Let $1<q<p<\infty$ and assume that

(6) $g^{-{\displaystyle \frac{q}{p-q}}}{h}^{{\displaystyle \frac{p}{p-q}}}\in L^1(\Omega ).$

Under Assumptions (H) and (H1), the set of solutions to Problem (1) is bounded in $W_0^{1,p}(g,\Omega )$.

Acting on (11) with the test function $v=u\in W_0^{1,p}(g,\Omega )$ results in

${\parallel u\parallel }^p\le {\int }_{\Omega }f(x,u)udx.$

${\parallel u\parallel }^p\le d_1{\lambda }_1^{-1}{\parallel u\parallel }^p+{\parallel \varrho \parallel }_{L^1(\Omega )}.$

Let X be a real Banach space and let Φ, $\Psi :X\to \mathbb{R}$ be two continuously Gateaux differentiable functionals with Φ bounded below. Assume that $\Phi \left(0\right)=\Psi \left(0\right)=0$. Assume that there are $r\in \mathbb{R}$ and $\tilde{u}\in X$, with $\Phi \left(\tilde{u}\right)>r$, such that

(12)${\displaystyle \frac{{\displaystyle \underset{u\in {\Phi }^{-1}\left(\left]-\infty ,r\right]\right)}{sup}\Psi \left(u\right)}}{r}}<{\displaystyle \frac{\Psi \left(\tilde{u}\right)}{\Phi \left(\tilde{u}\right)}},$

$\lambda \in \Lambda =\left]{\displaystyle \frac{\Phi \left(\tilde{u}\right)}{\Psi \left(\tilde{u}\right)}},{\displaystyle \frac{r}{{\displaystyle \underset{u\in {\Phi }^{-1}\left(\left]-\infty ,r\right]\right)}{sup}\Psi \left(u\right)}}}\right[,$

Then, for each $\lambda \in \Lambda$, the functional $\Phi -\lambda \Psi$ admits at least three critical points.

The functional Φ is sequentially weakly lower semicontinuous since Φ is continuous and convex on $W_0^{1,p}(g,\Omega )$ (see [21,25]).

Assume that Hypothesis (H) holds, $\left\{u_n\right\}\subset W_0^{1,p}(g,\Omega )$ and $u\in W_0^{1,p}(g,\Omega )$ with $u_n\rightharpoonup u$. Then,

$\underset{n\to +\infty }{lim}⟨{\Psi }^{\prime }\left(u_n\right),u_n-u⟩=0.$

Hypothesis $\left(H\right)$ enables us to assert that $u_n\to u$ in $L^{\gamma }(\Omega )$ and in $L^1(\Omega )$. Therefore,

$|⟨{\Psi }^{\prime }\left(u_n\right),u_n-u⟩|=|{\int }_{\Omega }f(x,u_n)(u_n-u)dx|\le a_1\parallel u_n{-u\parallel }_{L^1(\Omega )}+a_2\parallel u_n{\parallel }_{L^{\gamma }(\Omega )}^{\gamma -1}{\parallel u_n-u\parallel }_{L^{\gamma }(\Omega )}\to 0,$

Assume that Hypothesis (H) holds. The functional $\Psi :W_0^{1,p}(g,\Omega )\to \mathbb{R}$ is sequentially weakly continuous in $W_0^{1,p}(g,\Omega )$.

The operator ${\Psi }^{\prime }$ is the composition of the continuous and bounded mapping $u\to f(x,u)$, which takes a value in $L^{p_s^{\prime }}(\Omega )$ and the linear embedding $L^{p_s^{\prime }}(\Omega )\to {\left(W_0^{1,p}(a,\Omega )\right)}^{*}$, which is compact, as it is the adjoint of the compact embedding $W_0^{1,p}(g,\Omega )\to L^{p_s}(\Omega )$. Therefore, ${\Psi }^{\prime }$ is a compact operator.

