Multidimensional localized states in externally driven Kerr cavities with parabolic spatiotemporal potential: A dimensional connection
Anno: 2024
Autori: Sun YF., Parra-Rivas P., Mangini F., Wabnitz S.
Affiliazione autori: Sapienza Univ Roma, DIET, Via Eudossiana 18, I-00184 Rome, Italy; Ist Nazl Ottica, CNR INO, Via Campi Flegrei 34, I-80078 Pozzuoli, Italy.
Abstract: In this work, we study the bifurcation structures and the stability of multidimensional localized states within coherently driven Kerr optical cavities with parabolic potentials in 1D, 2D, and 3D systems. Based on symmetric considerations, we transform higher -dimensional models into a single 1D model with a dimension parameter. This transformation not only yields a substantial reduction in computational complexity, but also enables an efficient examination of how dimensionality impacts the system dynamics. In the absence of nonlinearity, we analyze the eigenstates of the linear systems. This allows us to uncover a heightened concentration of the eigenmodes at the center of the potential well, while witnessing a consistent equal spacing among their eigenvalues, as the dimension parameter increases. In the presence of nonlinearity, our findings distinctly reveal that the stability of the localized states diminishes with increasing dimensionality. This study offers an approach to tackling high -dimensional problems, shedding light on the fundamental dimensional connections among radially symmetric states across different dimensions, and providing valuable tools for analysis.
Giornale/Rivista: CHAOS SOLITONS & FRACTALS
Volume: 183 Da Pagina: 114870-1 A: 114870-7
Parole chiavi: Solitons; Kerr cavity; Bifurcation diagram; Phase diagram; Parabolic potential; Multidimensional solitonsDOI: 10.1016/j.chaos.2024.114870Citazioni: 3dati da “WEB OF SCIENCE” (of Thomson Reuters) aggiornati al: 2025-05-18Riferimenti tratti da Isi Web of Knowledge: (solo abbonati) Link per visualizzare la scheda su IsiWeb: Clicca quiLink per visualizzare la citazioni su IsiWeb: Clicca qui
