Travelling wave solutions for some time-delayed equations through factorizations

Available online at www.sciencedirect.com Chaos, Solitons and Fractals 38 (2008) 1209–1216 www.elsevier.com/locate/chaos Travelling wave solutions f...

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Chaos, Solitons and Fractals 38 (2008) 1209–1216 www.elsevier.com/locate/chaos

Travelling wave solutions for some time-delayed equations through factorizations E.S. Fahmy King Saud University, Women Students Medical Studies & Sciences Sections, Mathematics Department, P.O. Box 22452, Riyadh 11495, Saudi Arabia Accepted 19 February 2007

Abstract In this work, we use factorization method to ﬁnd explicit particular travelling wave solutions for the following important nonlinear second-order partial diﬀerential equations: The generalized time-delayed Burgers–Huxley, timedelayed convective Fishers, and the generalized time-delayed Burgers–Fisher. Using the particular solutions for these equations we ﬁnd the general solutions, two-parameter solution, as special cases. Ó 2007 Elsevier Ltd. All rights reserved.

1. Introduction A number of nonlinear phenomena in many branches of sciences such as physical [1], chemical, economical [2] and biological processes [3,4] are described by reaction and diﬀusion or by the interaction between convection and diﬀusion. One of the well known partial diﬀerential equations which governs a wide variety of them is Burgers equation which provides the simplest nonlinear model of turbulence [5]. The existence of relaxation time or delay time is an important feature in reaction diﬀusion and convection diﬀusion systems [6–8]. Many methods have been used to ﬁnd exact solutions of nonlinear partial diﬀerential equations, such as the tanh function method [9–13], Jacobi elliptic function method [14], simplest equation method [15], uniﬁed algebraic method [16]. Also, many methods have been used to ﬁnd numerical solutions of nonlinear partial diﬀerential equations, such as the Adomian decomposition method [17,18]. Recently, factorization of second-order linear diﬀerential equations became a well established technique to ﬁnd solutions in an algebraic manner [19–29]. Rosu and Cornejo ﬁnd one particular solution once the nonlinear equation is factorized with the use of two ﬁrst order diﬀerential operators [20]. They use the method for equations of types: u00 þ cu0 þ f ðuÞ ¼ 0;

ð1Þ

u00 þ gðuÞu0 þ f ðuÞ ¼ 0;

ð2Þ

and

E-mail address: [email protected] 0960-0779/$ - see front matter Ó 2007 Elsevier Ltd. All rights reserved. doi:10.1016/j.chaos.2007.02.007

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E.S. Fahmy / Chaos, Solitons and Fractals 38 (2008) 1209–1216

where 0 means the derivative D ¼ dzd , g(u) and f(u) are polynomials in u. We concentrate our work in this paper on equation of the type (2). Now, Eq. (2) can be factorized as ½D u2 ðuÞ½D u1 ðuÞu ¼ 0;

ð3Þ

which leads to the equation du1 0 uu u1 u0 u2 u0 þ u1 u2 u ¼ 0; du

ð4Þ

du1 u u1 þ u2 þ u u0 þ u1 u2 u ¼ 0: du

ð5Þ

u00 or

00

Comparing (5) and (2) we ﬁnd du1 gðuÞ ¼ u1 þ u2 þ u du

and

f ðuÞ ¼ u1 u2 u:

ð6Þ

If Eq. (2) can be factorized as in Eq. (3), then a ﬁrst particular solution can be easily found by solving ½D u1 ðuÞu ¼ 0:

ð7Þ

If u1(u) is a linear function of the dependent variable u, Eq. (7) turns out to be a Riccati equation for this variable and in this case we can ﬁnd the general solution [26].

