Forskjeller
Her vises forskjeller mellom den valgte versjonen og den nåværende versjonen av dokumentet.
Begge sider forrige revisjon Forrige revisjon | Neste revisjon Begge sider neste revisjon | ||
wanp:publications [2019-01-10] erj |
wanp:publications [2019-01-14] jorgeen [Publications in 2018] |
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Linje 39: | Linje 39: | ||
* M. Ehrnström and L Pei, Classical well-posedness in dispersive equations with nonlinearities of mild regularity, and a composition theorem in Besov spaces. //J. Evol. Equ.// [[https:// | * M. Ehrnström and L Pei, Classical well-posedness in dispersive equations with nonlinearities of mild regularity, and a composition theorem in Besov spaces. //J. Evol. Equ.// [[https:// | ||
* F. del Teso, J. Endal, and E. R. Jakobsen. On the well-posedness of solutions with finite energy for nonlocal equations of porous medium type. //EMS Series of Congress Reports: Non-Linear Partial Differential Equations, Mathematical Physics, and Stochastic Analysis. The Helge Holden Anniversary Volume// (2018). [[http:// | * F. del Teso, J. Endal, and E. R. Jakobsen. On the well-posedness of solutions with finite energy for nonlocal equations of porous medium type. //EMS Series of Congress Reports: Non-Linear Partial Differential Equations, Mathematical Physics, and Stochastic Analysis. The Helge Holden Anniversary Volume// (2018). [[http:// | ||
- | * F. del Teso, J. Endal, and E. R. Jakobsen. Robust numerical methods for nonlocal (and local) equations of porous medium type. Part II: Schemes and experiments. | + | * F. del Teso, J. Endal, and E. R. Jakobsen. Robust numerical methods for nonlocal (and local) equations of porous medium type. Part II: Schemes and experiments. // |
* P. Lindqvist, D. Ricciotti. Regularity for an anisotropic equation in the plane.// | * P. Lindqvist, D. Ricciotti. Regularity for an anisotropic equation in the plane.// | ||
* H. Holden and N. H. Risebro. Follow-the-Leader models can be viewed as a numerical approximation to the Lighthill–Whitham–Richards model for traffic flow. //Networks and Heterogeneous Media | * H. Holden and N. H. Risebro. Follow-the-Leader models can be viewed as a numerical approximation to the Lighthill–Whitham–Richards model for traffic flow. //Networks and Heterogeneous Media |