf Res. 116, 54–73. DOI:10.1016/j.csr.2016.01.007.
  • Walsh, J. J., Lenes, J. M., Darrow, B. P., Parks, A. A., Weisberg, R. H. and co-authors. 2015. A simulation analysis of the plankton fate of the Deepwater Horizon oil spills. Cont. Shelf Res. 107, 50–68. DOI:10.1016/j.csr.2015.07.002.
  • Wang, C., Li, X. and Lv, X. 2013. Numerical study on initial field of pollution in the Bohai Sea with an adjoint method. Math. Probl. Eng. 4, 389–405.
  • Wang, D., Cao, A., Zhang, J., Fan, D., Liu, Y., and co-authors. 2016. A three-dimensional cohesive sediment transport model with data assimilation: Model development, sensitivity analysis and parameter estimation. Estuar. Coast. Shelf. Sci. 206, 87–100.
  • Wang, D., Zhang, J., He, X., Chu, D., Lv, X. and co-authors. 2018. Parameter estimation for a cohesive sediment transport model by assimilating satellite observations in the Hangzhou Bay: Temporal variations and spatial distributions. Ocean Model. 121, 34–48. DOI:10.1016/j.ocemod.2017.11.007.
  • Wang, S., Shen, Y., Guo, Y. and Tang, J. 2008. Three-dimensional numerical simulation for transport of oil spills in seas. Ocean. Eng. 35, 503–510. DOI:10.1016/j.oceaneng.2007.12.001.
  • Wei, L., Hu, Z., Dong, L. and Zhao, W. 2015. A damage assessment model of oil spill accident combining historical data and satellite remote sensing information: a case study in Penglai 19-3 oil spill accident of China. Mar. Pollut. Bull. 91, 258–271. DOI:10.1016/j.marpolbul.2014.11.036.
  • Wijnands, J. S., Qian, G. and Kuleshov, Y. 2016. Spline-based modelling of near-surface wind speeds in tropical cyclones. Appl. Math. Model. 40, 8685–8707. DOI:10.1016/j.apm.2016.05.013.
  • Xing, Q., Meng, R., Lou, M., Bing, L. and Liu, X. 2015. Remote sensing of ships and offshore oil platforms and mapping the marine oil spill risk source in the Bohai Sea. Aquat. Procedia. 3, 127–132. DOI:10.1016/j.aqpro.2015.02.236.
  • Xu, M. and Chua, V. 2017. A numerical study on land-based pollutant transport in Singapore coastal waters with a coupled hydrologic-hydrodynamic model. J. Hydro-Environ. Res. 14, 119–142. DOI:10.1016/j.jher.2016.09.002.
  • Yu, L. and O'Brien, J. J. 1992. On the initial condition in parameter estimation. J. Phys. Oceanogr. 22, 1361. DOI:10.1175/1520-0485(1992)022<1361:OTICIP>2.0.CO;2.
  • Zhang, J. and Kitazawa, D. 2015. Numerical analysis of particulate organic waste diffusion in an aquaculture area of Gokasho Bay, Japan. Mar. Pollut. Bull. 93, 130–143. DOI:10.1016/j.marpolbul.2015.02.007.
  • Zhang, J. and Lu, X. 2008. Parameter estimation for a three-dimensional numerical barotropic tidal model with adjoint method. Int. Int. J. Numer. Meth. Fluids. 57, 47–92. DOI:10.1002/fld.1620.
  • Zhang, J., Lu, X., Wang, P. and Wang, Y. 2011. Study on linear and nonlinear bottom friction parameterizations for regional tidal models using data assimilation. Cont. Shelf Res. 31, 555–573. DOI:10.1016/j.csr.2010.12.011.
  • Zhang, J. and Wang, Y. 2014. A method for inversion of periodic open boundary conditions in two-dimensional tidal models. Comput. Methods Appl. Mech. Eng. 275, 20–38. DOI:10.1016/j.cma.2014.02.020.

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