Homogenization of a thermo-diffusion system with smoluchowski interactions. Krehel, O., Aiki, T., & Muntean, A. Networks and Heterogeneous Media, 2014.
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© American Institute of Mathematical Sciences. We study the solvability and homogenization of a thermal-diffusion reaction problem posed in a periodically perforated domain. The system describes the motion of populations of hot colloidal particles interacting together via Smoluchowski production terms. The upscaled system, obtained via twoscale convergence techniques, allows the investigation of deposition effects in porous materials in the presence of thermal gradients.
@article{
 title = {Homogenization of a thermo-diffusion system with smoluchowski interactions},
 type = {article},
 year = {2014},
 keywords = {Colloids,Combustion,Crossdiffusion,Homogenization,Thermal-diffusion,Well-posedness},
 volume = {9},
 id = {6990dd89-a0a8-3246-baa4-8172b527fb38},
 created = {2019-08-23T19:37:41.341Z},
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 abstract = {© American Institute of Mathematical Sciences. We study the solvability and homogenization of a thermal-diffusion reaction problem posed in a periodically perforated domain. The system describes the motion of populations of hot colloidal particles interacting together via Smoluchowski production terms. The upscaled system, obtained via twoscale convergence techniques, allows the investigation of deposition effects in porous materials in the presence of thermal gradients.},
 bibtype = {article},
 author = {Krehel, O. and Aiki, T. and Muntean, A.},
 doi = {10.3934/nhm.2014.9.739},
 journal = {Networks and Heterogeneous Media},
 number = {4}
}

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