TY  - JOUR 
AU  - Longo, Iacopo Paolo
AU  - Novo, Sylvia
AU  - Obaya, Rafael
PY  - 2019
SN  - 1553-5231
UR  - http://uvadoc.uva.es/handle/10324/40204
AB  - We study some already introduced and some new strong and weak topologies of integral type to provide continuous dependence on continuous initial data for the solutions of non-autonomous Carathéodory delay differential equations. As a consequence, we...
LA  - eng
PB  - American Institute of Mathematical Sciences
KW  - Carathéodory functions, non-autonomous Carathéodory differential equations, continuous dependence on initial data, linearized skew-product semiflow.
TI  - Topologies of continuity for Carathéodory delay differential equations with applications in non-autonomous dynamics
DO  - 10.3934/dcds.2019224
ER  -