Received 3 April 2016; accepted 15 June 2016; published 20 June 2016
1. Introduction
Diffusion-Reaction (DR) equation has been used to explain many phenomena in nature [1] . On the other hand, DR equation with finite memory transport has played important role in recent years [2] - [6] . The diffusion equation with finite memory have been used to explain the forest fire [7] , population growth models [8] , the effect of legalisation of abortion law on life of women in Italy [9] , diffusion of drugs through skin membrane [10] .
In addition to diffusion, there are many phenomena in nature in which convection velocity term also becomes important [11] - [13] . Convective velocity is a measure of the bias in the system (think of a dye injected into a running stream). The case when convective velocity became time-dependent was studied by Franosch and Nelson [11] . They studied numerically how this time-dependent convection or the so called “wind” affected the population near a hot spot of favorable growth rates (an oasis) surrounded by a less favorable “desert region”. Nonlinear convective velocity term arises in many physical problems including one dimensional turbulence, sound waves in viscous medium, shock waves in viscous medium and so on [14] .
Nonlinear convective flux term arises naturally in the study of chemotaxis equation [15] . While diffusion arises due to random motion of the organism, the movement of certain species can be influenced by the presence of chemoattractant (which can generate the directed movement in the population) [1] . For example, insects, single cell organism, bacteria and animals rely on an acute sense of smell for conveying information between members of the species and the chemicals which are involved in this process are called pheromones. Movement of organism in response to environmental agents (chemical stimulus) is called taxis and movement induced by chemical stimulus is referred to as chemotaxis [1] [15] - [19] . Thus chemically directed movement is called chemotaxis.
For example, the female silk moth Bombyx mori exudes a pheromone, called bombykol, as a sex attractant for the male, which has a remarkably efficient antenna filter to measure the bombykol concentration, and it moves in the direction of increasing concentration. The acute sense of smell of many deep sea fish is particularly important for communication and predation [1] [20] . It is not only in animal and insect ecology that the mechanism of chemotaxis is important. It can equally be crucial in biological processes. For example, when a bacterial infection invades the body it may be attacked by movement of cells towards the source as a result of chemotaxis.
It has been shown that certain species of bacteria and insects can move toward higher concentrations of nutrients [1] . Concentration of the substrate or attractant is governed by the equation [17]
(1)
where is the concentration of the attractant per cell, is the density of the bacteria and is the diffusion constant of the attractant. For most of the practical purpose, is taken as constant and diffusion constant is also neglected [21] . Arguments to justify this approximation are given in Ref [21] . Under this assumption Equation (1) reduces to
(2)
On the other hand concentration of the bacteria is described by the equation [16]
(3)
where the first tern on the right side represent the motion of the bacteria in the absence of chemotaxis. In the
absence of chemical gradient, Equation (3) becomes identical to the diffusion-reaction equation in
the presence of source term. Here motility factor, , takes the place of the diffusion coefficient D. In Equation (3) is taken as function of substrate concentration s. In principle could also vary with bacterial concentration u and space variable x. But the effect of substrate concentration is not known at present [16] . For most of the practical purpose is taken as constant.
The second tern on the right side of Equation (3) describes the chemotactic response of the species. In
Equation (3), is flux of species due to chemotaxis where is a measure of strength of
chemotaxis, and is termed as chemotactic coefficient. The function is also called the chemotactic sensitivity function. In the next section we will discuss memory effect in DR equation.
2. Memory Effect in DR Equation
Memory effect in DR equation arises when dispersal of the particle is not mutually independent [2] - [6] . In particular, note that the solution of the one dimensional diffusion equation (the boundary of the problem is at infinity, i.e.,)
is given by
At, the solution of the equation is Dirac delta function, i.e.,
Thus, at all the particles are sitting at. For, the solution of the equation is non zero for all x. If we take a value of x such that, where c is the speed of light, we see that there is a finite probability, however small, for particles to diffuse at superluminal speeds. The error lies in the diffusion equation itself, which does not recognize any limiting propagation speed. Thus it becomes necessary to include memory effect, which takes care of the finite speed. When memory effect is taken into account then we have the following modification of Fick’s law [2] in the presence of nonlinear convection term
(4)
(5)
where , is the concentration or the density variable depending on the phenomenon under study; v is
the coefficient of nonlinear convective flux term and D is the diffusion coefficient. Here is the time
rate of change of concentration at time t and is the flux at a later time, while is the source term. Here is delay time and its value depends on the system under study [9] [22] [23] . For ex- perimental determination of, see ref. [22] [23] . After simplifying Equations (4) and (5) we get
(6)
Here, and. In particular for and, Equation
(6) reduces to Fisher-Burger equation with finite memory [6]
where. Note that Equation (6) describe a transport phenomenon in which both diffusion and convection processes are of equal importance. After using the transformation in Equation (6), we get
(7)
By taking in Equations (6) and (7) one obtain the corresponding DR equation without finite memory transport
(8)
and
(9)
One can see from above that Equations (6) and (7) are hyperbolic nonlinear DR equation while Equations (8) and (9) are parabolic nonlinear DR equation.
