What question did this study set out to answer?

The aim is to investigate Fujita-type results for a coupled parabolic system involving multiple Hénon-type components.

May 21, 2026Open Access

Fujita-Type Results for a Coupled Parabolic System of Hénon-Type Equations on Homogeneous Carnot Groups

Key Points

The aim is to investigate Fujita-type results for a coupled parabolic system involving multiple Hénon-type components.
Considered a coupled parabolic system defined on a homogeneous Carnot group.
Analyzed the behavior of the system using the sub-Laplacian operator and specific functions H.
Studied the time and spatial evolution of the unknowns represented in the system.
Demonstrated existence of solutions within specified time intervals and structures.
Established asymptotic behaviors for solutions across varying conditions.
Provided insights into the nature and characteristics of Hénon-type equations in the framework.

Abstract

Abstract In this paper, we consider a coupled parabolic system with multiple Henón-type components (ₜ u - ₆ u) (x, t) = H (x, t, u) ∂ t u - Δ G u (x, t) = H (x, t, u) for (x, t) G (0, T) (x, t) ∈ G × (0, T), where u= (u₁, , uₘ) u = (u 1, ⋯, u m) is the unknown, G G is a homogeneous Carnot group on RN R N, ₆ Δ G is the operator whose components are given by the sub-Laplacian on G G, and aligned H (x, t, u) = (t^s₁ \ |x| ₆^ ₁ \ u₂^p₁, t^s₂ \ |x| ₆^ ₂ \ u₃^p₂, , t^s₌ \ |x| ₆^ ₌ \ u₁^p₌), aligned H (x, t, u) = t s 1 | x | G γ 1 u 2 p 1, t s 2

Bookmark

View Full Paper

Cite This Study

Freire et al. (Tue,) studied this question.

synapsesocial.com/papers/6a0ea13abe05d6e3efb5fbd2 https://doi.org/https://doi.org/10.1007/s12220-026-02475-0

Bookmark

View Full Paper