Taking into account Corollary 41.9 of [26], since $W_0^{1,p}(g,\Omega )$ is reflexive, $\Psi$ is sequentially weakly continuous. □

Assume (2), (6), Hypotheses (H) and (H1), and that there exist two positive constants c and d, with $c<M_1^{{\displaystyle \frac{1}{p}}}d$, such that(i) 

$F(x,t)\ge 0,$ for all a.e. $x\in B\left(x_0,R\right)$ and for every $t\in [0,d]$.

Then, for each

$\lambda \in \tilde{\Lambda }=\left]{\displaystyle \frac{{|\Omega |}^{\frac{p}{p_s^{*}}}{M}_2}{q{c}_{p_s^{*}}^p{\parallel a^{-s}\parallel }_{L^1(\Omega )}^{\frac{1}{s}}}}{\displaystyle \frac{d^p+d^q}{{\displaystyle {\int }_{B\left(x_0,\frac{R}{2}\right)}F\left(x,d\right)dx}}},{\displaystyle \frac{1}{p{c}_{p_s^{*}}^p\parallel a^{-s}{\parallel }_{L^1(\Omega )}^{\frac{1}{s}}{|\Omega |}^{\frac{p_s^{*}-p}{p_s^{*}}}\left(a_1{c}^{1-p}+{\displaystyle \frac{a_2}{\gamma }}{c}^{\gamma -p}\right)}}\right[,$

Consider the energy functional I given by (8) and $\Phi$, $\Psi$ as in (13). Taking into account Remark 1 and Proposition 3, the energy functional I is sequentially weakly lower semicontinuous.

Consider $\tilde{u}\in W_0^{1,p}(g,\Omega )$ defined by

$\tilde{u}\left(x\right)=\left\{\begin{array}{cc}0\hfill & \mathrm{if}x\in \Omega \setminus B(x_0,R),\hfill \\ {\displaystyle \frac{2d}{R}}\left(R-|x-x_0|\right)\hfill & \mathrm{if}x\in \mathcal{B},\hfill \\ d\hfill & \mathrm{if}x\in B\left(x_0,{\displaystyle \frac{R}{2}}\right).\hfill \end{array}\right.$

(14)$\Phi \left(\tilde{u}\right)={\displaystyle \frac{1}{p}}{\left({\displaystyle \frac{2d}{R}}\right)}^p{\parallel g\parallel }_{L^1\left(\mathcal{B}\right)}+{\displaystyle \frac{1}{q}}{\left({\displaystyle \frac{2d}{R}}\right)}^q{\parallel h\parallel }_{L^1\left(\mathcal{B}\right)},$

(15)$\Psi \left(\tilde{u}\right)\ge {\int }_{B\left(x_0,{\displaystyle \frac{R}{2}}\right)}F\left(x,d\right)dx.$

$\Phi \left(\tilde{u}\right)\ge {\displaystyle \frac{2^q}{p}}min\left\{{\displaystyle \frac{{\parallel g\parallel }_{L^1\left(\mathcal{B}\right)}}{R^p}},{\displaystyle \frac{{\parallel h\parallel }_{L^1\left(\mathcal{B}\right)}}{R^q}}\right\}(d^p+d^q)={\displaystyle \frac{{|\Omega |}^{\frac{p}{p_s^{*}}}{M}_1}{p{c}_{p_s^{*}}^p{\parallel g^{-s}\parallel }_{L^1(\Omega )}^{\frac{1}{s}}}}(d^p+d^q);$

$\Phi \left(\tilde{u}\right)\le {\displaystyle \frac{2^p}{q}}max\left\{{\displaystyle \frac{{\parallel g\parallel }_{L^1\left(\mathcal{B}\right)}}{R^p}},{\displaystyle \frac{{\parallel h\parallel }_{L^1\left(\mathcal{B}\right)}}{R^q}}\right\}(d^p+d^q)={\displaystyle \frac{{|\Omega |}^{\frac{p}{p_s^{*}}}{M}_2}{q{c}_{p_s^{*}}^p{\parallel g^{-s}\parallel }_{L^1(\Omega )}^{\frac{1}{s}}}}(d^p+d^q);$

