([14]) For $f(x,y)\in L\left(P\right)$, $r_1,r_2>0$, the expression

$I_0^{r}f(x,y)=\frac{1}{\mathsf{\Gamma }\left(r_1\right)\mathsf{\Gamma }\left(r_2\right)}{\int }_0^x{\int }_0^y{(x-t)}^{r_1-1}{(y-s)}^{r_2-1}f(t,s)dtds$

([14]) Let $r=(r_1,r_2)$, $q=(q_1,q_2)$, $0<r_1,r_2\le 1$, $q_1,q_2>0$. For $f(x,y)\in L\left(P\right)$, then

$I_0^q{I}_0^{r}f(x,y)=I_0^{q+r}f(x,y).$

([14]) For $0<r_1,r_2<1$, the expression

$D_0^{r}f(x,y)=D_{xy}{I}_0^{1-r}f(x,y)$

([24]) If $f(x,y)\in L\left(P\right)$ and $0<r_1,r_2\le 1$, then

$D_0^r{I}_0^{r}f(x,y)=f(x,y)$

([26]) For $0<r_1,r_2<1$, the expression

${}^C{D}_0^{r}f(x,y)=I_0^{1-r}\left(D_{xy}f(x,y)\right)=\frac{1}{\mathsf{\Gamma }(1-r_1)\mathsf{\Gamma }(1-r_2)}{\int }_0^x{\int }_0^y{(x-t)}^{-r_1}{(y-s)}^{-r_2}{D}_{ts}f(t,s)dtds$

([26]) Let $0<r_1,r_2\le 1$. If $f(x,y)\in AC\left(\overline{P}\right)$, then

$D_0^r(f(x,y)-\lambda (x,y))={}^C{D}_0^{r}f(x,y)$

Let $0<r_1,r_2\le 1$. If $f(x,y)\in C\left(\overline{P}\right)$ and $I_0^{r}f(x,y)\in AC\left(\overline{P}\right)$, then

${}^C{D}_0^r{I}_0^{r}f(x,y)=f(x,y).$

Since $f(x,y)\in C\left(\overline{P}\right)$, it exists a constant $M>0$ such that

$\left|f\right(x,y\left)\right|\le M.$

Therefore,

(4)$\begin{array}{cc}\hfill |f_r(x,y)|& =|I_0^{r}f(x,y)|\hfill \\ \hfill & =\left|\frac{1}{\mathsf{\Gamma }\left(r_1\right)\mathsf{\Gamma }\left(r_2\right)}{\int }_0^x{\int }_0^y{(x-t)}^{r_1-1}{(y-s)}^{r_2-1}f(t,s)dtds\right|\hfill \\ \hfill & \le \frac{M{x}^{r_1}{y}^{r_2}}{\mathsf{\Gamma }(1+r_1)\mathsf{\Gamma }(1+r_2)}.\hfill \end{array}$

It follows from (4) and $I_0^{r}f(x,y)\in C\left(\overline{P}\right)$ that

(5)$f_r(x,0)=f_r(0,y)=0,x\in [0,a],y\in [0,b].$

By virtue of Lemmas 2 and 3 and (5), we get

$\begin{array}{cc}\hfill {}^C{D}_0^r{I}_0^{r}f(x,y)& =D_0^r(I_0^{r}f(x,y)-f_r(x,0)-f_r(0,y)+f_r(0,0))\hfill \\ \hfill & =D_0^r{I}_0^{r}f(x,y)\hfill \\ \hfill & =f(x,y).\hfill \end{array}$

The proof is completed. □

Let $1<r_1,r_2<2$. The expression

${}^C{D}_0^{r}f(x,y)=I_0^{2-r}\left(D_{xy}^{2}f(x,y)\right)=\frac{1}{\mathsf{\Gamma }(2-r_1)\mathsf{\Gamma }(2-r_2)}{\int }_0^x{\int }_0^y{(x-t)}^{1-r_1}{(y-s)}^{1-r_2}{D}_{ts}^{2}f(t,s)dtds$

