Analysis of an SIS epidemic model with treatment

An SIS epidemic model with saturated incidence rate and treatment is considered. According to different recovery rates, we use differential stability theory and qualitative theory to analyze the various kinds of endemic equilibria and disease-free equilibrium. Finally, we get complete configurations of different endemic equilibria and disease-free equilibrium.

Infectious diseases have tremendous influence on human life and will bring huge panic and disaster to mankind once out of control. Every year millions of human beings suffer from or die of various infectious diseases. In order to predict the spreading of infectious diseases, many epidemic models have been proposed and analyzed in recent years (see [1–13]). Some new conditions should be considered into SIS model to extend the results.

Li et al. (see [13]) studied an SIS model with bilinear incidence rate $\beta SI$ and treatment. The model takes into account the medical conditions. The recovery of the infected rate is divided into natural and unnatural recovery rates. Because of the medical conditions, when the number of infected persons reaches a certain amount $I_0$, the unnatural recovery rate will be a fixed value $\delta I_0$. The study of this model should be divided into two cases to discuss with $I\le I_0$ and $I>I_0$. In this paper, we study an SIS model with saturated incidence rate $\frac{\beta SI}{1+\alpha S}$ and treatment, and we extend some recent results.

By a saturated incidence rate $\frac{\beta SI}{1+\alpha S}$, we consider an SIS epidemic model which consists of the susceptible individuals $S(t)$, the infectious individuals $I(t)$ and the total population $N(t)$ at time t:

where $T(I)=\{\begin{array}{ll}\delta I,& \text{if }0\le I\le I_0,\\ k,& \text{if }I\ge I_0\end{array}$ ($k=\delta I_0$) is the rate at which infected individuals are treated; A is the recruitment rate of individuals (including newborns and immigrants) into the susceptible population; $\frac{\beta SI}{1+\alpha S}$ is the nonlinear incidence rate; d is the natural death rate; γ is the rate at which infected individuals are recovered; ε is the disease-related death rate, A, d, γ, δ, ε, α are all positive numbers.

Thus, if $0\le I\le I_0$, model (1.1) implies

If $I>I_0$, model (1.1) implies

Now, we study equilibria of model (1.1). Steady states of model (1.1) satisfy the following equations:

We easily see that model (1.1) has a disease-free equilibrium $P_0(\frac{A}{d},0)$.

If $0<I\le I_0$, it follows from equation (2.1) that

and if $I>I_0$, we get

From two equations of (2.2), we have

By substituting (2.4) into the second equation of (2.2), we obtain the following equations:

Let $R_0=\frac{\beta A}{(d+A\alpha )(d+\epsilon +\gamma +\delta )}$. We study equation (2.5) as follows.

If $\alpha (d+\epsilon +\gamma +\delta )>\beta$, $R_0<1$ holds if and only if

with

So this case need not be considered.

If $\alpha (d+\epsilon +\gamma +\delta )<\beta$, $R_0>1$ holds if and only if

with

Then we get a positive equilibrium $P_{\ast }(S_{\ast },I_{\ast })$ of (1.2), where

Furthermore, if $0<I_{\ast }\le I_0$, $P_{\ast }(S_{\ast },I_{\ast })$ is an endemic equilibrium of model (1.1) when

Define

Therefore model (1.1) has a disease-free equilibrium $P_0(\frac{A}{d},0)$ and has an endemic equilibrium $P_{\ast }(S_{\ast },I_{\ast })$ except the disease-free equilibrium $P_0(\frac{A}{d},0)$ when $1<R_0\le n_0$.

By substituting (2.4) into the second equation of (2.3), we obtain the following equation:

Let $b=(A\alpha +d)(d+\epsilon +\gamma )-\beta A-k\alpha (d+\epsilon )$. We study equation (2.6) as follows.

If $\beta =\alpha (d+\epsilon +\gamma )$, (2.6) has a positive root if $b<0$, then

So this case need not be considered.

If $\beta <\alpha (d+\epsilon +\gamma )$, it follows from (2.6) that

Then

Denoting two roots of (2.7) by $I_1$ and $I_2$, we have

So (2.7) has only one positive root, denote it by $I_1$,

Then $S_1>0$ holds only if

Define

The point $P_1(S_1,I_1)$ satisfies (2.3), then $I_1>I_0$, i.e.,

we have

Then $-b+2(d+\epsilon )[\alpha (d+\epsilon +\gamma )-\beta ]I_0<0$.

