Proof of Theorem 1.1

A perfect matching is obviously a fractional perfect matching of a graph. By Lemma 2.6, it is easy to see that our result is true when n is even. Hence, in what follows, we consider the remaining case when n is odd.

Suppose to the contrary that G has no fractional perfect matching. Choose a connected graph G whose size is as large as possible. By Lemma 2.5, there exists a set $S\subseteq V(G)$ such that $i(G-S)\geqslant |S|+1$ . According to the choice of G, both the induced graph $G[S]$ and each connected component of $G-S$ are complete graphs. Furthermore, G is just the graph $G[S]\vee (G-S)$ .

Note that there is at most one nontrivial connected component in $G-S$ . Otherwise, we can add edges among all nontrivial connected components to get a larger nontrivial connected component, which is a contradiction to the choice of G. For convenience, let $i(G-S)=i$ and $|S|=s\geqslant 1$ . We proceed by considering two possible cases.

Case 1. $G-S$ has only one nontrivial connected component, say $G_1$ .

Let $|V(G_1)|=n_1\geqslant 2$ . If $i\geqslant s+2$ , then we construct a new graph $H_1$ obtained from G by joining each vertex of $G_1$ with one vertex in $I(G-S)$ by an edge. Clearly, $i(H_1-S)=i-1\geqslant s+1$ . By Lemma 2.5, $H_1$ has no fractional perfect matching. Note that $|E(H_1)|=|E(G)|+n_1>|E(G)|$ , giving a contradiction with the choice of G.

Since $i\geqslant s+1$ , we must have $i=s+1$ . Note that $n=n_1+2s+1\geqslant 2s+3\geqslant 5$ and $|E(G)|=s(s+1)+ \binom {n-s-1}{2}$ . Then, by a direct calculation,

$$ \begin{align*} \dbinom{n-2}{2}+2-|E(G)|&=\frac{(s-1)(2n-3s-8)}{2}\\ &\geqslant\frac{(s-1)(4s+6-3s-8)}{2}=\frac{(s-1)(s-2)}{2}\geqslant0. \end{align*} $$

Thus, $|E(G)|\leqslant \binom {n-2}{2}+2$ for $n\geqslant 5$ . This is a contradiction for $n\geqslant 13$ .

For $n=5,7,9,11$ , by a direct calculation,

$$ \begin{align*} \frac{1}{8}(n-1)(3n-1)-\dbinom{n-2}{2}-2=-\frac{1}{8}n^2+2n-\frac{39}{8} =-\frac{(n-3)(n-13)}{8}>0. \end{align*} $$

Thus, $|E(G)|\leqslant \binom {n-2}{2} +2<\tfrac 18(n-1)(3n-1)$ , which is a contradiction.

Case 2. $G-S$ has no nontrivial connected component.

If $i\geqslant s+3$ , we can create a new graph $H_2$ by adding an edge in $I(G-S)$ . Then, $i(H_2-S)\geqslant s+1$ and $H_2-S$ has exactly one nontrivial connected component. Together with $|E(G)|<|E(H_2)|$ and Case 1, we obtain a contradiction. Thus, it suffices to consider $i=s+1$ in this case (since $n=2s+2$ is even if $i=s+2$ ).

Assume $i=s+1$ . Then, $n=2s+1\geqslant 3$ and ${|E(G)|= \binom {s}{2} + s(s+1) =\tfrac 12(3s^2+s)}$ . Obviously, $\tfrac 18(n-1)(3n-1)\kern1.2pt{=}\kern1.2pt\tfrac 12(3s^2+s)$ . We get a contradiction when ${n\kern1.2pt{=}\kern1.2pt 3,5,7,9,11}$ . Comparing $|E(G)|$ with $\binom {n-2}{2}+2$ gives

$$ \begin{align*} \dbinom{2s-1}{2}+2-|E(G)|=\frac{(s-1)(s-6)}{2}. \end{align*} $$

Thus, $|E(G)|\leqslant \binom {n-2}{2}+2$ for $s\geqslant 6$ , which is a contradiction for $n\geqslant 13$ .

This completes the proof.

