Your search keyword '"Besov spaces"' showing total 2 results

1. On the Cauchy problem for a combined mCH-Novikov integrable equation with linear dispersion.

Author

Wan, Zhenyu, Wang, Ying, and Zhu, Min

Subjects

*CONSERVED quantity, *BESOV spaces, *CAUCHY problem, *LINEAR equations, *GENERALIZED spaces

Abstract

This paper aims to understand a blow-up mechanism on a family of shallow-water models with linear dispersion, which are linked with the modified Camassa-Holm equation and the Novikov equation. We first demonstrate the local well-posedness of the model equation in Besov spaces. Our blow-up analysis begins with two cases where the first case is 2 k 1 + 3 k 2 ≠ 0 and then we deduce the results on the curvature blow-up in finite time. To overcome the lack of conservation in the functional due to weak linear dispersion, we can determine a suitable alternative via a slight modification to conserved quantity H 2 [ u ] (see Lemma 4.1). Furthermore, we explore the formation of singularities in another case when nonlocal terms are absent. Lastly, we investigate the Gevrey regularity and analyticity of solutions for Cauchy problem within a specified range of Gevrey-Sobolev spaces by employing the generalized Ovsyannikov theorem and study the continuity of the data-to-solution mapping. [ABSTRACT FROM AUTHOR]

Published

2025

2. Characterization of solutions in Besov spaces for fractional Rayleigh–Stokes equations.

Author

Peng, Li and Zhou, Yong

Subjects

*BESOV spaces, *NON-Newtonian fluids, *LINEAR equations, *EQUATIONS, *FLUIDS

Abstract

This paper considers fractional Rayleigh–Stokes equations with a power-type nonlinearity. The linear equation can be simulated a non-Newtonian fluid for a generalized second grade fluid and display a nonlocal behavior in time. Because the coexistence of fractional and classical derivatives leads to the lack of semigroup structure of the solution operator, we need to develop a suitable tool to establish some L p − L q estimates in the framework of L p spaces and Besov spaces, respectively. Further, global existence of solutions is showed in spaces of Besov type. • The fractional Rayleigh–Stokes equations with a power-type nonlinearity is investigated. • The linear equation can be simulated a non-Newtonian fluid for a generalized second grade fluid and display a nonlocal behavior in time. • The global existence of solutions is proved in spaces of Besov type. [ABSTRACT FROM AUTHOR]

Published

2025