Malaria is a vector-borne infectious disease that is widespread in tropical regions, including parts of America, Asia and much of Africa. Humans contract malaria following effective bites of infected Anopheles female mosquitoes during blood feeding. Plasmodium falciparum is the most common cause of malaria mortality in Africa, and the chain of transmission can be broken through the use of insecticide-treated bed nets and anti-malarial drugs, as well as other control strategies.

Malaria accounts for more than 207 million infections and results in over 627,000 deaths globally in 2012 [1] . About 90% of these fatalities occur in Sub-Saharan Africa [1] [2] . Despite intensive social and medical research and numerous programs to combat malaria, the incidence of malaria across the African continent remains high.

In the field of mathematical epidemiology, numerous models have been proposed with the purpose of under- standing various aspects of the disease. The foundation model of Sir Ronald Ross, originally proposed in 1911 [3] and extended by MacDonald in 1957 [4] , serves as the basis for many mathematical investigations into the epidemiology of malaria. A prominent example is the model of Ngwa and Shu [5] , which introduces susceptible (S), exposed (E), and infectious (I) classes for both humans and mosquitoes, plus an additional Immune class (R) for humans. This model is extended in the Ph.D. theses of Chitnis [6] and Zongo [7] (these two theses also provide comprehensive reviews on the state of the art). Chitnis introduces immigration into the host population, which is a significant effect since hosts migrating from a naive region to a region with high endemicity are especially susceptible to infection. Zongo further extends the model by dividing the human population into non- immune and semi-immune sub-populations, which are modeled using (SEIS) and (SEIRS) model types, respectively.

In his thesis, Chitnis espoused the use of insecticide-treated bed nets, coupled with rapid medical treatment of new cases of infection, as the best strategy to combat malaria transmission. In this paper we make further extensions to the model to include the effects of bed-net use on malaria transmission. In particular, we divide the human population into groups that are characterized by the methods they use to protect themselves against the mosquito bites. These assumptions are consistent with the observable situation in many endemic areas, parti- cularly in poor countries. We believe that the current study represents the first systematic model-based analysis of the impact of bed nets on the dynamics of malaria transmission.

Malaria is highly seasonal [8] [9] : the highest endemicity typically occurs during rainy seasons, when mosquito density is high due to high humidity and the presence of standing water where mosquitoes can breed. During this period, even people with immune predisposition to malaria infection are at risk of attaining the critical level of malaria parasites in their bloodstream that could make them fall sick. In our model, we consider conditions characteristic of a rainy season in a region of high malaria endemicity: typically, such conditions last for a period between three to six months. Because of the brevity of the period being considered, we neglect the effects of death, birth and migration of hosts. We also omit exposed and recovered classes for hosts: due to the high density of anopheles mosquitoes during such periods, exposed individuals rapidly become infectious, and the partial immunity of hosts following recovery has negligible effect. Results for more sophisticated models that include exposed and/or recovered state(s) are reserved for forthcoming papers.

The paper is organized as follows. Section 2 describes our model and gives the corresponding system of differential equations. Section 3 establishes the well-posedness of the model by demonstrating invariance of the set of non-negative states, as well as boundedness properties of the solution. The equilibriums of the system are calculated, and a threshold condition for the stability of the disease free equilibrium (DFE) is calculated, which is based on the basic reproduction number. The method used to derive the basic reproduction number is different for the method of the next generation operator of Van Den Driesshe and Watmough [10] currently used in literature. Section 4 analyzes the stability of equilibriums. We prove in Section 4.1 the global asymptotic stability (GAS) of the disease free equilibrium (DFE) when; in Section 4.2 we prove the GAS of the endemic equilibrium (EE) when. Section 5 provides graphs of trajectories corresponding to various parameter sets computed based on data obtained from the literature. Section 6 discusses the significance of our results. Finally, the Appendix contains detailed proofs and computations required by the analysis.

The model assumes an area populated by human hosts and female mosquitoes (disease vectors) under conditions of higher endemicity of malaria. The human and mosquito populations are homogeneously mixed. In the following subsections, we provide a detailed description of the population structure and dynamics of hosts and vectors.

In this section we demonstrate well-posedness of the model by demonstrating invariance of the set of non- negative states, as well as boundedness properties of the solution. We also calculate the equilibriums of the system, whose stability properties will be examined in the following section.

In this section we analyze the stability of the system equilibriums given in Proposition 3.5.