Proof of Theorem 1.2

By a similar discussion as the proof of Theorem 1.1, we only consider n odd (based on Lemma 2.7). Suppose to the contrary that G has no fractional perfect matching. Choose a connected graph G of order n such that its adjacency spectral radius is as large as possible.

Note that there does not exist a fractional perfect matching in G. Hence, by Lemma 2.5, there exists a set $S\subseteq V(G)$ satisfying $i(G-S)\geqslant |S|+1$ . Together with Lemma 2.1 and the choice of G, the induced graph $G[S]$ as well as each connected component of $G-S$ is a complete graph and G is the join of $G[S]$ and $G-S$ , that is, $G=G[S] \vee (G-S)$ .

For convenience, let $i(G-S)=i$ and $|S|=s$ . One may see that there exists at most one nontrivial connected component in $G-S$ . Otherwise, we can add edges among all nontrivial connected components to get a nontrivial connected component of larger size, which gives a contradiction (based on Lemma 2.1). Hence, we proceed by considering the following two possible cases.

Case 1. $G-S$ has just one nontrivial connected component, say $G_1$ .

In this case, one has $|V(G_1)|=n_1\geqslant 2$ . If $i\geqslant s+2$ , we construct a new graph $H_1$ obtained from G by joining each vertex of $G_1$ with one vertex in $I(G-S)$ by an edge. Then, G is a proper subgraph of $H_1$ . By Lemma 2.1, $\rho (G)<\rho (H_1)$ , which is a contradiction.

Now, we assume $i=s+1$ . Then, $n=n_1+2s+1\geqslant 2s+3\geqslant 5$ . According to the partition $V(G)=S\cup I(G-S)\cup V(G_1)$ , the quotient matrix of $A(G)$ equals

$$ \begin{align*} B_1= \left( \begin{array}{@{}ccc@{}} s-1 & s+1 & n-2s-1\\ s & 0 & 0\\ s & 0 & n-2s-2\\ \end{array} \right). \end{align*} $$

Then, the characteristic polynomial of $B_1$ is

$$ \begin{align*} \Phi_{B_1}(x)=x^3-(n-s-3)x^2-(s^2+n-2)x+s(s+1)(n-2s-2). \end{align*} $$

Since the partition $V(G)=S\cup I(G-S)\cup V(G_1)$ is equitable, by Lemma 2.2, the largest root, say $\theta _1$ , of $\Phi _{B_1}(x)=0$ equals the spectral radius of G.

Let $f(x)=x^3-(n-4)x^2-(n-1)x+2n-8$ and let $\xi _2(n)$ be the largest root of $f(x)=0$ . Next, we aim to show $f(\theta _1)<0$ . Substituting $\theta _1$ for x in $f(x)-\Phi _{B_1}(x)$ ,

$$ \begin{align*} f(\theta_1)-\Phi_{B_1}(\theta_1) &=(1-s)\theta_1^2+(s^2-1)\theta_1-ns^2+2s^3-sn+4s^2+2n+2s-8\\ &=(1-s)\theta_1^2+(s-1)(s+1)\theta_1-(s-1)(sn-2s^2+2n-6s-8)\\ &=(s-1)[-\theta_1(\theta_1-s-1)-(s+2)n+2s^2+6s+8]\\ & \leqslant (s-1)[-\theta_1(\theta_1-s-1)-(s+2)(2s+3)+2s^2+6s+8]. \end{align*} $$

Note that $K_{s+2}$ is a proper subgraph of G. Hence, by Lemma 2.1, $\theta _1>s+1$ . Then,

$$ \begin{align*} f(\theta_1)-\Phi_{B_1}(\theta_1) < (s-1)[-(s+2)(2s+3)+2s^2+6s+8] = (s-1)(2-s)\leqslant0. \end{align*} $$

Bear in mind $\Phi _{B_1}(\theta _1)=0$ . So we obtain $f(\theta _1)=f(\theta _1)-\Phi _{B_1}(\theta _1)<0$ , which gives $\rho (G)=\theta _1<\xi _2(n)$ when $n\geqslant 5$ . This is a contradiction for $n\geqslant 11$ .

