Sfoglia per Autore
Bose fluids and positive solutions to weakly coupled systems with critical growth in dimension two
2020-01-01 Cassani, D.; Tavares, H.; Zhang, J.
A Unified Approach to Singularly Perturbed Quasilinear Schrödinger Equations
2020-01-01 Cassani, D.; Wang, Y.; Zhang, J.
Uniqueness results for higher order Lane-Emden systems
2020-01-01 Cassani, D.; Schiera, D.
Concentration phenomena at saddle points of potential for Schrödinger-Poisson systems
2021-01-01 Cassani, Daniele; Vilasi, Luca; Zhang, Jianjun
Local versus nonlocal elliptic equations: short-long range field interactions
2021-01-01 Cassani, D.; Vilasi, L.; Wang, Y.
Blow-up phenomena and asymptotic profiles passing from h1-critical to super-critical quasilinear Schrödinger equations
2021-01-01 Cassani, D.; Wang, Y.
Schrödinger–Newton equations in dimension two via a Pohozaev–Trudinger log-weighted inequality
2021-01-01 Cassani, D.; Tarsi, C.
Maximum principle for higher order operators in general domains
2021-01-01 Cassani, Daniele; Tarsia, Antonio
Quasilinear logarithmic choquard equations with exponential growth in RN
2022-01-01 Bucur, C.; Cassani, D.; Tarsi, C.
Fine bounds for best constants of fractional subcritical Sobolev embeddings and applications to nonlocal PDEs
2023-01-01 Cassani, D.; Du, L.
Asymptotic Behavior of Ground States and Local Uniqueness for Fractional Schrodinger Equations with Nearly Critical Growth
2023-01-01 Cassani, D; Wang, Yj
Positive solutions to the planar logarithmic Choquard equation with exponential nonlinearity
2024-01-01 Cassani, D.; Du, L.; Liu, Z.
Nonlocal planar Schrödinger-Poisson systems in the fractional Sobolev limiting case
2024-01-01 Cassani, D; Liu, Zs; Romani, G
Global vs Blow-Up Solutions and Optimal Threshold for Hyperbolic ODEs with Possibly Singular Nonlinearities
2024-01-01 Cassani, D.; Miyasita, T.
Legenda icone
- file ad accesso aperto
- file disponibili sulla rete interna
- file disponibili agli utenti autorizzati
- file disponibili solo agli amministratori
- file sotto embargo
- nessun file disponibile