1. Introduction

Double-phase problems with nonlocal nonlinearities arise in numerous domains of mathematical physics, as they are capable of modeling systems characterized by heterogeneous properties and long-range interactions. These problems effectively describe materials with spatially varying stiffness, such as composites, porous media, or biological tissues—by combining distinct growth conditions within a unified framework. This dual-phase nature proves instrumental in analyzing complex phenomena such as anomalous diffusion, nonlinear elasticity, and phase transitions. Applications extend to electrorheological fluids [1], elasticity theory [2], and Lavrentiev’s phenomenon [3].

The incorporation of nonlocal terms enables the models to capture influences that extend beyond immediate neighborhoods, reflecting real-world behaviors more accurately. Such terms are particularly relevant in fields like electromagnetism, quantum mechanics, and population dynamics, where distant interactions play a significant role. Furthermore, double-phase models have found increasing application in image processing, particularly in image restoration [4,5,6] and super-resolution techniques [7]. Altogether, these models offer a robust approach to studying systems where both local and nonlocal effects significantly impact the dynamics.

The central result of this paper, which establishes the existence of multiple weak solutions, highlights the presence of various equilibrium states or configurations that a physical system can attain under different external influences, such as boundary forces, temperature variations, or external fields. This multiplicity suggests that the system can exhibit multiple stable or metastable states, a key aspect in understanding phase transitions, pattern formation, and bifurcation phenomena across different areas of physics. Consequently, the mathematical analysis of such problems plays a fundamental role in modeling, interpreting, and predicting the behavior of complex physical systems governed by nonuniform and nonlinear interactions.

In [8], Motivated by recent advances in the study of nonlinear double-phase elliptic problems, the authors considered the following parametric Dirichlet problem involving the $(p,q)$-Laplacian:

(1)$\left\{\begin{array}{cc}-\alpha {\Delta }_{p}w-\beta {\Delta }_{q}w=\lambda {\left|w\right|}^{q-2}w,\hfill & \mathrm{in}\Omega ,\hfill \\ w=0,\hfill & \mathrm{on}\partial \Omega ,\hfill \end{array}\right.$

Later, in [9], the authors obtained infinitely many distinct positive solutions for the following double-phase problem:

(2)$\left\{\begin{array}{cc}-div\left({|\nabla w|}^{p-2}\nabla w+a\left(x\right){|\nabla w|}^{q-2}\nabla w\right)=g(x,w),\hfill & \mathrm{in}\Omega ,\hfill \\ w=0,\hfill & \mathrm{on}\partial \Omega ,\hfill \end{array}\right.$

(3)${\displaystyle \frac{q}{p}}<1+{\displaystyle \frac{1}{N}},a:\Omega \to [0,+\infty )\mathrm{is}\mathrm{Lipschitz}\mathrm{continuous},$

$\underset{t\in \left[0,t_0\right]}{sup}g(·,t)\in L^{\infty }(\Omega ).$

In [10], the authors explore the existence of weak solutions for a double-phase Dirichlet problem of the following form:

$\left\{\begin{array}{c}-div\left({|\nabla w|}^{p-2}\nabla w+a\left(x\right){|\nabla w|}^{q-2}\nabla w\right)=\lambda \beta \left(x\right)g\left(w\right),\mathrm{in}\Omega ,\hfill \\ w=0,\mathrm{on}\partial \Omega ,\hfill \end{array}\right.$

$1<p<N,\mathrm{and}p<q<p^{\ast }:={\displaystyle \frac{Np}{N-p}}.$

${\Lambda }_{+}(\Omega ):=\left\{\alpha \in L^{\infty }(\Omega )\mid ess\underset{x\in \Omega }{inf}\alpha \left(x\right)>0\right\}.$

$\underset{t>0}{sup}G\left(t\right)>0,\mathrm{where}G\left(t\right):={\int }_0^{t}g\left(s\right)ds.$

This study establishes a critical threshold for $\lambda$ in relation to the existence of weak solutions. Specifically, when $0\le \lambda <{\lambda }^{\ast }$, only the trivial solution exists, with ${\lambda }^{\ast }$ explicitly defined in terms of the problem’s parameters. On the other hand, for $\lambda >{\lambda }_{\ast }$, at least two distinct non-negative weak solutions are found, satisfying an energy-related condition. The thresholds ${\lambda }^{\ast }$ and ${\lambda }_{\ast }$ are determined separately, leaving an open problem regarding the existence of solutions within the intermediate range $[{\lambda }^{\ast },{\lambda }_{\ast }]$. These results contribute to a deeper understanding of solution multiplicity in double-phase equations, offering explicit conditions that mark the transition from trivial to multiple solutions.