Now consider $n=5,7,9$ . Let $\bar {f}(x)=x^2-\tfrac 12(n-3)x-\tfrac 14(n^2-1)$ and let $\xi _1(n)$ be the largest root of $\bar {f}(x)=0$ . Since $\rho (G)=\theta _1<\xi _2(n)$ when $n\geqslant 5$ , we need to compare $\xi _2(n)$ with $\xi _1(n)$ . By a direct calculation, $\xi _2(5)\thickapprox 2.3429<3=\xi _1(5)$ , $\xi _2(7)\thickapprox 4.1055<4.6056\thickapprox \xi _1(7)$ , $\xi _2(9)\thickapprox 6.0492<6.2170\thickapprox \xi _1(9)$ , which is a contradiction.

Case 2. $G-S$ has no nontrivial connected component.

If $i\geqslant s+3$ , we can construct a new graph $H_2$ by adding an edge in $I(G-S)$ . Then, $i(H_2-S)\geqslant s+1$ and $H_2-S$ has one nontrivial connected component. Together with Lemma 2.1 and Case 1, we have $\rho (G)<\rho (H_2)\leqslant \xi_2 (n)$ , which is a contradiction. Thus, it suffices to consider $i=s+1$ in this case.

Assume $i=s+1$ . Consider the partition $V(G)=S\cup I(G-S)$ . The quotient matrix of $A(G)$ with respect to the partition $S\cup I(G-S)$ is equal to

$$ \begin{align*} B_2= \left( \begin{array}{@{}ccc} s-1 & s+1\\ s & 0\\ \end{array} \!\!\right) \end{align*} $$

and the characteristic polynomial of $B_2$ equals $ \Phi _{B_2}(x)=x^2-(s-1)x-s(s+1). $ It is easy to see that the partition $V(G)=S\cup I(G-S)$ is equitable. By Lemma 2.2, the largest root, say $\theta _2$ , of $\Phi _{B_2}(x)=0$ equals the spectral radius of G.

Note that $n=2s+1$ . Then, $\Phi _{B_2}(x)=\bar {f}(x)$ and $\theta _2=\xi _1(n)$ . This is a contradiction for $n=3,5,7,9$ . Next, we consider $n\geqslant 11$ so that $s\geqslant 5$ . Substituting $\theta _2$ for x in $f(x)-x\Phi _{B_2}(x)$ gives

$$ \begin{align*} f(\theta_2)-\theta_2\Phi_{B_2}(\theta_2) & =(-n+s+3)\theta_2^2+(s^2+s-n+1)\theta_2+2n-8\\ & =(2-s)\theta_2^2+(s^2-s)\theta_2+4s-6\\ & =\theta_2[(2-s)\theta_2+s^2-s]+4s-6. \end{align*} $$

Since $\theta _2=\tfrac 12(s-1+\sqrt {5s^2+2s+1})>\tfrac 12(s-1+\sqrt {4s^2+4s+1})=\tfrac 32s$ , we have

$$ \begin{align*} f(\theta_2)-\theta_2\Phi_{B_2}(\theta_2) & <\theta_2\bigg[(2-s)\frac{3s}{2}+s^2-s\bigg]+4s-6\\ & =\theta_2\bigg(-\frac{1}{2}s^2+2s\bigg)+4s-6\\ & <-\frac{3}{4}s^3+3s^2+4s-6. \end{align*} $$

Let $p_1(x)=-\tfrac 34x^3+3x^2+4x-6$ . Then, we have $p^{\prime }_1(x)=-\tfrac 94x^2+6x+4$ and $p^{\prime }_1(\tfrac 13(4\pm 4\sqrt {2}))=0$ . Therefore, $p_1(x)$ is monotonically decreasing for $x\geqslant 4$ and $p_1(s)\leqslant p_1(5)=-4.75<0$ when $s\geqslant 5$ . Thus, $f(\theta _2)=f(\theta _2)-\theta _2\Phi _{B_2}(\theta _2)<p_1(s)<0$ for $s\geqslant 5$ and $\rho (G)=\theta _2<\xi _2(n)$ , which is a contradiction.

Together, Cases 1 and 2 complete the proof.