To illustrate results in this work, the system (1) is simulated using parameters value/range in the following Table 3 and Table 4. We assume in all our simulations the initial ratio of fifty vectors for one human, since the model assume an episode of high endemicity of the disease (i.e.). We also assume the birth rate of the vectors slightly higher than the death rate (i.e. the hatching rate of the mosquitoes is); this establish how the consideration in the model can enforce saturation in exponential growth of the population of vectors. Certain coefficients have been assumed (i.e. for the host sub-population: probability of “feed and survive”, probability of “being killed during their questing activities” for mosquitoes). The remaining parameters are collected in the literature. The number of questing/resting steps before the infectious class of mosquitoes (i.e. the) comes from entomological literature [11] where there are well coined number of days for the extrinsic incubation period for vectors depending on the temperature. We have used some data always estimated from [6] [7] ; references relative to data can be found in there. The coefficient of the infectivity of mosquitoes relative to people of the group (i.e.) depends on the protecting strategy used in the group (i.e. since are coefficients modeling the protection strategy in the group is an increasing function). We assume that. With this function values of are in the interval of proposed data for. This assumption is only for simulation purpose, since we have not found data to evaluate this parameter.

Note. Source of the estimation:: [11] .

We also assume different values of coefficients and depend on the protecting strategy. Their values in simulations are taken in the range given in the Table 3 and Table 4 respecting the assumption that less people are bitten, less longer they stay infectious, and less they contribute to the infection of vectors.

We use for simulation Non-standard Finite Difference Scheme (NFDS) instead of classical ordinary differential packages that can be found in various scientific programming environment. The NFDS used is given in the Appendix D. As a matter of fact, the technique involved is designed by R. Anguelov et al. [33] as a numerical companion of [12] , that is well designed for system as ours (i.e. large scale system). Simulation using ode packages takes much time and solutions obtained, compared to those computed using NFDS are really less accurate.

This paper stands as a mathematical contribution in order to evaluate how effective the utilization of bed nets in the fight against malaria in endemic areas can be. We proposed a model of the dynamic of malaria transmission involving a population of vectors and a population of humans as hosts subdivided into several sub-populations depending on the way they usually protect themselves against mosquito bites. Even though the model is made of a generic number of equations that can be high, the model is sufficiently simple to capture what is essential (i.e. how the protecting factors (and) and the probabilities of the transmission from the vectors to hosts

and probabilities of the transmission from host to vectors act on the value of the basic reproduction number, and act also on the level of the endemicity that corresponds to cases where). The level of the endemicity is materialized by how the value of at the endemic equilibrium that is can be small. Even though we do not have its explicit value, we know its upper bound that depends on parameters of the model (see (8)); it depends on the duration of the extrinsic incubation period represented by the; the longer is the extrinsic incubation period the smaller is the upper bound of the. It depends also in a more delicate way on all other parameters since they participate in the computation of the frequencies, and also; this dependence is shown in simulations and presented here in various figures. The smaller is the, the smaller is the value of. It appears also in simulations how the drop down of the endemicity in host sub-populations happen depending on the drop down of the endemicity in the vectors population and subsequently on the

combination of parameters. If the highest proportion of hosts uses insecticide treated bed nets with good protection capability (i.e. if hosts use bed nets treated with insecticide with good repelling and killing capabilities), this acts on the level of the endemicity. As it appears in simulations in scenarios of more than three sub-populations of hosts, even though there are sub-populations that use low level protection, the impact of the high proportion of bed nets users that use well-protecting bed nets on the level of endemicity is obvious. The policy in countries in endemic area is founding the ownership of mosquitoes―treated net and advertising by various media for its large utilization by people. In Cameroon Mosquitoes―treated nets that are freely distributed are called MILDA (i.e. Moustiquaire Imprégnée à Longue Durée d’Action), meaning Bed Nets with long lasting protection against mosquitoes. Even though there is some doubt for its long lasting protective and killing capability, there is no concern regarding hypothetical regain of endemicity of the malaria. There is no

need of changing old one for new one. The long lasting protecting capability of those Bed Nets can be also based on the fact of continuing of sleeping under the protection of a bed net, and the continuation of the policy of the distribution of “MILDA”.

An interesting research topic that can follow this paper is studying the regain of endemicity that can be observed, in certain malaria endemic regions. In the far north region of Cameroon, after the rainy season, months August to November 2013, there have been an increase on the level of endemicity of the malaria that have resulted in many deaths. A naive explanation of this fact can be the stopping of the utilization of bed net protecting measures associated with the profusion of the area by new hatching mosquitoes that happens with seasonal weather changes to dry to rainy and rainy to dry. People that have lost the immunity due to long term protection become totally susceptible and are exposed again.

