[1] |
L. Boccardo, A “nonlinear duality” approach to \(W^{1, 1}_0\) solutions in elliptic systems related to the Keller-Segel model, Mathematics in Engineering, 5 (2023), 1-11. http://doi.org/10.3934/mine.2023085 · Zbl 1539.35062 · doi:10.3934/mine.2023085 |
[2] |
B. Brandolini, F. C. Cîrstea, Anisotropic elliptic equations with gradient-dependent lower order terms and \(L^1\) data, Mathematics in Engineering, 5 (2023), 1-33. http://doi.org/10.3934/mine.2023073 · Zbl 1539.35088 · doi:10.3934/mine.2023073 |
[3] |
D. De Silva, O. Savin, Uniform density estimates and \(\Gamma \)-convergence for the Alt-Phillilps functional of negative powers, Mathematics in Engineering, 5 (2023), 1-27. http://doi.org/10.3934/mine.2023086 · Zbl 1536.35385 · doi:10.3934/mine.2023086 |
[4] |
B. Deng, X. Ma, Gradient estimates for the solutions of higher order curvature equations with prescribed contact angle, Mathematics in Engineering, 5 (2023), 1-13. http://doi.org/10.3934/mine.2023093 · Zbl 07889290 · doi:10.3934/mine.2023093 |
[5] |
S. Dipierro, G. Giacomin, E. Valdinoci, The fractional Malmheden theorem, Mathematics in Engineering, 5 (2023), 1-28. http://doi.org/10.3934/mine.2023024 · Zbl 07817659 · doi:10.3934/mine.2023024 |
[6] |
Y. Du, W. Ni, The Fisher-KPP nonlocal diffusion equation with free boundary and radial symmetry in \(\mathbb{R}^3\), Mathematics in Engineering, 5 (2023), 1-26. http://doi.org/10.3934/mine.2023041 · Zbl 1535.35218 · doi:10.3934/mine.2023041 |
[7] |
Y. Giga, H. Kuroda, M. Łasica, The fourth-order total variation flow in \(\mathbb{R}^n\), Mathematics in Engineering, 5 (2023), 1-45. http://doi.org/10.3934/mine.2023091 · Zbl 07889288 · doi:10.3934/mine.2023091 |
[8] |
P. Guan, A weighted gradient estimate for solutions of \(L^p\) Christoffel-Minkowski problem, Mathematics in Engineering, 5 (2023), 1-14. http://doi.org/10.3934/mine.2023067 · Zbl 1539.35072 · doi:10.3934/mine.2023067 |
[9] |
Q. Guang, Q.-R. Li, X.-J. Wang, Flow by Gauss curvature to the \(L_p\) dual Minkowski problem, Mathematics in Engineering, 5 (2023), 1-19. http://doi.org/10.3934/mine.2023049 · Zbl 1540.53113 · doi:10.3934/mine.2023049 |
[10] |
H. Ishii, The vanishing discount problem for monotone systems of Hamilton-Jacobi equations: a counterexample to the full convergence, Mathematics in Engineering, 5 (2023), 1-10. http://doi.org/10.3934/mine.2023072 · Zbl 1536.35142 · doi:10.3934/mine.2023072 |
[11] |
F. Jiang, Weak solutions of generated Jacobian equations, Mathematics in Engineering, 5 (2023), 1-20. http://doi.org/10.3934/mine.2023064 · Zbl 1536.35135 · doi:10.3934/mine.2023064 |
[12] |
N. Krylov, On parabolic Adams’s, the Chiarenza-Frasca theorems, and some other results related to parabolic Morrey spaces, Mathematics in Engineering, 5 (2023), 1-20. http://doi.org/10.3934/mine.2023038 · Zbl 1542.35215 · doi:10.3934/mine.2023038 |
[13] |
Y. Li, G. Tian, X. Zhu, Singular Kähler-Einstein metrics on \(\mathbb{Q} \)-Fano compactifications of Lie groups, Mathematics in Engineering, 5 (2023), 1-43. http://doi.org/10.3934/mine.2023028 · Zbl 07817663 · doi:10.3934/mine.2023028 |
[14] |
Y. Y. Li, Symmetry of hypersurfaces and the Hopf Lemma, Mathematics in Engineering, 5 (2023), 1-9. http://doi.org/10.3934/mine.2023084 · Zbl 1535.53066 · doi:10.3934/mine.2023084 |
[15] |
C. Mooney, A. Rakshit, Singular structures in solutions to the Monge-Ampère equation with point masses, Mathematics in Engineering, 5 (2023), 1-11. http://doi.org/10.3934/mine.2023083 · Zbl 1539.35127 · doi:10.3934/mine.2023083 |
[16] |
W. Sheng, S. Xia, Interior curvature bounds for a type of mixed Hessian quotient equations, Mathematics in Engineering, 5 (2023), 1-27. http://doi.org/10.3934/mine.2023040 · Zbl 07817675 · doi:10.3934/mine.2023040 |
[17] |
Y. Yuan, A monotonicity approach to Pogorelov’s Hessian estimates for Monge-Ampère equation, Mathematics in Engineering, 5 (2023), 1-6. http://doi.org/10.3934/mine.2023037 · Zbl 1539.35128 · doi:10.3934/mine.2023037 |