Proof of Theorem 1.3

Suppose to the contrary that G has no fractional perfect matching. Choose a connected graph G of order n such that its distance spectral radius is as small as possible.

Let

$$ \begin{align*} h(x) &= x^2-\tfrac{1}{2}(3n-5)x+\tfrac{1}{4}(n^2-8n+7), \\ \bar{h}(x) &= x^2-\tfrac{1}{2}(3n-4)x+\tfrac{1}{4}(n^2-8n+4), \\ \tilde{h}(x) &= x^3-(n-2)x^2-(7n-17)x-4n+10. \end{align*} $$

Assume that the largest roots of $h(x)=0$ , $\bar {h}(x)=0$ and $\tilde {h}(x)=0$ are $\zeta _1(n)$ , $\zeta _2(n)$ and $\zeta _3(n)$ (simply $\zeta _1,\,\zeta _2$ and $\zeta _3$ ), respectively.

By Lemma 2.5, there exists a set $S\subseteq V(G)$ satisfying $i(G-S)\geqslant |S|+1$ . Together with Lemma 2.3 and the choice of G, the induced graph $G[S]$ as well as each connected component of $G-S$ is a complete graph and G is the join of $G[S]$ and $G-S$ , that is, $G=G[S] \vee (G-S)$ .

For convenience, let $i(G-S)=i$ and $|S|=s$ . There exists at most one nontrivial connected component in $G-S$ . Otherwise, we can obtain a new graph $G'$ by adding edges among all nontrivial connected components to get a larger nontrivial connected component. By Lemma 2.3, we have $\mu (G)>\mu (G')$ , which gives a contradiction with our choice. So in what follows, we proceed by considering the two possible cases.

Case 1. There is just one nontrivial connected component, say $G_1$ , in $G-S$ .

In this case, $|V(G_1)|=n_1\geqslant 2$ . If $i\geqslant s+2$ , we construct a new graph $H_1$ obtained from G by joining each vertex of $G_1$ with one vertex in $I(G-S)$ by an edge. Clearly, $i(H_1-S)=i-1\geqslant s+1$ . By Lemma 2.5, $H_1$ also has no fractional perfect matching. In view of Lemma 2.3, $\mu (G)>\mu (H_1)$ , which is a contradiction to our choice.

Now, we assume $i=s+1$ . Then, $n=n_1+2s+1$ . We compare the distance spectral radius of G with that of $F_n$ , where $F_n=K_1\vee (K_{n-3}\cup 2K_1)$ and $\mu (F_n)=\zeta _3(n)$ (see Theorem 4.3 below). According to the partition $V(G)=S\cup V(G_1)\cup I(G-S)$ , the quotient matrix of $D(G)$ equals

$$ \begin{align*} M_1= \left( \begin{array}{@{}ccc@{}} s-1 & n-2s-1 & s+1\\ s & n-2s-2 & 2s+2\\ s & 2n-4s-2 & 2s\\ \end{array} \right) \end{align*} $$

and the characteristic polynomial of $M_1$ is

$$ \begin{align*} \Phi_{M_1}(x)&=x^3-(n+s-3)x^2-(2sn-5s^2+5n-6s-6)x+ns^2\\&\quad -2s^3-sn+2s^2-4n+6s+4. \end{align*} $$

Since the partition $V(G)=S\cup V(G_1)\cup I(G-S)$ is equitable, by Lemma 2.2, the largest root, say $\sigma _1$ , of $\Phi _{M_1}(x)=0$ equals the distance spectral radius of G. Let

$$ \begin{align*} g_1(x)=\Phi_{M_1}(x)-\tilde{h}(x)=(s-1)[-x^2+(-2n+5s+11)x+ns-2s^2+6]. \end{align*} $$

If $s=1$ , then $\Phi _{M_1}(x)=\tilde {h}(x)$ and $\sigma _1=\zeta _3$ . We aim to show $g_1(\zeta _3)<0$ when $s\geqslant 2$ .