(16)$\begin{array}{c}\hfill {\displaystyle \frac{\Psi \left(\tilde{u}\right)}{\Phi \left(\tilde{u}\right)}}\ge {\displaystyle \frac{q{c}_{p_s^{*}}^p{\parallel g^{-s}\parallel }_{L^1(\Omega )}^{\frac{1}{s}}}{{|\Omega |}^{\frac{p}{p_s^{*}}}{M}_2}}{\displaystyle \frac{{\displaystyle {\int }_{B\left(x_0,\frac{R}{2}\right)}F\left(x,d\right)dx}}{d^p+d^q}}.\end{array}$

For all $u\in {\Phi }^{-1}\left(\left]-\infty ,r\right]\right)$, we have $∥u∥\le {\left(pr\right)}^{{\displaystyle \frac{1}{p}}}$. Then,

$\begin{array}{ccc}\hfill {\displaystyle \frac{{\displaystyle \underset{u\in {\Phi }^{-1}\left(\left]-\infty ,r\right]\right)}{sup}\Psi \left(u\right)}}{r}}& \le & {\displaystyle \frac{{\displaystyle \underset{∥u∥\le {\left(pr\right)}^{\frac{1}{p}}}{sup}\Psi \left(u\right)}}{r}}\le {\displaystyle \frac{{\displaystyle \underset{∥u∥\le {\left(pr\right)}^{\frac{1}{p}}}{sup}\left(a_1{c}_{p_s^{*}}{|\Omega |}^{\frac{p_s^{*}-1}{p_s^{*}}}\parallel g^{-s}{\parallel }_{L^1(\Omega )}^{\frac{1}{ps}}\parallel u\parallel +{\displaystyle \frac{a_2}{\gamma }}{c}_{p_s^{*}}^{\gamma }{|\Omega |}^{\frac{p_s^{*}-\gamma }{p_s^{*}}}\parallel g^{-s}{\parallel }_{L^1(\Omega )}^{\frac{\gamma }{ps}}{\parallel u\parallel }^{\gamma }\right)}}{r}}\hfill \\ & \le & a_1{c}_{p_s^{*}}{|\Omega |}^{{\displaystyle \frac{p_s^{*}-1}{p_s^{*}}}}\parallel g^{-s}{\parallel }_{L^1(\Omega )}^{{\displaystyle \frac{1}{ps}}}{p}^{{\displaystyle \frac{1}{p}}}{r}^{{\displaystyle \frac{1-p}{p}}}+{\displaystyle \frac{a_2}{\gamma }}{c}_{p_s^{*}}^{\gamma }\parallel g^{-s}{\parallel }_{L^1(\Omega )}^{{\displaystyle \frac{\gamma }{ps}}}{|\Omega |}^{{\displaystyle \frac{p_s^{*}-\gamma }{p_s^{*}}}}{p}^{{\displaystyle \frac{\gamma }{p}}}{r}^{{\displaystyle \frac{\gamma -p}{p}}}\hfill \\ & =& p{c}_{p_s^{*}}^p{|\Omega |}^{{\displaystyle \frac{p_s^{*}-p}{p_s^{*}}}}{\parallel g^{-s}\parallel }_{L^1(\Omega )}^{{\displaystyle \frac{1}{s}}}\left[a_1{\left({\displaystyle \frac{c_{p_s^{*}}^p{\parallel g^{-s}\parallel }_{L^1(\Omega )}^{\frac{1}{s}}}{{|\Omega |}^{\frac{p}{p_s^{*}}}}}pr\right)}^{{\displaystyle \frac{1-p}{p}}}+{\displaystyle \frac{a_2}{\gamma }}{\left({\displaystyle \frac{c_{p_s^{*}}^p{\parallel g^{-s}\parallel }_{L^1(\Omega )}^{\frac{1}{s}}}{{|\Omega |}^{\frac{p}{p_s^{*}}}}}pr\right)}^{{\displaystyle \frac{\gamma -p}{p}}}\right]\hfill \\ & =& p{c}_{p_s^{*}}^p\parallel g^{-s}{\parallel }_{L^1(\Omega )}^{{\displaystyle \frac{1}{s}}}{|\Omega |}^{{\displaystyle \frac{p_s^{*}-p}{p_s^{*}}}}\left[a_1{c}^{1-p}+{\displaystyle \frac{a_2}{\gamma }}{c}^{\gamma -p}\right].\hfill \end{array}$