For $f(x,y)\in A{C}^2\left(\overline{P}\right)$, then

$I_0^2{D}_{xy}^{2}f(x,y)=f(x,y)-\gamma (x,y),$

$\begin{array}{cc}\hfill \gamma (x,y)=& -xy\frac{{\partial }^{2}f(0,0)}{\partial x\partial y}+y\left(\frac{\partial f(x,0)}{\partial y}-\frac{\partial f(0,0)}{\partial y}\right)+x\left(\frac{\partial f(0,y)}{\partial x}-\frac{\partial f(0,0)}{\partial x}\right)\hfill \\ \hfill & +f(x,0)+f(0,y)-f(0,0).\hfill \end{array}$

Since $I_0^1{D}_{xy}f(x,y)=f(x,y)-[f(x,0)+f(0,y)-f(0,0)]$, we get

$\begin{array}{cc}\hfill I_0^1{D}_{xy}^{2}f(x,y)& =I_0^1{D}_{xy}\left(D_{xy}f(x,y)\right)\hfill \\ \hfill & =D_{xy}f(x,y)-[\left(D_{xy}f(x,y)\right){|}_{x=0}+\left(D_{xy}f(x,y)\right){|}_{y=0}-\left(D_{xy}f(x,y)\right){|}_{x=0,y=0}].\hfill \end{array}$

Therefore,

$\begin{array}{cc}\hfill I_0^2{D}_{xy}^{2}f(x,y)=& I_0^1\left(I_0^1{D}_{xy}^{2}f(x,y)\right)\hfill \\ \hfill =& I_0^1(D_{xy}f(x,y)-[\left(D_{xy}f(x,y)\right){|}_{x=0}+\left(D_{xy}f(x,y)\right){|}_{y=0}-\left(D_{xy}f(x,y)\right){|}_{x=0,y=0}\left]\right)\hfill \\ \hfill =& f(x,y)-[-xy\frac{{\partial }^{2}f(0,0)}{\partial x\partial y}+y\left(\frac{\partial f(x,0)}{\partial y}-\frac{\partial f(0,0)}{\partial y}\right)+x\left(\frac{\partial f(0,y)}{\partial x}-\frac{\partial f(0,0)}{\partial x}\right)\hfill \\ \hfill & +f(x,0)+f(0,y)-f(0,0)]\hfill \\ \hfill =& f(x,y)-\gamma (x,y).\hfill \end{array}$

The proof is completed. □

Let $1<r_1,r_2<2$. For almost all $(x,y)\in \overline{P}$, then

(1) ${}^C{D}_0^r{I}_0^{r}f(x,y)=f(x,y)$, if $f(x,y)\in C\left(\overline{P}\right)$ and $I_0^{r-1}f(x,y)\in AC\left(\overline{P}\right)$;

(2) $I_0^r\left({}^C{D}_0^{r}f(x,y)\right)=f(x,y)-\gamma (x,y)$, if $f(x,y)\in A{C}^2\left(\overline{P}\right)$, where $\gamma (x,y)$ is given by Lemma 5.

(1) According to Definition 4 and Lemmas 1 and 4, we have

$\begin{array}{cc}\hfill {}^C{D}_0^r{I}_0^{r}f(x,y)& =I_0^{2-r}{D}_{xy}^2{I}_0^{r}f(x,y)=I_0^{2-r}{D}_{xy}^2{I}_0^1{I}_0^{r-1}f(x,y)\hfill \\ \hfill & =I_0^{2-r}{D}_{xy}{I}_0^{r-1}f(x,y)={}^C{D}_0^{r-1}{I}_0^{r-1}f(x,y)\hfill \\ \hfill & =f(x,y).\hfill \end{array}$

(2) Using Definition 4 and Lemmas 1 and 5, we get

$I_0^r\left({}^C{D}_0^{r}f(x,y)\right)=I_0^r{I}_0^{2-r}{D}_{xy}^{2}f(x,y)=I_0^2{D}_{xy}^{2}f(x,y)=f(x,y)-\gamma (x,y).$

The proof is completed. □

Assume that $q\in L\left(\overline{P}\right)$. A function u is a solution of problem (1), then it satisfies the integral equation