For $s\geqslant 2$ , we get $n=n_1+2s+1\geqslant 2s+3\geqslant 7$ . By Lemma 2.4,

$$ \begin{align*} \zeta_3=\mu(F_n)\geqslant\frac{2W(F_n)}{n}=\frac{n^2+3n-10}{n}=n+3-\frac{10}{n}> n+\frac{3}{2}. \end{align*} $$

Let $h_1(x)=-x^2+(-2n+5s+11)x+ns-2s^2+6$ be a real function in x, where $x\in [n+\tfrac 32,+\infty )$ . By a direct calculation, $h_1'(x)=-2x-2n+5s+11$ and $h_1"(x)=-2<0$ . Hence, $h_1'(x)$ is a decreasing function. Consequently, ${h_1'(x)\leqslant h_1'(n+\tfrac 32)=-4n+8+5s.}$ Note that $n\geqslant 2s+3$ . Thus, $h_1'(x)\leqslant -3s-4<0$ . That is to say, $h_1(x)$ is a decreasing function on $x\in [n+\tfrac 32,+\infty )$ , and so

$$ \begin{align*} h_1(\zeta_3)< h_1(n+\tfrac{3}{2})=-3n^2+(6s+5)n-2s^2+\tfrac{15}{2}s+\tfrac{81}{4}. \end{align*} $$

Let $h_2(x)=-3x^2+(6s+5)x-2s^2+{15}/{2}s+{81}/{4}$ be a real function in x, where $x\in [2s+3,+\infty )$ . Then, $h_2(x)$ is monotonically decreasing for $x\geqslant 2s+3$ and

$$ \begin{align*}h_2(n)\leqslant h_2(2s+3)=-2s^2-\frac{1}{2}s+\frac{33}{4}=-2\bigg(s-\frac{\sqrt{265}-1}{8}\bigg)\bigg(s+\frac{\sqrt{265}+1}{8}\bigg)<0\end{align*} $$

for $s\geqslant 2$ . Therefore, $g_1(\zeta _3)<0$ for $s\geqslant 2$ . Then, $\mu (G)=\sigma _1\geqslant \zeta _3$ for $n\geqslant 5$ , giving a contradiction for $n=10$ or $n\geqslant 12$ .

For $n=5,7,9,11$ , we only need to compare $\zeta _3$ with $\zeta _1$ by the proof above. Let $g_2(x)=\tilde {h}(x)-xh(x)$ . Then,

$$ \begin{align*} g_2(x) =&\frac{1}{2}(n-1)x^2-\bigg(\frac{n^2}{4}+5n-\frac{61}{4}\bigg)x-4n+10. \end{align*} $$

By a direct calculation, $\zeta _1=\tfrac 14(3n-5+\sqrt {(5n-3)(n+1)})$ . Thus,

$$ \begin{align*} g_2(\zeta_1)&=\frac{n-3}{8}[n\sqrt{(5n-3)(n+1)}+2n^2-11\sqrt{(5n-3)(n+1)}-32n+26]\\ &=\frac{n-3}{8}[(n-11)\sqrt{(5n-3)(n+1)}+(2n^2-32n+26)]\\ &=\frac{n-3}{8}[(n-11)\sqrt{(5n-3)(n+1)}+2(n-8-\sqrt{51})(n-8+\sqrt{51})]. \end{align*} $$

Since $5\leqslant n\leqslant 11$ , we get $g_2(\zeta _1)<0$ . Then, $\zeta _3>\zeta _1$ , and so $\mu (G)>\zeta _1$ , which is a contradiction.

Similarly, for $n=6,8$ , it suffices to compare $\zeta _3$ with $\zeta _2$ . By a direct calculation, we have $\zeta _2(6)\thickapprox 7.2749<7.5546\thickapprox \zeta _3(6)$ and $\zeta _2(8)\thickapprox 9.8990<10.0839\thickapprox \zeta _3(8)$ . Then, $\mu (G)>\zeta _2$ , which is a contradiction.

Case 2. There does not exist any nontrivial connected component in $G-S$ .

If $i\geqslant s+3$ , we can construct a new graph $H_2$ by adding an edge in $I(G-S)$ . Then, $i(H_2-S)\geqslant s+1$ and $H_2-S$ has one nontrivial connected component. Together with Lemma 2.3 and Case 1, we obtain a contradiction. Thus, it suffices to consider $i=s+1$ and $i=s+2$ .

