[{"article_type":"original","_id":"9335","doi":"10.1137/19M1300017","citation":{"apa":"Fischer, J. L., & Matthes, D. (2021). The waiting time phenomenon in spatially discretized porous medium and thin film equations. SIAM Journal on Numerical Analysis. Society for Industrial and Applied Mathematics. https://doi.org/10.1137/19M1300017","mla":"Fischer, Julian L., and Daniel Matthes. “The Waiting Time Phenomenon in Spatially Discretized Porous Medium and Thin Film Equations.” SIAM Journal on Numerical Analysis, vol. 59, no. 1, Society for Industrial and Applied Mathematics, 2021, pp. 60–87, doi:10.1137/19M1300017.","ista":"Fischer JL, Matthes D. 2021. The waiting time phenomenon in spatially discretized porous medium and thin film equations. SIAM Journal on Numerical Analysis. 59(1), 60–87.","chicago":"Fischer, Julian L, and Daniel Matthes. “The Waiting Time Phenomenon in Spatially Discretized Porous Medium and Thin Film Equations.” SIAM Journal on Numerical Analysis. Society for Industrial and Applied Mathematics, 2021. https://doi.org/10.1137/19M1300017.","ama":"Fischer JL, Matthes D. The waiting time phenomenon in spatially discretized porous medium and thin film equations. SIAM Journal on Numerical Analysis. 2021;59(1):60-87. doi:10.1137/19M1300017","ieee":"J. L. Fischer and D. Matthes, “The waiting time phenomenon in spatially discretized porous medium and thin film equations,” SIAM Journal on Numerical Analysis, vol. 59, no. 1. Society for Industrial and Applied Mathematics, pp. 60–87, 2021.","short":"J.L. Fischer, D. Matthes, SIAM Journal on Numerical Analysis 59 (2021) 60–87."},"date_created":"2021-04-18T22:01:42Z","acknowledgement":"This research was supported by the DFG Collaborative Research Center TRR 109, “Discretization in Geometry and Dynamics”.","year":"2021","department":[{"_id":"JuFi"}],"page":"60-87","quality_controlled":"1","volume":59,"publisher":"Society for Industrial and Applied Mathematics","date_published":"2021-01-01T00:00:00Z","publication_status":"published","external_id":{"isi":["000625044600003"],"arxiv":["1911.04185"]},"abstract":[{"text":"Various degenerate diffusion equations exhibit a waiting time phenomenon: depending on the “flatness” of the compactly supported initial datum at the boundary of the support, the support of the solution may not expand for a certain amount of time. We show that this phenomenon is captured by particular Lagrangian discretizations of the porous medium and the thin film equations, and we obtain sufficient criteria for the occurrence of waiting times that are consistent with the known ones for the original PDEs. For the spatially discrete solution, the waiting time phenomenon refers to a deviation of the edge of support from its original position by a quantity comparable to the mesh width, over a mesh-independent time interval. Our proof is based on estimates on the fluid velocity in Lagrangian coordinates. Combining weighted entropy estimates with an iteration technique à la Stampacchia leads to upper bounds on free boundary propagation. Numerical simulations show that the phenomenon is already clearly visible for relatively coarse discretizations.","lang":"eng"}],"language":[{"iso":"eng"}],"publication":"SIAM Journal on Numerical Analysis","title":"The waiting time phenomenon in spatially discretized porous medium and thin film equations","oa":1,"date_updated":"2023-08-08T13:10:40Z","issue":"1","article_processing_charge":"No","intvolume":" 59","scopus_import":"1","isi":1,"type":"journal_article","status":"public","author":[{"orcid":"0000-0002-0479-558X","last_name":"Fischer","id":"2C12A0B0-F248-11E8-B48F-1D18A9856A87","full_name":"Fischer, Julian L","first_name":"Julian L"},{"first_name":"Daniel","full_name":"Matthes, Daniel","last_name":"Matthes"}],"arxiv":1,"day":"01","main_file_link":[{"open_access":"1","url":"https://arxiv.org/abs/1911.04185"}],"oa_version":"Preprint","user_id":"4359f0d1-fa6c-11eb-b949-802e58b17ae8","publication_identifier":{"issn":["0036-1429"]},"month":"01"},{"status":"public","type":"journal_article","day":"09","main_file_link":[{"open_access":"1","url":"https://arxiv.org/abs/1912.11646"}],"oa_version":"Preprint","user_id":"4359f0d1-fa6c-11eb-b949-802e58b17ae8","publication_identifier":{"issn":["0036-1429"]},"month":"03","author":[{"orcid":"0000-0002-0479-558X","id":"2C12A0B0-F248-11E8-B48F-1D18A9856A87","last_name":"Fischer","first_name":"Julian