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Autores principales: Ahmed, Aberqi, Ouaziz, Abdesslam, Ragusa, Maria Alessandra
Formato: Preprint
Publicado: 2025
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Acceso en línea:https://arxiv.org/abs/2512.01792
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author Ahmed, Aberqi
Ouaziz, Abdesslam
Ragusa, Maria Alessandra
author_facet Ahmed, Aberqi
Ouaziz, Abdesslam
Ragusa, Maria Alessandra
contents In this paper, we investigate solutions for a fractional system involving a novel class of Kirchhoff functions and logarithmic nonlinearity: \begin{equation*} \left\{\begin{array}{lll} \displaystyle \mathfrak{u}_{t}+\mathcal{K}\left([\mathfrak{u}]_p^s\right) \mathscr{L}_p^s u=\vert \mathfrak{v} \vert^{σ}\vert \mathfrak{u} \vert^{σ-2} u \log | \mathfrak{u} \mathfrak{v}|, \, \, & \mbox{in}\quad &\mathcal{U} \times[0, T),\\ \mathfrak{v}_t+\mathcal{K}\left([\mathfrak{v}]_q^s\right) \mathscr{L}_q^s \mathfrak{v}=\vert \mathfrak{u} \vert^{σ}|\mathfrak{v}|^{σ-2} \mathfrak{v} \log | \mathfrak{u} \mathfrak{v}|, & \text { in } & \mathcal{U} \times[0, T), \\ \mathfrak{u}(\mathrm{x}, t)=\mathfrak{v}(\mathrm{x}, t)=0, & \text { in } & \partial \mathcal{U} \times[0, T), \\ \mathfrak{u}(\mathrm{x}, 0)=\mathfrak{u}_0(\mathrm{x}), \mathfrak{v}(\mathrm{x}, 0)=\mathfrak{v}_0(\mathrm{x}), & \text { in } & \mathcal{U}, \end{array}% \right. \end{equation*} where $\mathcal{K}$ is Kirchhoff function, and $\mathscr{L}_{p}^{s}$ is the fractional $p-$ Laplacian operator. We prove the existence of a weak solution using the Faedo-Galerkin method under suitable assumptions on the Kirchhoff function. We investigate the finite-time blow-up and global existence of solutions based on critical, subcritical, and supercritical initial energy levels. Subsequently, we establish the stabilization of the solution with positive initial energy by applying Komornik's integral inequality.
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institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Global and local existence of solutions for a novel type of parabolic Kirchhoff system with singular term
Ahmed, Aberqi
Ouaziz, Abdesslam
Ragusa, Maria Alessandra
Analysis of PDEs
Primary 58J10, Secondary 58J20, 35J66
In this paper, we investigate solutions for a fractional system involving a novel class of Kirchhoff functions and logarithmic nonlinearity: \begin{equation*} \left\{\begin{array}{lll} \displaystyle \mathfrak{u}_{t}+\mathcal{K}\left([\mathfrak{u}]_p^s\right) \mathscr{L}_p^s u=\vert \mathfrak{v} \vert^{σ}\vert \mathfrak{u} \vert^{σ-2} u \log | \mathfrak{u} \mathfrak{v}|, \, \, & \mbox{in}\quad &\mathcal{U} \times[0, T),\\ \mathfrak{v}_t+\mathcal{K}\left([\mathfrak{v}]_q^s\right) \mathscr{L}_q^s \mathfrak{v}=\vert \mathfrak{u} \vert^{σ}|\mathfrak{v}|^{σ-2} \mathfrak{v} \log | \mathfrak{u} \mathfrak{v}|, & \text { in } & \mathcal{U} \times[0, T), \\ \mathfrak{u}(\mathrm{x}, t)=\mathfrak{v}(\mathrm{x}, t)=0, & \text { in } & \partial \mathcal{U} \times[0, T), \\ \mathfrak{u}(\mathrm{x}, 0)=\mathfrak{u}_0(\mathrm{x}), \mathfrak{v}(\mathrm{x}, 0)=\mathfrak{v}_0(\mathrm{x}), & \text { in } & \mathcal{U}, \end{array}% \right. \end{equation*} where $\mathcal{K}$ is Kirchhoff function, and $\mathscr{L}_{p}^{s}$ is the fractional $p-$ Laplacian operator. We prove the existence of a weak solution using the Faedo-Galerkin method under suitable assumptions on the Kirchhoff function. We investigate the finite-time blow-up and global existence of solutions based on critical, subcritical, and supercritical initial energy levels. Subsequently, we establish the stabilization of the solution with positive initial energy by applying Komornik's integral inequality.
title Global and local existence of solutions for a novel type of parabolic Kirchhoff system with singular term
topic Analysis of PDEs
Primary 58J10, Secondary 58J20, 35J66
url https://arxiv.org/abs/2512.01792