For $i=s+1$ , the quotient matrix of $D(G)$ for the partition $V(G)=S\cup I(G-S)$ is

$$ \begin{align*} M_2= \bigg( \begin{array}{@{}ccc} s-1 & s+1\\ s & 2s\\ \end{array}\!\! \bigg) \end{align*} $$

and the characteristic polynomial of $M_2$ equals $ \Phi _{M_2}(x)=x^2-(3s-1)x+s^2-3s. $ Since the partition $V(G)=S\cup I(G-S)$ is equitable, by Lemma 2.2, the largest root, say $\sigma _2$ , of $\Phi _{M_2}(x)=0$ equals the distance spectral radius of G.

Note that $n=2s+1$ . Then, $\Phi _{M_2}(x)=h(x)$ and $\sigma _2=\zeta _1$ . We can get a contradiction when $n=3,5,7,9,11$ . For $s=6$ ( $n=13$ ), one has ${\mu (G)\kern1.3pt{=}\kern1.3pt\sigma _2\kern1.3pt{\thickapprox}\kern1.3pt 15.8655\kern1.3pt{>}\kern1.3pt15.8393\kern1.3pt{\thickapprox}\kern1.3pt \zeta _3}$ . Next, we consider $s\geqslant 7$ . Note that $n=2s+1\geqslant 15$ . By Lemma 2.4, it follows that $\zeta _3\geqslant n+3-{10}/{n}>n+2=2s+3$ . Let $\bar {g}(x)=x\Phi _{M_2}(x)-\tilde {h}(x)$ . Then,

$$ \begin{align*} \bar{g}(x) =&-sx^2+(s^2+11s-10)x+8s-6. \end{align*} $$

It is easy to check that $\bar {g}(x)$ is a monotonically decreasing function for $x\geqslant 2s+3$ , and so $\bar {g}(\zeta _3)\leqslant \bar {g}(2s+3)=-2s^3+13s^2+12s-36$ .

Let $h_3(x)=-2x^3+13x^2+12x-36$ , where $x\in [7,+\infty )$ . Then, $h^{\prime }_3(x)=-6x^2+26x+12=-6(x-\tfrac 16(13+\sqrt {241}))(x-\tfrac 16(13-\sqrt {241}))<0$ and $\bar {g}(\zeta _3)\leqslant h_3(s)\leqslant h_3(7) =-1<0$ when $s\geqslant 7$ . Thus, $\mu (G)>\zeta _3(n)$ for $n\geqslant 13$ , which is a contradiction.

For $i=s+2$ , the quotient matrix of $D(G)$ for the partition $V(G)=S\cup I(G-S)$ is

$$ \begin{align*} M_3= \bigg( \begin{array}{@{}ccc} s-1 & s+2\\ s & 2s+2\\ \end{array} \!\!\bigg) \end{align*} $$

and the characteristic polynomial of the matrix $M_3$ is $ \Phi _{M_3}(x)=x^2-(3s+1)x+s^2-2s-2. $ Since the partition $V(G)=S\cup I(G-S)$ is equitable, by Lemma 2.2, the largest root, say $\sigma _3$ , of $\Phi _{M_3}(x)$ equals the distance spectral radius of G.

Recall that $n=2s+2$ . It is easy to see that $\Phi _{M_3}(x)=\bar {h}(x)$ and $\sigma _3=\zeta _2$ . Thus, we get a contradiction when $n=4,6,8$ . If $s=4$ , then $n=10$ and $\mu (G)=\sigma _3\thickapprox 12.5208>12.4504\thickapprox \zeta _3(10)$ . Next, we consider $s\geqslant 5$ . Note that $n\geqslant 12$ and $\zeta _3\geqslant n+3-{10}/{n}>n+2=2s+4$ by Lemma 2.4. Let

$$ \begin{align*} \tilde{g}(x)=x\Phi_{M_3}(x)-\tilde{h}(x) =-(s+1)x^2+(s^2+12s-5)x+8s-2. \end{align*} $$

By a direct calculation, $\tilde {g}(x)$ is a monotonically decreasing function for $x\geqslant 2s+4$ and $\tilde {g}(\zeta _3)<\tilde {g}(2s+4)=-2s^3+8s^2+14s-38$ .