And

Define

Then (2.8) holds only if

Then

define

So, if $R_0\le n_3$ and $R_0\le n_1$, $P_1(S_1,I_1)$ is an endemic equilibrium, where

If $\beta >\alpha (d+\epsilon +\gamma )$, it is easy to see that (2.6) has no positive root if $b\ge 0$.

If $b<0$,

Then ${\mathrm{\Delta }}_2\ge 0$ implies $b^2\ge 4k(d+\epsilon )(A\alpha +d)[\beta -\alpha (d+\epsilon +\gamma )]$, we get

or

Define

At the same time, $b<0$ holds if and only if $R_0>1-\frac{\delta (A\alpha +d)+k\alpha (d+\epsilon )}{(A\alpha +d)(d+\epsilon +\delta +\gamma )}$.

Define

Therefore, if $R_0\ge n_5$, we have $b<0$ and ${\mathrm{\Delta }}_2\ge 0$, then (2.6) has two positive roots $I_2$, $I_3$, where

Then $S_i=\frac{1}{d}[A-(d+\epsilon )I_i]>0$ ($i=2,3$) holds only if

Define

It is easy to see that $n_8<n_7$, which implies that (2.6) has two positive equilibrium points $P_2(S_2,I_2)$, $P_3(S_3,I_3)$ if $R_0<n_8$, (2.6) has only one positive equilibrium point $P_2(S_2,I_2)$ if $n_8<R_0<n_7$, (2.6) has no positive equilibrium point if $R_0\ge n_7$.

Now, we consider the conditions for $I_i>I_0$ ($i=2,3$).

Then

Define

Furthermore,

i.e.,

Therefore, if $n_9<R_0<n_3$, $I_2>I_0$ holds.

Similarly, if $I_3>I_0$,

or

we get $R_0\le n_9$ or $R_0>max(n_3,n_9)$.

From the above discussion, we get the following conclusions.

Theorem 2.1 If $R_0<1$, model (1.2) has only one disease-free equilibrium $P_0(\frac{A}{d},0)$; if $R_0>1$, model (1.2) has a unique endemic equilibrium $P_{\ast }(S_{\ast },I_{\ast })$ except the disease-free equilibrium $P_0(\frac{A}{d},0)$; if $1<R_0<n_0$, $P_{\ast }(S_{\ast },I_{\ast })$ is a unique endemic equilibrium of model (1.1).

Theorem 2.2 If $\beta <\alpha (d+\epsilon +\gamma )$, then $P_1(S_1,I_1)$ is a unique endemic equilibrium of model (1.3) if $R_0\le n_1$; $P_1(S_1,I_1)$ is a unique endemic equilibrium of model (1.1) if $R_0\le n_1$ and $R_0\le n_2$.

If $\beta >\alpha (d+\epsilon +\gamma )$, model (1.3) has two positive equilibrium points $P_2(S_2,I_2)$, $P_3(S_3,I_3)$ if $R_0<n_8$; model (1.3) has only one positive equilibrium point $P_2(S_2,I_2)$ if $n_8<R_0<n_7$; model (1.3) has no positive point if $R_0\ge n_7$; $P_2(S_2,I_2)$ is an endemic equilibrium of model (1.1) if $n_9<R_0<n_3$; $P_3(S_3,I_3)$ is an endemic equilibrium of model (1.1) if $R_0<n_9$ or $n_9<R_0<n_3$.

If $\beta =\alpha (d+\epsilon +\gamma )$, model (1.3) has no endemic equilibrium.