In simulations, we made a strong focus on scenarios of endemicity (i.e. scenarios with). The study is about regions with high endemicity with the goal to lower the endemicity. Simulations show how combination of factors in the model can help weaken the endemicity. Extended simulations to cases of low values of would have been also good; but this would have substantially increased a lot the number of case studies. A focus is also made on the shows of the asymptotic stability of endemic equilibrium. This is the reason for the consideration of three different initial states for each figure, and the presentation of finishing sections in figures corresponding to choices parameter values related to close to one; for those chosen values, the time to run to the shows of the stability is quite long; the finishing sections were to establish the global stability of equilibrium; the DFE in cases of, and the endemic equilibrium is cases of. For this Non Standard

Finite Difference Scheme (NSFDS) has been used for the effectiveness of the shows. NSFDS is the scheme highly adapted for the integration of system with many equations like our models. Ode packages are less efficient (i.e. much longer processing time, and results with less accuracies).

We have considered the problem of analyzing the model of the utilization of bed net in the fight against malaria. The proposed model takes into account multiple levels of protection with bed net in human population, multiple (questing, resting) steps between the first successful infected blood meal and the infectious state of mosquitoes. This consideration is a modeling of the activity of vectors in the dynamic of the malaria, which has not yet been

considered by modelers of vectors borne diseases. As it appears in the analysis that we addressed, this can be a considerable step in the understanding of the complexity of vector borne diseases. We have obtained the basic reproduction number, whatever is the scale of the system; we have established that the DFE of the model is GAS providing that. This is an improvement of a result always in the literature in [34] , where the condition of the stability of the DFE is not based on the above inequality. We also analyzed the behavior of the model when. In this last case, we establish that there is a unique EE, and we prove that this equilibrium is GAS for our system. We are aware of the fact that this is still far away from the ideal deterministic model on the same subject; as a matter of fact, malaria is one of the principal disasters and one of the first causes of death in

African countries. A more realistic model must take into account parameters of death, birth and migration in human sub-populations, and the account must also be taken for exposed and removed states in human sub- populations. Our work seems non-negligible to us, since the endemicity of malaria happens by episodes, and in different episodes, values of parameters must not be the same. It is also the first time that the activity of vectors is used in the modeling of a vector borne disease.

Herein, one finds definition of terms and notions used throughout the paper; some results, useful in our proof found here and there in the literature are also included; this in order to avoid frequent interruption of the exposition and to make the paper as self-contained as possible. The readers are pleased to refer to the cited reference for the proof of results.

Definition A.1 (Metzler matrix [35] -[37] ). A given real matrix is said to be a Metzler matrix if all its off-diagonal terms are non-negative.

The qualification currently used to such matrix is the “-matrix”; a given square matrix with real coefficients is said to be a Metzler matrix if and only if is an -matrix. The essential property of Metzler matrices used in this paper is the fact that every dynamical system described by ordinary differential equations which Jacobian matrix is a Metzler matrix keeps invariant the positive cone in its space state.

Definition A.2 (Irreducible matrix). A given matrix is said to be an reducible matrix if there exists

a matrix of permutation such that the matrix has the block matrix form

where and are square matrices. The matrix is said to be irreducible otherwise.

Irreducibility of can be checked using the associated directed graphs. The directed graph associated with has vertices with a directed arc from to j if and only if. It is strongly connected if any two distinct vertices are joined by an oriented path. The matrix is irreducible if and only if is strongly connected [17] .

Lemma A.1 (Arithmetic-Geometric Means Inequality[38] ).

Let be positive real numbers. Then

Furthermore, exact equality only occurs if.

An immediate consequence of the Arithmetic-Geometric Means Inequality follows.

Corollary A.1 ([38] ). Let be positive real numbers such that their product is 1. Then

.

Furthermore, exact equality only occurs if.

Theorem A.1 ([12] ). Consider the system (5) defined on a positively invariant set. Assuming

h₁: The system is dissipative on.

h₂: The equilibrium of the sub-system of the system (5) is GAS on the canonical projection of on.

h₃: The matrix is Metzler matrix and irreducible for each.

h₄: There is an upper-bound matrix (in the sense of point wise order) for the set of square ma-

trices with the property that either or if, then for any such

that, we have.

h₅:.

Then, the DFE is GAS for the system (5) in.

Since the system reduced on the infection free sub-variety of , system has a unique equilibrium that is GAS (we recall here that the DFE is as stated in the proposition), we seek for conditions under which the matrix , that is the sub matrix of the Jacobian matrix of the system (2) reduced to the infected sub variety at the DFE is stable. This matrix is a Metzler matrix, so we must seek for conditions, for which the matrix is Metzler stable matrix. We apply the algorithm given in the proposition 3.3 to the matrix ; we have: is Metzler stable matrix if and only if

and are Metzler stable matrix. Since is always a Metzler stable matrix, is Me- tzler stable matrix if and only if

is Metzler stable matrix.

is a matrix that can be decomposed into the following block matrix form:

with , , and is a matrix with each entry of the second row equal to zero, and each entry on the first row equal respectively to

We make another iteration of the algorithm given by the proposition 3.3 above; we have: is Metzler

stable if and only if and are Metzler stable matrices. Since

is always a Metzler stable matrix, we have: is a Metzler stable if and only if

is a Metzler stable matrix.

with

For the last iteration of the algorithm, since is negative coefficient (i.e. a Metzler stable matrix),

We have that the necessary and sufficient condition of the matrix is the unique condition

i.e.

with the expression of given in (13) we have:

this inequality is rewritten as

with the value of given in the proof of the proposition the above is rewritten:

After few algebraic arrangements in the above, we have

Thus the Matrix is Metzler stable if and only if the condition (14) holds.