Let $h_4(x)=-2x^3+8x^2+14x-38$ be a real function in x, where $x\in [5,+\infty )$ . Then, $h^{\prime }_4(x)=-6s^2+16s+14=-6(x-\tfrac 13(4+\sqrt {37}))(x-\tfrac 13(4-\sqrt {37}))<0$ and $\tilde {g}(\zeta _3)<h_4(s)\leqslant h_4(5)=-18<0$ . Thus, $\mu (G)>\zeta _3(n)$ for $n\geqslant 12$ and $n=10$ , which is a contradiction.

Together, Case 1 and Case 2 complete the proof.

Proof. It is straightforward to check the sizes of graphs $\overline {K_{{(n+1)}/{2}}}\vee K_{{(n-1)}/{2}}$ , $\overline {K_{{(n+2)}/{2}}}\vee K_{{(n-2)}/{2}}$ and $K_1\vee (K_{n-3}\cup 2K_1)$ . However, put $S=V(K_{{(n-1)}/{2}})$ , $V(K_{{(n-2)}/{2}})$ and $V(K_1)$ . By Lemma 2.5, $\overline {K_{{(n+1)}/{2}}}\vee K_{{(n-1)}/{2}}$ , $\overline {K_{{(n+2)}/{2}}}\vee K_{{(n-2)}/{2}}$ and $K_1\vee (K_{n-3}\cup 2K_1)$ ) have no fractional perfect matching.

Proof. Here we only prove item (iv). A similar discussion shows items (i), (ii) and (iii).

According to the partition $V(2K_1)\cup V(K_1)\cup V(K_{n-3})$ , the quotient matrix of $A(K_1\vee (K_{n-3}\cup 2K_1))$ can be written as

$$ \begin{align*} B(K_1\vee(K_{n-3}\cup2K_1))= \left( \begin{array}{@{}cccc} 0 & 1 & 0 \\ 2 & 0 & n-3 \\ 0 & 1 & n-4 \\ \end{array} \right), \end{align*} $$

whose characteristic polynomial is $x^3-(n-4)x^2-(n-1)x+2n-8$ . Since the vertex partition is equitable, the largest root $\xi _2(n)$ of $x^3-(n-4)x^2-(n-1)x+2n-8=0$ is equal to the spectral radius of $K_1\vee (K_{n-3}\cup 2K_1)$ . Let $S=V(K_1)$ . By Lemma 2.5, $K_1\vee (K_{n-3}\cup 2K_1)$ has no fractional perfect matching.

This completes the proof of item (iv).

Proof. Here we only prove item (iii). A similar discussion shows items (i) and (ii).

According to the partition $V(2K_1)\cup V(K_1)\cup V(K_{n-3})$ , the quotient matrix of $D(K_1\vee (K_{n-3}\cup 2K_1))$ can be written as

$$ \begin{align*} B(K_1\vee(K_{n-3}\cup2K_1))= \left( \begin{array}{@{}cccc@{}} 2 & 1 & 2n-6 \\ 2 & 0 & n-3 \\ 4 & 1 & n-4 \\ \end{array} \!\!\right), \end{align*} $$

whose characteristic polynomial is $x^3-(n-2)x^2-(7n-17)x+-4n+10$ . Since the vertex partition is equitable, the largest root $\zeta _3(n)$ of ${x^3\kern1.2pt{-}\kern1.2pt(n\kern1.2pt{-}\kern1.2pt2)x^2\kern1.2pt{-}\kern1.2pt(7n\kern1.2pt{-}\kern1.2pt17)x\kern1.2pt{-}\kern1.2pt4n\kern1.2pt{+}\kern1.2pt10}$ is equal to the spectral radius of $K_1\vee (K_{n-3}\cup 2K_1)$ . Let $S=V(K_1)$ . By Lemma 2.5, $K_1\vee (K_{n-3}\cup 2K_1)$ has no fractional perfect matching.

This completes the proof of item (iii).