Our aim is to apply Theorem 1. The functionals $\Phi$ and $\Psi$ satisfy all regularity assumptions requested in Theorem 1.

On the other hand, $\Phi \left(u\right)=\Phi \left(0\right)=\Psi \left(0\right)=0$.

Fix $\lambda \in \tilde{\Lambda }$. From (ii), we observe that one has $\tilde{\Lambda }\ne \varnothing$, moreover for each $u\in W_0^{1,p}(g,\Omega )$, one has

(17)$I\left(u\right)=\Phi \left(u\right)-\lambda \Psi \left(u\right)\ge {\displaystyle \frac{1}{p}}{\parallel u\parallel }^p-\lambda {\displaystyle \frac{a_2}{\gamma }}{c}_{p_s^{*}}^{\gamma }{|\Omega |}^{{\displaystyle \frac{p_s^{*}-\gamma }{p_s^{*}}}}\parallel g^{-s}{\parallel }_{L^1(\Omega )}^{{\displaystyle \frac{\gamma }{ps}}}{\parallel u\parallel }^{\gamma }-\lambda a_1{c}_{p_s^{*}}{|\Omega |}^{{\displaystyle \frac{p_s^{*}-1}{p_s^{*}}}}{\parallel g^{-s}\parallel }_{L^1(\Omega )}^{{\displaystyle \frac{1}{ps}}}∥u∥.$

We claim that the operator I is coercive. If $\gamma \in [1,p[$ from (17), we have ${lim}_{\parallel u\parallel \to +\infty }{\displaystyle \frac{I\left(u\right)}{\parallel u\parallel }}=+\infty$ for every $\lambda \ge 0$. If $\gamma =p$, Condition (17) becomes

$I\left(u\right)=\Phi \left(u\right)-\lambda \Psi \left(u\right)\ge {\displaystyle \frac{1}{p}}\left[1-\lambda a_2{c}_{p_s^{*}}^p{|\Omega |}^{{\displaystyle \frac{p_s^{*}-p}{p_s^{*}}}}{\parallel g^{-s}\parallel }_{L^1(\Omega )}^{{\displaystyle \frac{1}{s}}}\right]{\parallel u\parallel }^p-\lambda a_1{c}_{p_s^{*}}{|\Omega |}^{{\displaystyle \frac{p_s^{*}-1}{p_s^{*}}}}{\parallel g^{-s}\parallel }_{L^1(\Omega )}^{{\displaystyle \frac{1}{ps}}}∥u∥,$

$\lambda <{\displaystyle \frac{1}{p{c}_{p_s^{*}}^p\parallel g^{-s}{\parallel }_{L^1(\Omega )}^{\frac{1}{s}}{|\Omega |}^{\frac{p_s^{*}-p}{p_s^{*}}}\left(a_1{c}^{1-p}+{\displaystyle \frac{a_2}{p}}\right)}}\le {\displaystyle \frac{1}{c_{p_s^{*}}^p\parallel g^{-s}{\parallel }_{L^1(\Omega )}^{\frac{1}{s}}{|\Omega |}^{\frac{p_s^{*}-p}{p_s^{*}}}{a}_2}}.$

$⟨{\Phi }^{\prime }\left(u_n\right),u_n-u⟩=⟨I^{\prime }\left(u_n\right),u_n-u⟩+\lambda ⟨{\Psi }^{\prime }\left(u_n\right),u_n-u⟩,$

$\underset{n\to \infty }{lim\; sup}⟨{\Phi }^{\prime }\left(u_n\right),u_n-u⟩\le 0.$