Theorem 3.1 The disease-free equilibrium $P_0(\frac{A}{d},0)$ is stable if $R_0<1$ and is a saddle point if $R_0>1$; the endemic equilibrium $P_{\ast }(S_{\ast },I_{\ast })$ is a stable node if it exists; the endemic equilibrium $P_1(S_1,I_1)$ is a stable node if it exists; if the endemic equilibrium points $P_2(S_2,I_2)$, $P_3(S_3,I_3)$ exist, then $P_2(S_2,I_2)$ is a stable node of model (1.1) if $\frac{-b-\sqrt{{\mathrm{\Delta }}_2}}{2(d+\alpha )[\beta -\alpha (d+\alpha +\gamma )]}{D}_1+D_2>0$ and $P_3(S_3,I_3)$ is a stable node of model (1.1) if $\frac{-b+\sqrt{{\mathrm{\Delta }}_2}}{2(d+\alpha )[\beta -\alpha (d+\alpha +\gamma )]}{D}_1+D_2>0$.

Proof The Jacobi matrix of model (1.2) is

then

Thus, $P_0(\frac{A}{d},0)$ is a stable node if $R_0<1$, and is a saddle point if $R_0>1$.

For $P_{\ast }(S_{\ast },I_{\ast })$,

So, $P_{\ast }(S_{\ast },I_{\ast })$ is a stable node if it exists.

The Jacobi matrix of model (1.3) is

Then

If $\beta <\alpha (d+\epsilon +\gamma )$, $P_1(S_1,I_1)$ does not exist, then $detJ(P_1)>0$.

Because

then $P_1(S_1,I_1)$ is a stable node if it exists.

Consider points $P_2(S_2,I_2)$, $P_3(S_3,I_3)$,

If $\beta >\alpha (d+\epsilon +\gamma )$, then $tr(P_2)<0$,

Because $I_2$ satisfies equation (2.6), we get

where

If $\frac{-b-\sqrt{{\mathrm{\Delta }}_2}}{2(d+\alpha )[\beta -\alpha (d+\alpha +\gamma )]}{D}_1+D_2>0$, $detJ(P_2)>0$ holds, then $P_2(S_2,I_2)$ is a stable node if $\beta >\alpha (d+\epsilon +\gamma )$ and $\frac{-b-\sqrt{{\mathrm{\Delta }}_2}}{2(d+\alpha )[\beta -\alpha (d+\alpha +\gamma )]}{D}_1+D_2>0$. Similarly, $P_3(S_3,I_3)$ is a stable node if $\beta >\alpha (d+\epsilon +\gamma )$ and $\frac{-b+\sqrt{{\mathrm{\Delta }}_2}}{2(d+\alpha )[\beta -\alpha (d+\alpha +\gamma )]}{D}_1+D_2>0$. This completes the proof. □

Theorem 3.2 If $\delta <d$, there is no limit cycle of model (1.1).

Proof Consider the Dulac function $D=\frac{1}{I}$. Note that

If $0<I\le I_0$,

If $I>I_0$, because $k=\delta I_0$,

Thus $\frac{\partial (DP)}{\partial S}+\frac{\partial (DQ)}{\partial I}<0$ if $\delta <d$.

Then there is no limit cycle of model (1.1) if $\delta <d$. This completes the proof. □

Theorem 3.3 There is no limit cycle of model (1.1) if $\beta \le \alpha (2d+\epsilon +\gamma )$.

Proof If $I\le I_0$, consider the Dulac function $D=\frac{1}{I}$. Note that

If $I>I_0$,

Thus $\frac{\partial (DP)}{\partial S}+\frac{\partial (DQ)}{\partial I}<0$ if $\beta \le \alpha (2d+\epsilon +\gamma )$.

Then there is no limit cycle of model (1.1) if $\beta \le \alpha (2d+\epsilon +\gamma )$. This completes the proof. □

With different A, d, γ, δ, ε, α, it is easy to test and verify the above results, so numerical simulation is omitted. In this paper, we study an SIS model with saturated incidence rate $\frac{\beta SI}{1+\alpha S}$ and treatment. We get some relatively complex conclusions by stability theory and qualitative theory of differential equations. These conclusions will help policy makers to make decisions.

The research was supported by the Fujian Nature Science Foundation under Grant No. 2014J01008.

Authors and Affiliations

1. College of Mathematics and Computer Science, Fuzhou University, Fuzhou, Fujian, 350002, P.R. China

   Jinghai Wang & Qiaohong Jiang

Corresponding author

Correspondence to Jinghai Wang.

Competing interests

The authors declare that they have no competing interests.

Authors’ contributions

The authors are entirely responsible for this research. The authors read and approved the final manuscript.

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