"RIV/00216305:26220/09:PU83091!RIV10-GA0-26220___" . "1"^^ . . . "eigenvalues, eigenvectors, invariant manifolds, dynamical systems"@en . "This paper briefly describes the process of finding the strategic orbit for a given dynamical system with jump-type nonlinearity in order to mathematically prove the existence of chaotic solution in the sense of Shilnikov theorems. For this purpose the standard optimization procedure is utilized. It is shown via numerical integration that both homoclinic and heteroclinic orbits exist."@en . . "This paper briefly describes the process of finding the strategic orbit for a given dynamical system with jump-type nonlinearity in order to mathematically prove the existence of chaotic solution in the sense of Shilnikov theorems. For this purpose the standard optimization procedure is utilized. It is shown via numerical integration that both homoclinic and heteroclinic orbits exist." . "4" . "331597" . . . "[23568F42466C]" . . "26220" . "Petr\u017Eela, Ji\u0159\u00ED" . "P(GP102/09/P217)" . "1"^^ . "RIV/00216305:26220/09:PU83091" . "4" . . "On the strategic orbits in third-order oscillator with jump nonlinearity"@en . . . "11"^^ . . "1312-8868" . "On the strategic orbits in third-order oscillator with jump nonlinearity" . "International Journal of Algebra" . . . . "BG - Bulharsk\u00E1 republika" . "On the strategic orbits in third-order oscillator with jump nonlinearity"@en . "On the strategic orbits in third-order oscillator with jump nonlinearity" . . . .