All assumptions of Theorem 1 are verified. Thus, for each $\lambda \in \tilde{\Lambda }\subset \left]{\displaystyle \frac{\Phi \left(\tilde{u}\right)}{\Psi \left(\tilde{u}\right)}},{\displaystyle \frac{r}{{\displaystyle \underset{u\in {\Phi }^{-1}\left(\left]-\infty ,r\right]\right)}{sup}\Psi \left(u\right)}}}\right[,$ Problem (1) admits at least three weak solutions. Moreover, taking Lemma 1 into account, the solutions are bounded. □

If Conditions (2) and (6) hold, let $f:\Omega \times \mathbb{R}\to \mathbb{R}$ be a positive continuous function, satisfying $\left(H\right)$ with $1\le \gamma <p$$\left(H1\right)$ . Moreover, assume that

(18)$\underset{t\to 0}{lim}{\displaystyle \frac{f(x,t)}{{\left|t\right|}^{p-1}}}=0\mathit{uniformly}a.e.x\mathit{in}\Omega .$

Then, there exists $\overline{\lambda }>0$ such that for every $\lambda >\overline{\lambda }$, Problem (1) admits at least three non-negative bounded weak solutions.

Using a similar argument as in [27] (Lemma 3.3) and [28] (Theorem 3.3) from (18), we have

(19)$\underset{r\to 0^{+}}{lim}{\displaystyle \frac{{\displaystyle \underset{u\in {\Phi }^{-1}\left(\left]-\infty ,r\right]\right)}{sup}\Psi \left(u\right)}}{r}}=0.$

${\displaystyle \frac{{\displaystyle \underset{u\in {\Phi }^{-1}\left(\left]-\infty ,\overline{r}\right]\right)}{sup}\Psi \left(u\right)}}{\overline{r}}}\le {\displaystyle \frac{1}{\lambda }}<{\displaystyle \frac{q{c}_{p_s^{*}}^p{\parallel a^{-s}\parallel }_{L^1(\Omega )}^{\frac{1}{s}}}{{|\Omega |}^{\frac{p}{p_s^{*}}}{M}_2}}{\displaystyle \frac{{\displaystyle {\int }_{B\left(x_0,\frac{R}{2}\right)}F\left(x,\delta \right)dx}}{{\delta }^p+{\delta }^q}}<{\displaystyle \frac{\Psi \left(\tilde{u}\right)}{\Phi \left(\tilde{u}\right)}}.$

Moreover, in the proof of Theorem 2, we have already showed that, when $1\le \gamma <p$, the functional I is coercive, bounded from below and satisfies Condition $\left(PS\right)$ for each $\lambda \ge 0$.

Since of all assumptions of Theorem 1 are verified, for each $\lambda >\overline{\lambda }$, Problem (1) admits at least three weak solutions. To prove that the weak solution u is non-negative, we use $-u^{-}=-max\{-u,0\}\in W_0^{1,p}(g,\Omega )$ as a test function in (11). Moreover, taking Lemma 1 into account, the solutions are bounded. Thus, the proof is complete. □

Let $f:\mathbb{R}\to \mathbb{R}$ be a continuous function with $f\not\equiv 0$ and set $F\left(t\right)={\int }_0^{t}f\left(s\right)ds$ with $F\ge 0$ a.e. in Ω. If

(20) $\underset{\left|t\right|\to +\infty }{lim}{\displaystyle \frac{F\left(t\right)}{{\left|t\right|}^p}}=0$

(21) $\underset{t\to 0}{lim}{\displaystyle \frac{F\left(t\right)}{{\left|t\right|}^p}}=0,$