(6) $u(x,y)=-{\int }_0^a{\int }_0^{b}G(x,y,s,t)q(s,t)u(s,t)dsdt,$

(7) $G(x,y,s,t)=\frac{1}{\mathsf{\Gamma }\left(r_1\right)\mathsf{\Gamma }\left(r_2\right)}H(x,s)K(y,t),$

(8) $H(x,s)=\left\{\begin{array}{c}\frac{x}{a}{(a-s)}^{r_1-1}-{(x-s)}^{r_1-1},0\le s\le x\le a,\hfill \\ \frac{x}{a}{(a-s)}^{r_1-1},0\le x\le s\le a,\hfill \end{array}\right.$

(9) $K(y,t)=\left\{\begin{array}{c}\frac{y}{b}{(b-t)}^{r_2-1}-{(y-t)}^{r_2-1},0\le t\le y\le b,\hfill \\ \frac{y}{b}{(b-t)}^{r_2-1},0\le y\le t\le b.\hfill \end{array}\right.$

If $u(x,y)$ is a solution of (1), applying the integral operator $I_0^r$ to (1) and making use of Lemma 6, we have

(10)$u(x,y)=\gamma (x,y)-I_0^r\left(q(x,y)u(x,y)\right).$

Let

(11)$\frac{\partial u(x,0)}{\partial y}=c\left(x\right),\frac{\partial u(0,y)}{\partial x}=d\left(y\right).$

By virtue of boundary value conditions $u(0,y)=u(x,0)=u(a,y)=u(x,b)=0$, we get

(12)$\frac{{\partial }^{2}u(0,0)}{\partial x\partial y}=d^{\prime }\left(0\right),\frac{\partial u(0,0)}{\partial y}=\frac{\partial u(0,y)}{\partial y}{|}_{y=0}=0,\frac{\partial u(0,0)}{\partial x}=\frac{\partial u(x,0)}{\partial x}{|}_{x=0}=0,$

(13)$c\left(a\right)=\underset{y\to 0^{+}}{lim}\frac{u(a,y)-u(a,0)}{y}=0$

(14)$d\left(b\right)=\underset{x\to 0^{+}}{lim}\frac{u(x,b)-u(0,b)}{x}=0.$

Applying (11), (12), and $u(x,0)=u(0,y)=0$ to (10), we have

(15)$u(x,y)=-xy{d}^{\prime }\left(0\right)+yc\left(x\right)+xd\left(y\right)-I_0^r\left(q(x,y)u(x,y)\right).$

Let $x=a$ and $y=b$ in (15) at the same time, we can calculate

(16)$d^{\prime }\left(0\right)=-\frac{1}{ab}{I}_0^r\left(q(a,b)u(a,b)\right).$

Furthermore, let $x=a$ and $y=b$ in (15) respectively, we can obtain

(17)$d\left(y\right)=y{d}^{\prime }\left(0\right)+\frac{1}{a}{I}_0^r\left(q(a,y)u(a,y)\right)$

(18)$c\left(x\right)=x{d}^{\prime }\left(0\right)+\frac{1}{b}{I}_0^r\left(q(x,b)u(x,b)\right).$

