A topological structure of solution sets to evolution systems

Rok, strany: 2005, 529 - 554

In this paper we deal with the Peano phenomenon for general initial-boundary value problems of quasilinear evolution systems with arbitrary even order space derivatives. The nonlinearity is a continuous or continuously Fréchet differentiable function. Qualitative and quantitative structure of solution sets is studied by the theory of proper, Fredholm and Nemitski\vi operators. These results can be applied to the different technical and natural science models.

ISO 690:

Ďurikovič, V., Ďurikovičová, M. 2005. A topological structure of solution sets to evolution systems. In Mathematica Slovaca, vol. 55, no.5, pp. 529-554. 0139-9918.

APA:

Ďurikovič, V., Ďurikovičová, M. (2005). A topological structure of solution sets to evolution systems. Mathematica Slovaca, 55(5), 529-554. 0139-9918.