Set $\underline{\lambda }={\displaystyle \frac{2^N\Gamma (1+\frac{N}{2}){|\Omega |}^{\frac{p}{p_s^{*}}}{M}_2}{{\pi }^{\frac{N}{2}}{R}^N{c}_{p_s^{*}}^p{\parallel g^{-s}\parallel }_{L^1(\Omega )}^{\frac{1}{s}}}}{inf}_{d>0}\left\{{\displaystyle \frac{d^p+d^q}{F\left(d\right)}}\right\}$, where $x_0$, R and $M_1$ are given as in Theorem 2, and $\Gamma$ is the gamma function. Fix a positive number $\lambda >\underline{\lambda }$. Then, there is $\eta >0$ such that $\lambda >{\displaystyle \frac{2^N\Gamma (1+\frac{N}{2}){|\Omega |}^{\frac{p}{p_s^{*}}}{M}_2}{{\pi }^{\frac{N}{2}}{R}^N{c}_{p_s^{*}}^p{\parallel g^{-s}\parallel }_{L^1(\Omega )}^{\frac{1}{s}}}}{\displaystyle \frac{{\eta }^p+{\eta }^q}{F\left(\eta \right)}}$. We consider the operator I as in (8), and we claim that it is coercive. In fact, we observe that from (20), when we fix $0<ϵ<{\displaystyle \frac{1}{\lambda p{c}_{p_s^{*}}^p{|\Omega |}^{\frac{p_s^{*}-p}{p_s^{*}}}{\parallel g^{-s}\parallel }_{L^1(\Omega )}^{\frac{1}{s}}}}$, there exists $\nu >0$ such that

$F\left(t\right)\le {ϵ\left|t\right|}^p+\nu ,$

(22)$\Psi \left(u\right)={\int }_{\Omega }F\left(u\right)dx\le {\int }_{\Omega }\left({ϵ\left|u\right|}^p+\nu \right)dx=ϵ{∥u∥}_{L^p(\Omega )}^p+\nu |\Omega |\le ϵc_{p_s^{*}}^p{|\Omega |}^{{\displaystyle \frac{p_s^{*}-p}{p_s^{*}}}}\parallel g^{-s}{\parallel }_{L^1(\Omega )}^{{\displaystyle \frac{1}{s}}}{\parallel u\parallel }^p+\nu |\Omega |.$

$I\left(u\right)=\Phi \left(u\right)-\lambda \Psi \left(u\right)\ge {\displaystyle \frac{1}{p}}{\parallel u\parallel }^p-\lambda ϵc_{p_s^{*}}^p{|\Omega |}^{{\displaystyle \frac{p_s^{*}-p}{p_s^{*}}}}\parallel g^{-s}{\parallel }_{L^1(\Omega )}^{{\displaystyle \frac{1}{s}}}{\parallel u\parallel }^p-\lambda \nu |\Omega |,$

All assumptions of Theorem 1 are verified. Then, for each $\lambda >\underline{\lambda }$, Problem (1) admits at least three weak solutions. If, additionally, f is non-negative, then the weak solutions are non-negative. If Condition $\left(H1\right)$ holds, the solutions are bounded. □

We consider the following problem

(23)$\left\{\begin{array}{cc}-{\mathit{div}\left(\right|x|}^{{\displaystyle \frac{1}{3}}}{|\nabla u|+(1-|x|}^2)\nabla u)=\lambda f\left(u\right)\hfill & \mathit{in}\Omega ,\hfill \\ \\ u=0\hfill & \mathit{on}\partial \Omega .\hfill \end{array}\right.$

$g^{-{\displaystyle \frac{q}{p-q}}}{b}^{{\displaystyle \frac{p}{p-q}}}={\left|x\right|}^{-{\displaystyle \frac{2}{3}}}{(1-|x|}^2{)}^3\in L^1(\Omega ).$

We choose $s=2\in \left]{\displaystyle \frac{N}{p}},+\infty \right[\cap \left[{\displaystyle \frac{1}{p-1}},+\infty \right[$, and we have $p_s=2$ and $p_s^{*}=6$. Thus,

${∥g^{-s}∥}_{L^1(\Omega )}={\int \int \int }_{\Omega }{\left|x\right|}^{-{\displaystyle \frac{2}{3}}}dx<\infty .$