Applying (16)–(18) into (15), we have

$\begin{array}{cc}\hfill u(x,y)=& -\frac{xy}{ab}{I}_0^r\left(q(a,b)u(a,b)\right)+\frac{y}{b}{I}_0^r\left(q(x,b)u(x,b)\right)+\frac{x}{a}{I}_0^r\left(q(a,y)u(a,y)\right)-I_0^r\left(q(x,y)u(x,y)\right)\hfill \\ \hfill =& -\frac{1}{\mathsf{\Gamma }\left(r_1\right)\mathsf{\Gamma }\left(r_2\right)}[\frac{xy}{ab}{\int }_0^a{\int }_0^b{(a-s)}^{r_1-1}{(b-t)}^{r_2-1}q(s,t)u(s,t)dsdt\hfill \\ \hfill & -\frac{y}{b}{\int }_0^x{\int }_0^b{(x-s)}^{r_1-1}{(b-t)}^{r_2-1}q(s,t)u(s,t)dsdt\hfill \\ \hfill & -\frac{x}{a}{\int }_0^a{\int }_0^y{(a-s)}^{r_1-1}{(y-t)}^{r_2-1}q(s,t)u(s,t)dsdt\hfill \\ \hfill & +{\int }_0^x{\int }_0^y{(x-s)}^{r_1-1}{(y-t)}^{r_2-1}q(s,t)u(s,t)dsdt]\hfill \\ \hfill =& -\frac{1}{\mathsf{\Gamma }\left(r_1\right)\mathsf{\Gamma }\left(r_2\right)}[{\int }_0^x{\int }_0^y\left[\frac{x}{a}{(a-s)}^{r_1-1}-{(x-s)}^{r_1-1}\right]\left[\frac{y}{b}{(b-t)}^{r_2-1}-{(y-t)}^{r_2-1}\right]q(s,t)u(s,t)dsdt\hfill \\ \hfill & +{\int }_0^x{\int }_y^b\frac{y}{b}{(b-t)}^{r_2-1}\left[\frac{x}{a}{(a-s)}^{r_1-1}-{(x-s)}^{r_1-1}\right]q(s,t)u(s,t)dsdt\hfill \\ \hfill & +{\int }_x^a{\int }_0^y\frac{x}{a}{(a-s)}^{r_1-1}\left[\frac{y}{b}{(b-t)}^{r_2-1}-{(y-t)}^{r_2-1}\right]q(s,t)u(s,t)dsdt\hfill \\ \hfill & +{\int }_x^a{\int }_y^b\frac{xy}{ab}{(a-s)}^{r_1-1}{(b-t)}^{r_2-1}q(s,t)u(s,t)dsdt]\hfill \\ \hfill =& -{\int }_0^a{\int }_0^{b}G(x,y,s,t)q(s,t)u(s,t)dsdt,\hfill \end{array}$

The proof is completed. □

The Green function G given by (7) satisfies

(19) $\underset{\begin{array}{c}x,s\in [0,a]\\ y,t\in [0,b]\end{array}}{max}\left|G(x,y,s,t)\right|=\frac{1}{\mathsf{\Gamma }\left(r_1\right)\mathsf{\Gamma }\left(r_2\right)}max\{v\left(r_1\right),p\left(r_1\right)\}max\{v\left(r_2\right),p\left(r_2\right)\}{a}^{r_1-1}{b}^{r_2-1},$

(20) $v\left(r\right)=\frac{1}{r}{\left(1-\frac{1}{r}\right)}^{r-1}>0,p\left(r\right)=(2-r){\left(\frac{1}{r-1}\right)}^{\frac{r-1}{r-2}}>0.$

It follows from (7) that

(21)$\underset{\begin{array}{c}x,s\in [0,a]\\ y,t\in [0,b]\end{array}}{max}\left|G(x,y,s,t)\right|=\frac{1}{\mathsf{\Gamma }\left(r_1\right)\mathsf{\Gamma }\left(r_2\right)}\underset{x,s\in [0,a]}{max}\left|H(x,s)\right|\underset{y,t\in [0,b]}{max}\left|K(y,t)\right|.$

In the case $0\le s\le x\le a$, for fixed $x\in [0,a]$, we have

$\frac{\partial H(x,s)}{\partial s}=(1-r_1)\left[\frac{x}{a}{(a-s)}^{r_1-2}-{(x-s)}^{r_1-2}\right].$

Obviously, $\frac{\partial H(x,s)}{\partial s}\ge 0$. Hence, we establish that $H(x,s)$ is increasing in s. Therefore,

$\begin{array}{c}\hfill \underset{s\in [0,a]}{max}H(x,s)=H(x,x)=\frac{x}{a}{(a-x)}^{r_1-1}\ge 0,\\ \hfill \underset{s\in [0,a]}{min}H(x,s)=H(x,0)=x(a^{r_1-2}-x^{r_1-2})\le 0.\end{array}$

Let $m\left(x\right)=\frac{x}{a}{(a-x)}^{r_1-1}$. From $m^{\prime }\left(x\right)=\frac{{(a-x)}^{r_1-2}(a-r_{1}x)}{a}=0$, we get that $x=\frac{a}{r_1}$. Moreover, we obtain that