L","full_name":"Fischer, Julian L"},{"last_name":"Gallistl","first_name":"Dietmar","full_name":"Gallistl, Dietmar"},{"full_name":"Peterseim, Dietmar","first_name":"Dietmar","last_name":"Peterseim"}],"arxiv":1,"publication":"SIAM Journal on Numerical Analysis","language":[{"iso":"eng"}],"intvolume":" 59","scopus_import":"1","isi":1,"title":"A priori error analysis of a numerical stochastic homogenization method","oa":1,"date_updated":"2023-08-08T13:13:37Z","article_processing_charge":"No","issue":"2","department":[{"_id":"JuFi"}],"page":"660-674","quality_controlled":"1","volume":59,"publisher":"Society for Industrial and Applied Mathematics","date_published":"2021-03-09T00:00:00Z","external_id":{"isi":["000646030400003"],"arxiv":["1912.11646"]},"abstract":[{"text":"This paper provides an a priori error analysis of a localized orthogonal decomposition method for the numerical stochastic homogenization of a model random diffusion problem. If the uniformly elliptic and bounded random coefficient field of the model problem is stationary and satisfies a quantitative decorrelation assumption in the form of the spectral gap inequality, then the expected $L^2$ error of the method can be estimated, up to logarithmic factors, by $H+(\\varepsilon/H)^{d/2}$, $\\varepsilon$ being the small correlation length of the random coefficient and $H$ the width of the coarse finite element mesh that determines the spatial resolution. The proof bridges recent results of numerical homogenization and quantitative stochastic homogenization.","lang":"eng"}],"publication_status":"published","doi":"10.1137/19M1308992","_id":"9352","article_type":"original","date_created":"2021-04-25T22:01:31Z","citation":{"apa":"Fischer, J. L., Gallistl, D., & Peterseim, D. (2021). A priori error analysis of a numerical stochastic homogenization method. SIAM Journal on Numerical Analysis. Society for Industrial and Applied Mathematics. https://doi.org/10.1137/19M1308992","ama":"Fischer JL, Gallistl D, Peterseim D. A priori error analysis of a numerical stochastic homogenization method. SIAM Journal on Numerical Analysis. 2021;59(2):660-674. doi:10.1137/19M1308992","ieee":"J. L. Fischer, D. Gallistl, and D. Peterseim, “A priori error analysis of a numerical stochastic homogenization method,” SIAM Journal on Numerical Analysis, vol. 59, no. 2. Society for Industrial and Applied Mathematics, pp. 660–674, 2021.","short":"J.L. Fischer, D. Gallistl, D. Peterseim, SIAM Journal on Numerical Analysis 59 (2021) 660–674.","ista":"Fischer JL, Gallistl D, Peterseim D. 2021. A priori error analysis of a numerical stochastic homogenization method. SIAM Journal on Numerical Analysis. 59(2), 660–674.","chicago":"Fischer, Julian L, Dietmar Gallistl, and Dietmar Peterseim. “A Priori Error Analysis of a Numerical Stochastic Homogenization Method.” SIAM Journal on Numerical Analysis. Society for Industrial and Applied Mathematics, 2021. https://doi.org/10.1137/19M1308992.","mla":"Fischer, Julian L., et al. “A Priori Error Analysis of a Numerical Stochastic Homogenization Method.” SIAM Journal on Numerical Analysis, vol. 59, no. 2, Society for Industrial and Applied Mathematics, 2021, pp. 660–74, doi:10.1137/19M1308992."},"acknowledgement":"This work was initiated while the authors enjoyed the kind hospitality of the Hausdorff Institute for Mathematics in Bonn during the trimester program Multiscale Problems: Algorithms, Numerical Analysis, and Computation. D. Peterseim would like to acknowledge the kind hospitality of the Erwin Schrödinger International Institute for Mathematics and Physics (ESI), where parts of this research were developed under the frame of the thematic program Numerical Analysis of Complex PDE Models in the Sciences.","year":"2021"}]