2. The generalized time-delayed Burger’s Huxley equation The generalized time-delayed Burger’s Huxley equation is given as: df ut ¼ aud ux þ uxx þ f ðuÞ; f ðuÞ ¼ buð1 ud Þðud cÞ; sutt þ 1 s du

ð8Þ

where a; b; c are constants and s is a time-delayed constant. It is clear that when s ¼ 0, Eq. (8) reduces to the generalized Burger’s Huxley equation discussed by Wang et al. in [30]. Using the coordinate transformation z ¼ x ct (c is the propagation speed) in Eq. (8) we obtain the following nonlinear ordinary diﬀerential equation: ð1 c2 sÞu00 þ ½ðc þ csbcÞ þ ða csbðd þ 1Þðc þ 1Þud Þ csbð2d þ 1Þu2d þ buð1 ud Þðud cÞ ¼ 0;

1 c2 s > 0; ð9Þ

or u00 þ gðuÞu0 þ F ðuÞ ¼ 0;

ð10Þ

where gðuÞ ¼

1 ½ðc þ csbcÞ þ ða csbðd þ 1Þðc þ 1Þud Þ csbð2d þ 1Þu2d ; 1 c2 s

ð11Þ

F ðuÞ ¼

b uð1 ud Þðud cÞ: ð1 c2 sÞ

ð12Þ

Using operator notation, Eq. (10) takes the form F ðuÞ D2 þ gðuÞD þ u ¼ 0: u

ð13Þ

The factorization of (13) leads to ½D u2 ðuÞ½D u1 ðuÞu ¼ 0;

ð14Þ

and then

du u00 u2 þ u1 þ 1 u u0 þ u1 u2 u ¼ 0: du

ð15Þ

E.S. Fahmy / Chaos, Solitons and Fractals 38 (2008) 1209–1216

Comparing (15) and (10) we obtain the conditions on u1 and u2 as: du F ðuÞ u2 þ u1 þ 1 u ¼ gðuÞ; u1 u2 ¼ ; du u

1211

ð16Þ

therefore u1 u2 ¼

bð1 ud Þðud cÞ : ð1 c2 sÞ

ð17Þ

Now, we choose u1 and u2 such that sﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ sﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ b 1 b d að1 u Þ; u2 ðuÞ ¼ ðud cÞ: u1 ðuÞ ¼ ð1 c2 sÞ a ð1 c2 sÞ From (18) and (11) we get pﬃﬃﬃ c 1 1 þ a da ud ¼ pﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ ½ðc þ csbcÞ þ ða csbðd þ 1Þðc þ 1Þud Þ csbð2d þ 1Þu2d b a a a ð1 c2 sÞ

ð18Þ

ð19Þ

which implies that a ¼

ða csbðd þ 1Þðc þ 1ÞÞ

qﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ ða csbðd þ 1Þðc þ 1ÞÞ2 þ 4bð1 c2 sÞð1 þ dÞ pﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ 2ð1 þ dÞ bð1 c2 sÞ

then sﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ b að1 ud Þ; u1 ðuÞ ¼ ð1 c2 sÞ

1 u2 ðuÞ ¼ a

sﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ b ðud cÞ; ð1 c2 sÞ

and the corresponding factorization is sﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ sﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ " #" # 1 b b d d ðu ð1 u cÞ D a Þ u ¼ 0; D a ð1 c2 sÞ ð1 c2 sÞ and the compatible ﬁrst order diﬀerential equation is sﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ b 0 ð1 ud Þu ¼ 0: u a ð1 c2 sÞ By direct integration of (22) we get " sﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ #!1d b dðz z0 Þ ; u ðzÞ ¼ 1 exp a ð1 c2 sÞ where z0 is the integration constant. The solution (23) in hyperbolic form is given as: " #!1d pﬃﬃﬃ 1 1 a1 d b þ tanh pﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ ðz z0 Þ ; u ðzÞ ¼ 2 2 2 ð1 c2 sÞ " #!1d pﬃﬃﬃ 1 1 a1 d b coth pﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ ðz z0 Þ : u ðzÞ ¼ 2 2 2 ð1 c2 sÞ Now, if we choose the factorization terms as sﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ sﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ b 1 b d ðu cÞ; u2 ðuÞ ¼ ð1 ud Þ: u1 ðuÞ ¼ b ð1 c2 sÞ b ð1 c2 sÞ and use (26) and (11) we obtain

ð20Þ

ð21Þ

ð22Þ

ð23Þ

ð24Þ

ð25Þ

ð26Þ

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E.S. Fahmy / Chaos, Solitons and Fractals 38 (2008) 1209–1216

pﬃﬃﬃ b

1 1 1 cb þ db þ b ud ¼ pﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ ½ðc þ csbcÞ þ ða csbðd þ 1Þðc þ 1Þud Þ csbð2d þ 1Þu2d : b b ð1 c2 sÞ ð27Þ