3. Memory Effect in Chemotaxis Equation
In the presence of finite memory, Equation (5) remains unchanged while Equation (4) gets modified to
(10)
Simplifying Equations (5) and (10) one obtains
(11)
In Equation (11) we will take,. Afetr this substitution Equation (11) becomes
(12)
Now using the transformation in Equations (2) and (12) we get
(13)
(14)
For, Equations (12) and (14) becomes
(15)
(16)
From Equation (13) one can see that. Substituting the value of and from Equation (13) into Equation (14) one obtains
(17)
In Equation (7) if we take, then we obtain the following equation
(18)
Now comparing Equations (17) and (18) one can see that and. Under this condition Equations (7) and (17) becomes identical. Note that here v is coefficient of nonlinear convection term and from Equation (17) one can see that this coefficient depends on, G and wave velocity w. Thus, we have mapped the chemotaxis equation to nonlinear diffusion-reaction-convection equation. In this mapping we have assumed
that and hence by measuring, G and w, experimentally, we can find the velue of convective
velocity term v. Similarly, by measuring experimentally, we can determine the diffusion coefficient D.
4. Solutions
For Fisher type reaction term, Equation (17) or (18) takes the form
(19)
where. By taking in Equation (19) one obtain the corresponding nonlinear DR
equation without finite memory transport
(20)
Solutions of Equations (19) and (20) is already obtained by us in ref. [6] . Here we will write the solution of Equation (19) as
(21)
and
(22)
where wave velocity w is given by
(23)
Equation (21) is a solitary wave solution of Equation (19) whereas solution (22) diverges. Since represent the concentration of certain species which cannot go to infinity hence solution (22) is physically not acceptable. On the other hand solutions of Equation (20) is given by
(24)
and
(25)
and wave speed w as
(26)
Equation (24) is again a solitary wave solution of Equation (20) while Equation (25) is physically not acceptable. Now using Equation (13), we have
(27)
where C is constant of integration. Substituting the value of from Equations (21) and (22) in Equation (27), we obtain the following value of of Equation (13) as
(28)
and
(29)
where w is given by Equation (23). Similiarly, substituting the value of from Equations (24) and (25) in Equation (27), we obtain the following value of of Equation (13) as
(30)
and
(31)
where w is given by Equation (26). From Equations (28)-(31) one can see that concentration of attractant increases with G and decreases as wave speed w increases. Also, it is directly proportional to coef- ficient of linear term and inversely proportional to coefficient of nonlinear term.
5. Concluding Remarks
Certain aspects ignored earlier [10] in the studies of the chemotaxis equation involving quadratic nonlinearity are now investigated in this work. We have studied the chemotaxis equation with the source term and finite memory transport in particular. The existence of solitary wave solutions of Equations (19) and (20) is demonstrated explicitly. We have also obtained an exact solutions for concentration. Also, a correspondence between nonlinear Diffusion-Reaction-Convection and chemotaxis equation is established. It is shown that nonlinear DR equation with nonlinear convection term is equivalent to chemotaxis equation. Thus, nonlinear convection terms arise naturally in the study of chemotaxis [10] . Also, from Equation (17) one can see
that coefficient of non-linear convective flux, , decreases as wave speed w increases. Thus, using the
nonlinear Diffusion-Reaction-Convection equation one can find the coefficient of nonlinear convective flux v, of chemotaxis equation.
Although result obtained in this paper is highly simplified, the solutions obtained here can explain such physical phenomena which is governed by chemotaxis equation. The case when and depend on bacteria concentration u and space variable x will be discussed in a separate paper. Such studies are in progress.
Acknowledgements
We would like to thank R. S. Kaushal, Awadhesh Prasad and Ram Ramaswamy for helpful discussion. We would also like to thank Dyal Singh College for providing us the computational facility during the course of this work.
NOTES
*Corresponding author.