Furthermore, in [11], the authors studied a boundary value problem involving a double-phase operator with variable exponents and Dirichlet boundary conditions:

$\left\{\begin{array}{c}-div\left({|\nabla w|}^{p\left(x\right)-2}\nabla w+a\left(x\right){|\nabla w|}^{q\left(x\right)-2}\nabla w\right)=\lambda g(x,w)\mathrm{in}\Omega ,\hfill \\ w=0\mathrm{on}\partial \Omega .\hfill \end{array}\right.$

Here, $\Omega \subseteq {\mathbb{R}}^N$ is a bounded domain with a Lipschitz boundary $\partial \Omega$, where $N\ge 2$. The exponents $p,q\in C\left(\overline{\Omega }\right)$ satisfy the conditions

$1<p\left(x\right)<N,p\left(x\right)<q\left(x\right)<{\displaystyle \frac{Np\left(x\right)}{N-p\left(x\right)}}\mathrm{for}\mathrm{all}x\in \overline{\Omega }.$

Building on previous research, this study examines the multiplicity of weak solutions for a double-phase elliptic problem involving a nonlocal interaction:

$\left\{\begin{array}{c}-div\left({|\nabla w|}^{p-2}\nabla w+\mu \left(x\right){|\nabla w|}^{q-2}\nabla w\right)=\lambda f(x,w){\left({\int }_{\Omega }F(x,w)dx\right)}^{\gamma }\mathrm{in}\Omega ,\hfill \\ w=0\mathrm{on}\partial \Omega .\hfill \end{array}\right.$

Here, $\Omega \subset {\mathbb{R}}^N$ is a bounded domain with a Lipschitz boundary $\partial \Omega$, and $N\ge 2$. The parameter $\gamma$ is a positive constant, and $\mu \in L^{\infty }(\Omega )$ is a non-negative weight. The function $f(x,w)$ satisfies the Carathéodory condition and adheres to the following growth restrictions:

$\left({\mathbf{f}}_{\mathbf{1}}\right)m_1{\left|w\right|}^{\alpha -1}\le f(x,w)\le m_2{\left|w\right|}^{\beta -1},\mathrm{for}\mathrm{a}.\mathrm{e}.(x,w)\in \Omega \times \mathbb{R},$

$F(x,\tau )={\int }_0^{\tau }f(x,t)dt.$

The exponents p and q satisfy the following conditions:

$\left(\mathbf{H}\right)1\le \beta (\gamma +1)<p<N,\mathrm{and}p<q<p^{\ast }:={\displaystyle \frac{Np}{N-p}}.$

The double-phase operator

$-div\left({|\nabla w|}^{p-2}\nabla w+\mu \left(x\right){|\nabla w|}^{q-2}\nabla w\right),w\in W_0^{1,\mathcal{H}}(\Omega ),$

This paper establishes the existence of a single solution as well as the existence of three distinct solutions, without imposing additional constraints on the exponents p and q beyond the condition (1.2) imposed in [9]. The primary analytical tools employed are critical point theorems as developed in [15,16].

The structure of this paper is as follows: the next section introduces the variational framework and relevant preliminaries, while the final section presents the main results.

2. Variational Framework and Preliminaries

Let $\Omega$ be a bounded domain in ${\mathbb{R}}^N$ with $N\ge 2$ and a Lipschitz boundary $\partial \Omega$. For any $1\le r\le \infty$, we denote by $L^r(\Omega )$ the usual Lebesgue space, equipped with the norm ${\parallel ·\parallel }_r$. When $1\le r<\infty$, we consider the Sobolev spaces $W^{1,r}(\Omega )$ and $W_0^{1,r}(\Omega )$, endowed with the norms ${\parallel ·\parallel }_{1,r}$ and ${\parallel ·\parallel }_{1,r,0}={\parallel \nabla ·\parallel }_r$, respectively.

Define the function $\mathcal{H}:\Omega \times [0,+\infty )\to \mathbb{R}$ by

$\mathcal{H}(x,t)=t^p+\mu \left(x\right)t^q,$

${\rho }_{\mathcal{H}}\left(w\right)={\int }_{\Omega }\mathcal{H}(x,|w\left|\right)\mathrm{d}x={\int }_{\Omega }\left({\left|w\right|}^p+\mu \left(x\right){\left|w\right|}^q\right)\mathrm{d}x.$

$L^{\mathcal{H}}(\Omega )=\left\{w:\Omega \to \mathbb{R}\mathrm{measurable}\mid {\rho }_{\mathcal{H}}\left(w\right)<+\infty \right\},$

${\parallel w\parallel }_{\mathcal{H}}:=inf\left\{\tau >0\mid {\rho }_{\mathcal{H}}\left({\displaystyle \frac{w}{\tau }}\right)\le 1\right\}.$

The fundamental properties of Musielak–Orlicz spaces play a crucial role in the analysis of functionals with nonstandard growth conditions. For a comprehensive exposition of these properties, we refer the reader to the work of Diening et al. [17].

The Musielak–Orlicz–Sobolev space $W^{1,\mathcal{H}}(\Omega )$ is defined as

$W^{1,\mathcal{H}}(\Omega ):=\left\{w\in L^{\mathcal{H}}(\Omega ):|\nabla w|\in L^{\mathcal{H}}(\Omega )\right\},$

${\parallel w\parallel }_{1,\mathcal{H}}:={\parallel \nabla w\parallel }_{\mathcal{H}}+{\parallel w\parallel }_{\mathcal{H}},$

It can be shown that both the Musielak–Orlicz and Musielak–Orlicz–Sobolev spaces are uniformly convex (and therefore reflexive) Banach spaces; see Crespo-Blanco et al. [18].