(22)$\underset{x,s\in [0,a]}{max}H(x,s)=\underset{x\in [0,a]}{max}m\left(x\right)=m\left(\frac{a}{r_1}\right)=v\left(r_1\right)a^{r_1-1}.$

Let $n\left(x\right)=x(a^{r_1-2}-x^{r_1-2})$. From $n^{\prime }\left(x\right)=a^{r_1-2}-(r_1-1)x^{r_1-2}=0$, we get that $x=\frac{a}{{(r_1-1)}^{\frac{1}{r_1-2}}}$. Due to $n\left(x\right)<0$, we obtain

(23)$\underset{x,s\in [0,a]}{min}H(x,s)=n\left(\frac{a}{{(r_1-1)}^{\frac{1}{r_1-2}}}\right)=-p\left(r_1\right)a^{r_1-1}.$

By virtue of (22) and (23), we conclude that

(24)$\underset{x,s\in [0,a]}{max}\left|H(x,s)\right|=max\{v\left(r_1\right),p\left(r_1\right)\}{a}^{r_1-1},0\le s\le x\le a.$

In the case $0\le x\le s\le a$, obviously, $H(x,s)$ is decreasing in s. Therefore, with the help of (22), we have

(25)$\underset{x,s\in [0,a]}{max}H(x,s)=\underset{x\in [0,a]}{max}H(x,x)=v\left(r_1\right)a^{r_1-1},$

(26)$\underset{x,s\in [0,a]}{min}H(x,s)=\underset{x\in [0,a]}{min}H(x,a)=0.$

From (25) and (26), we deduce that

(27)$\underset{x,s\in [0,a]}{max}\left|H(x,s)\right|=v\left(r_1\right)a^{r_1-1},0\le x\le s\le a.$

By means of (24) and (27), we have

(28)$\underset{x,s\in [0,a]}{max}\left|H(x,s)\right|=max\{v\left(r_1\right),p\left(r_1\right)\}{a}^{r_1-1}.$

Analogously, we can obtain the fact that

(29)$\underset{y,t\in [0,b]}{max}\left|K(y,t)\right|=max\{v\left(r_2\right),p\left(r_2\right)\}{b}^{r_2-1}.$

In conclusion, (19) is obtained with the help of (21), (28), and (29). The proof is completed. □

If a function $u(x,y)\in C\left(\overline{P}\right)\cap C^2\left(P\right)$ is a nontrivial solution to problem (1), then

(30) ${\int }_0^a{\int }_0^b\left|q(x,y)\right|dxdy>\frac{\mathsf{\Gamma }\left(r_1\right)\mathsf{\Gamma }\left(r_2\right)}{max\{v\left(r_1\right),p\left(r_1\right)\}max\{v\left(r_2\right),p\left(r_2\right)\}{a}^{r_1-1}{b}^{r_2-1}}.$

It follows from Lemma 7 that a solution to problem (1) satisfies the integral equation

$u(x,y)=-{\int }_0^a{\int }_0^{b}G(x,y,s,t)q(s,t)u(s,t)dsdt.$

Hence,

$\begin{array}{cc}\hfill \Vert u\Vert & =\underset{(x,y)\in \overline{P}}{max}\left|u(x,y)\right|\hfill \\ \hfill & =\underset{(x,y)\in \overline{P}}{max}\left|{\int }_0^a{\int }_0^{b}G(x,y,s,t)q(s,t)u(s,t)dsdt\right|.\hfill \end{array}$

With the help of Lemma 8, we have

(31)$\Vert u\Vert <\frac{1}{\mathsf{\Gamma }\left(r_1\right)\mathsf{\Gamma }\left(r_2\right)}max\{v\left(r_1\right),p\left(r_1\right)\}max\{v\left(r_2\right),p\left(r_2\right)\}{a}^{r_1-1}{b}^{r_2-1}{\int }_0^a{\int }_0^b|q(s,t)|dsdt\Vert u\Vert .$