Then b ¼

ða csbðd þ 1Þðc þ 1ÞÞ

qﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ ða csbðd þ 1Þðc þ 1ÞÞ2 þ 4bð1 c2 sÞð1 þ dÞ pﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ ; 2ð1 þ dÞ bð1 c2 sÞ

and Eq. (13) is then factorized in the following diﬀerent form sﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ sﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ " #" # 1 b b d d ð1 u ðu Þ D b cÞ u ¼ 0: D b ð1 c2 sÞ ð1 c2 sÞ The corresponding compatible ﬁrst order equation is sﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ b 0 bðud cÞu ¼ 0: u ð1 c2 sÞ

ð28Þ

ð29Þ

Direct integration of Eq. (29) gives a diﬀerent ﬁrst order particular solution of Eq. (8), 11d 0 c B h qﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ iC u ðzÞ ¼ @ A: b 1 exp b ð1c2 sÞdcðz z0 Þ

ð30Þ

Putting s ¼ 0 in (23) and (30) we ﬁnd an exact particular solution for the generalized Burger’s Huxley equation [20]. Following the work of Reyes and Rosu [26], we ﬁnd a two-parameter solution when d ¼ 1. In this case qﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ qﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ u1 ðuÞ ¼ a ð1cb 2 sÞð1 uÞ and u2 ðuÞ ¼ 1a ð1cb 2 sÞðu cÞ, one particular solution is obtained from (23) as: " sﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ #!1 b ðz z0 Þ ; ð31Þ u1 ðzÞ ¼ 1 þ exp a ð1 c2 sÞ and Eq. (22) is transformed to the following Riccati equation sﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ b ð1 uÞu ¼ 0: u0 a ð1 c2 sÞ The two-parameter solution is obtained from (31) and (32) as: h qﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ i1 1 þ exp a ð1cb 2 sÞðz z0 Þ h qﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ ih h qﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ i i: uk ¼ u1 þ exp a ð1cb 2 sÞðz z0 Þ k 1 þ exp a ð1cb 2 sÞðz z0 Þ 1

ð32Þ

ð33Þ

It is clear that when jkj runs from zero to inﬁnity, the above parametric solution goes from the trivial solution u ¼ 0 to the particular solution u ¼ u1 .

3. Time-delayed convective Fisher’s equation The convective Fisher’s equation given in the following form [31]: 1 ut ¼ uxx luux þ uð1 uÞ 2 and the time-delayed convective Fisher equation can be obtained as: df 1 ut ¼ uxx luux þ uð1 uÞ; sutt þ 1 s du 2 where l is a positive parameter that serves to tune the relative strength of convection.

ð34Þ

ð35Þ

E.S. Fahmy / Chaos, Solitons and Fractals 38 (2008) 1209–1216

1213

Using the coordinate transformation z ¼ x ct in Eq. (35) we obtain the following nonlinear ordinary diﬀerential equation u00 þ

2 2 ½cð1 sÞ þ ð2sc lÞuu0 þ uð1 uÞ ¼ 0; ð1 2c2 sÞ ð1 2c2 sÞ

1 > 2c2 s

ð36Þ

or u00 þ gðuÞu0 þ F ðuÞ ¼ 0;

ð37Þ

where gðuÞ ¼

2½cð1 sÞ þ ð2sc lÞu ð1 2c2 sÞ

and

F ðuÞ ¼

2 uð1 uÞ: ð1 2c2 sÞ

ð38Þ

Now, Eq. (37) can be factorized as ½D u2 ðuÞ½D u1 ðuÞu ¼ 0:

ð39Þ

Using operator notation, Eq. (37) takes the form F ðuÞ D2 þ gðuÞD þ u ¼ 0; u

ð40Þ

and then

du u00 u2 þ u1 þ 1 u u0 þ u1 u2 u ¼ 0: du

ð41Þ

Comparing (41) and (37) we obtain the conditions on u1 and u2 as: du F ðuÞ ; u2 þ u1 þ 1 u ¼ gðuÞ; u1 u2 ¼ u du