Furthermore, the following embedding results hold.

Furthermore, a Poincaré-type inequality holds, which allows us to consider in $W_0^{1,\mathcal{H}}(\Omega )$ the equivalent norm

$\parallel w\parallel :={\parallel \nabla w\parallel }_{\mathcal{H}}.$

(4)${\parallel w\parallel }_s\le c_s\parallel w\parallel \forall w\in W_0^{1,\mathcal{H}}(\Omega )$

The differential operator in $\left(P_{\lambda }\right)$ is the so-called double-phase operator:

$-div\left({|\nabla w|}^{p-2}\nabla w+\mu \left(x\right){|\nabla w|}^{q-2}\nabla w\right),w\in W_0^{1,\mathcal{H}}(\Omega ).$

Let us define the functional ${\mathcal{I}}_{\lambda }:W_0^{1,\mathcal{H}}(\Omega )\to \mathbb{R}$ as

${\mathcal{I}}_{\lambda }\left(w\right):=\mathcal{L}\left(w\right)-\lambda \mathcal{M}\left(w\right),$

(6)$\begin{array}{c}\hfill \mathcal{L}\left(w\right):={\int }_{\Omega }\left({\displaystyle \frac{{|\nabla w|}^p}{p}}+\mu \left(x\right){\displaystyle \frac{{|\nabla w|}^q}{q}}\right)\mathrm{d}x,\end{array}$

(7)$\begin{array}{c}\hfill \mathcal{M}\left(w\right):={\displaystyle \frac{1}{\gamma +1}}{\left({\int }_{\Omega }F(x,w)dx\right)}^{\gamma +1}.\end{array}$

$⟨{\mathcal{L}}^{\prime }\left(w\right),\phi ⟩={\int }_{\Omega }\left({|\nabla w|}^{p-2}\nabla w·\nabla \phi +\mu \left(x\right){|\nabla w|}^{q-2}\nabla w·\nabla \phi \right)dx,$

${\displaystyle ⟨{\mathcal{M}}^{\prime }\left(w\right),\phi ⟩={\left({\int }_{\Omega }F(x,w)dx\right)}^{\gamma }{\int }_{\Omega }f(x,w)\phi dx.}$

The forthcoming definition and critical point theorems serve as fundamental tools in establishing our main results. To formulate our existence theorem, we first introduce the necessary preliminary definitions and key theorems.

Our main existence result is due to the following Theorem.

3. Main Results

In this section, a theorem about the existence of at least three weak solutions to the problem $\left(P_{\lambda }\right)$ is obtained. First, we mention that, for a large enough $\parallel w\parallel$, and due to condition $\left(\mathbf{H}\right)$ and $\left(4\right)$ in Proposition 1, one has

(10)$\begin{array}{cc}\hfill \mathcal{L}\left(w\right):& ={\int }_{\Omega }\left({\displaystyle \frac{{|\nabla w|}^p}{p}}+\mu \left(x\right){\displaystyle \frac{{|\nabla w|}^q}{q}}\right)\mathrm{d}x\hfill \\ \hfill & \ge {\displaystyle \frac{1}{q}}{\rho }_{\mathcal{H}}(\nabla w)\hfill \\ \hfill & \ge {\displaystyle \frac{1}{q}}{\parallel w\parallel }^p;\hfill \end{array}$

We are now ready to present our main result. To this end, we define

$\tilde{\mathfrak{D}}\left(x\right):=sup\left\{\tilde{\mathfrak{D}}>0\mid B(x,\tilde{\mathfrak{D}})\subseteq \Omega \right\}$

$R=\underset{x\in \Omega }{sup}\tilde{\mathfrak{D}}\left(x\right).$

$\tilde{m}={\displaystyle \frac{{\pi }^{\frac{N}{2}}}{\frac{N}{2}\Gamma \left(\frac{N}{2}\right)}},$

4. Conclusions

The study presented in this document explores the existence and multiplicity of weak solutions for a double-phase elliptic problem with nonlocal interactions, demonstrating that under specific conditions, at least one weak solution exists, and up to three distinct solutions may arise. This multiplicity highlights the complex behavior of physical systems influenced by nonlocal interactions, which can lead to various stable configurations. A promising future direction for this research is to extend the analysis to nonstandard growth conditions. This modification allows for a more nuanced understanding of materials with spatially varying properties. The problem can then be formulated as

$\left\{\begin{array}{cc}-\mathrm{div}\left({|\nabla w|}^{p\left(x\right)}\nabla w+a\left(x\right){|\nabla w|}^{q\left(x\right)}\nabla w\right)=\lambda f(x,w){\left({\int }_{\Omega }F(x,w)dx\right)}^{\gamma },\hfill & \mathrm{in}\Omega ,\hfill \\ w=0,\hfill & \mathrm{on}\partial \Omega .\hfill \end{array}\right.$

This formulation will enable a comprehensive exploration of the implications of variable growth on the solution’s existence and multiplicity, further enriching the understanding of phase transitions and pattern formation in materials characterized by heterogeneous properties.

Footnotes

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