We recall that and denote the questing and the resting frequencies of mosquitoes respectively.

By biological means, the coefficient in the left of the condition (14) is the basic reproduction number. As a matter of fact, following the description in [6] of different factors that must be taken in account in the expressions of the basic reproduction number, we have the coefficient

that describes the successfulness for mosquitoes of crossing the steps of questing resting without been killed. Mosquitoes which cross those step reach the last exposed compartment, say . So the due time to get

from the susceptible state to the infectious state is . Multiplying this coefficient by

gives the average number of secondary cases of mosquitoes which are infectious from primary infection within the contact with one infectious host of the group. It corresponds to

of [6] . Straightforwardly the average number of secondary cases of host of the group within the contacts with an infectious questing vector is:

.

It comes out as it is usual while dealing with vector born diseases that

represents the average number of secondary cases of infectious vectors (respectively hosts) that are occasioned by one infectious vector (respectively host) introduced in a population of susceptible vectors (respectively hosts). i.e. for the population of vectors and also for the population of hosts. When this number is computed with the technique of the next generation matrix of van den Driessche et al. [10] , it appears usually with a square root; it is so common to find, even if it is not computed with the next generation matrix technique a square root coming from nowhere appearing in the expression at the end on the number. There is a paper of J. Li et al. [39] talking about possible failure of the next generation matrix technique. specially in cases of diseases with three actors or more, like vector borne diseases. We have tried with the technique in [10] with reasonable choice of and and the result was the square root of the here above. □

The purpose of Proposition 3.5 is to determine possible steady states of the system (1).

The disease free equilibrium occur at a state , with components representing non-naive classes equal to zero i.e. with . The characteristic equation of steady state of the system (1) with the constraint is

this is a linear equation which admits the unique solution .

The endemic equilibriums would happen at probable states of the model where at least one of the infected or infectious components is non-zero. Since disease begins with the presence of a questing infectious vectors that successfully transmits disease to a host in one of the host sub-population, we assume that where is the component of corresponding to the infectious questing mosquitoes; scanning equations in the system (1), it comes out the values:

make components of the vector field that describe variations of infected and infectious components of the state of the model vanish.

The value of is obtained by merging equation of and at the equilibrium on the expression of . As a matter of fact, at the endemic equilibrium, we have:

substituting this value in the expression of at the equilibrium gives

and thus,

.

For each , the component of steady state is ruled by the equality: this yields:

.

All components given above assume that there is a feasible non-zero . To determine this component, we use the two expressions of take at this steady state.

The first comes from the equality (second Equation of (1)) we have:

The second comes from the expression of issued from the construction of the model

and the two expressions depends on .

Merging (15) and (16) gives the following equation with as unknown

Setting as the new unknown, and , with the relation:

made by the expression of (7), the expression (17) becomes:

Classically, at this stage, a rational function is derived; the property of the solution is obtained from the function in the numerator of the rational function, using the Descartes criterion that depends on the value of . The Descartes criterion gives the number of probable roots of the function in the numerator, but does not point the scale of the hypothetical roots. In the case in which we are interested here, we need more than the existence of roots of the function in the numerator of the rational function; it is also important to know more about their scale. For this we have thought about some basic knowledge of the elementary mathematics specifically the intermediate value property that is to be used applied on the hall rational function.

Setting

we have that is a rational function, which is thus of class on ; The part of this set that is interesting to us is ; we also have ; obviously, whenever . We have also that , ; and ; The derivative of the function is which is a positive function on ; is thus an increasing function on . Using the intermediate value property of elementary mathematics, it comes out that there are two solutions for Equation (19), with the biologically feasible one in the interval , and the second solution situated at the infinity, that is not biologically feasible. this ends the proof. □

The Non Standard Finite Difference Scheme uses for simulations is:

with; solved in the term give the semi implicit system of difference equations

The time step function corresponding is, with.

The equation above can be written in the short form as

where

.

The matrix may be written in in block matrix form as:

with the two bands diagonal square matrix, where diagonal and sub-diagonal terms are components of the vectors and respectively defined by:

and

and are respectively and matrices given by:

is the matrix with only the last component of the first row equal to , and the other components equal to zero.