Since $u(x,y)$ is a nontrivial solution, (31) is equivalent to

$\mathsf{\Gamma }\left(r_1\right)\mathsf{\Gamma }\left(r_2\right)<max\{v\left(r_1\right),p\left(r_1\right)\}max\{v\left(r_2\right),p\left(r_2\right)\}{a}^{r_1-1}{b}^{r_2-1}{\int }_0^a{\int }_0^b\left|q(s,t)\right|dsdt,$

The proof is completed. □

Theorem 1 provides a necessary condition for the existence of nontrivial solutions to the considered problem. That is to say, if

(32) ${\int }_0^a{\int }_0^b\left|q(x,y)\right|dxdy<\frac{\mathsf{\Gamma }\left(r_1\right)\mathsf{\Gamma }\left(r_2\right)}{max\{v\left(r_1\right),p\left(r_1\right)\}max\{v\left(r_2\right),p\left(r_2\right)\}{a}^{r_1-1}{b}^{r_2-1}},$

Consider the following boundary value problem:

(33) $\left\{\begin{array}{c}{}^C{D}_0^{r}u(x,y)+x^{-\frac{1}{3}}{y}^{-\frac{1}{2}}u(x,y)=0,(x,y)\in P=(0,1)\times (0,1),\hfill \\ u(0,y)=0,u(1,y)=0,y\in [0,1],\hfill \\ u(x,0)=0,u(x,1)=0,x\in [0,1],\hfill \end{array}\right.$

$\frac{\mathsf{\Gamma }\left(1.5\right)\mathsf{\Gamma }\left(1.5\right)}{max\left\{v\right(1.5),p(1.5\left)\right\}max\left\{v\right(1.5),p(1.5\left)\right\}}=\frac{27\pi }{16}.$

However, by simple calculation, we get

${\int }_0^1{\int }_0^{1}q(x,y)dxdy={\int }_0^1{\int }_0^1{x}^{-\frac{1}{3}}{y}^{-\frac{1}{2}}dxdy=3<\frac{27\pi }{16}.$

If the solution to problem (34) exists, and

(35) ${\int }_0^a{\int }_0^b\left|q(x,y)\right|dxdy<\frac{\mathsf{\Gamma }\left(r_1\right)\mathsf{\Gamma }\left(r_2\right)}{max\{v\left(r_1\right),p\left(r_1\right)\}max\{v\left(r_2\right),p\left(r_2\right)\}{a}^{r_1-1}{b}^{r_2-1}}$

Assume that $u_1(x,y)$, $u_2(x,y)$ are both solutions to problem (34), then $u(x,y)=u_1(x,y)-u_2(x,y)$ is a solution of the corresponding homogenous boundary value problem. By virtue of Remark 1, the corresponding homogeneous boundary value problem has only zero solution in $C\left(\overline{P}\right)\cap C^2\left(P\right)$. Therefore, problem (34) has a unique solution. □

If λ is an eigenvalue of problem (36), then

(37) $\left|\lambda \right|>\frac{\mathsf{\Gamma }\left(r_1\right)\mathsf{\Gamma }\left(r_2\right)}{max\{v\left(r_1\right),p\left(r_1\right)\}max\{v\left(r_2\right),p\left(r_2\right)\}{a}^{r_1-2}{b}^{r_2-2}}.$

Since $\lambda$ is an eigenvalue of problem (36), it means that problem (36) has a nontrivial solution $u_{\lambda }$. According to Theorem 1, we have

${\int }_0^a{\int }_0^b\left|\lambda \right|dxdy>\frac{\mathsf{\Gamma }\left(r_1\right)\mathsf{\Gamma }\left(r_2\right)}{max\{v\left(r_1\right),p\left(r_1\right)\}max\{v\left(r_2\right),p\left(r_2\right)\}{a}^{r_1-1}{b}^{r_2-1}}.$

$\left|\lambda \right|>\frac{\mathsf{\Gamma }\left(r_1\right)\mathsf{\Gamma }\left(r_2\right)}{max\{v\left(r_1\right),p\left(r_1\right)\}max\{v\left(r_2\right),p\left(r_2\right)\}{a}^{r_1-2}{b}^{r_2-2}},$