ð42Þ

therefore u1 u2 ¼

2 ð1 uÞ: ð1 2c2 sÞ

Now, choosing u1 and u2 such that sﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ 2 rð1 uÞ and u1 ðuÞ ¼ ð1 2c2 sÞ

ð43Þ

1 u2 ðuÞ ¼ r

sﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ 2 ; ð1 2c2 sÞ

and using (44) and (42) we get sﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ 1 2 ½cð1 sÞ þ ð2sc lÞu; þ r½1 2u ¼ r ð1 2c2 sÞ

r 6¼ 0;

ð44Þ

ð45Þ

hence ð2sc lÞ r ¼ pﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ ; 2ð1 2c2 sÞ

1 2c2 s > 0;

and Eq. (39) is reduced to 2 ð2sc lÞ D D ð1 uÞ u ¼ 0: ð2sc lÞ ð1 2c2 sÞ

ð46Þ

ð47Þ

The compatible ﬁrst order diﬀerential equation is u0

ð2sc lÞ ð1 uÞu ¼ 0: ð1 2c2 sÞ

By direct integration we get 1 ð2sc lÞðz z0 Þ u ¼ 1 exp ð1 2c2 sÞ

ð48Þ

ð49Þ

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E.S. Fahmy / Chaos, Solitons and Fractals 38 (2008) 1209–1216

or in hyperbolic form:

1 1 ð2sc lÞ ðz z Þ ; tanh 0 2 2 2ð1 2c2 sÞ 1 1 ð2sc lÞ ðz z0 Þ : u ðzÞ ¼ coth 2 2 2ð1 2c2 sÞ

uþ ðzÞ ¼

ð50Þ ð51Þ

Putting s ¼ 0 in (23) we ﬁnd an exact particular solution for the convective Fisher equation [20]. Using (48) and (49), a two-parameter solution is obtained as: h i 1 ð2sclÞ ð1 þ exp 2ð12c 2 sÞ ðz z0 Þ Þ h ih h i i: uk ¼ uþ þ ð2sclÞ ð2sclÞ exp 2ð12c k 1 þ exp 2ð12c 1 2 sÞ ðz z0 Þ 2 sÞ ðz z0 Þ

ð52Þ

3.1. The generalized time-delayed Burgers–Fisher equation The generalized Burgers–Fisher equation is given in the following form: ut ¼ uxx pus ux þ quð1 us Þ

ð53Þ

and the generalized time-delayed Burgers–Fisher equation can be obtained as: df sutt þ 1 s ut ¼ uxx pus ux þ f ðuÞ; f ðuÞ ¼ quð1 us Þ; du

ð54Þ

where s, p, q are any real numbers and s 2 N. Eq. (54) is an extended form of the generalized Burger’s Fisher equation (53). When q ¼ 0, Eq. (54) is reduced to the time-delayed Burger’s Fisher equation [6]. Using the coordinate transformation z ¼ x ct in Eq. (54), we get ð1 c2 sÞu00 þ ½cðð1 qsÞ þ qsðs þ 1ÞÞus pus u0 þ f ðuÞ ¼ 0;

1 > c2 s;

ð55Þ

or u00 þ gðuÞu0 þ F ðuÞ ¼ 0;

ð56Þ

where gðuÞ ¼

cð1 qsÞ ½qsðs þ 1Þ p s þ u ð1 c2 sÞ ð1 c2 sÞ

and

F ðuÞ ¼

q uð1 us Þ: ð1 c2 sÞ

ð57Þ

Now, Eq. (56) can be factorized as ½D u2 ðuÞ½D u1 ðuÞu ¼ 0;

ð58Þ

where u1 ðuÞ ¼ a1

rﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ q ð1 us Þ and ð1 c2 sÞ

u2 ðuÞ ¼

1 a1

rﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ q ; ð1 c2 sÞ

a1 6¼ 0;

and using (59) and (56) we get rﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ q 1 cð1 qsÞ ½qsðs þ 1Þ p s s þ u; ¼ þ a ðs þ 1Þu 1 ð1 c2 sÞ a1 ð1 c2 sÞ ð1 c2 sÞ

ð59Þ

ð60Þ

and hence a1 ¼

½qsðs þ 1Þ p pﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ : ðs þ 1Þ qð1 c2 sÞ

Using Eq. (61), Eq. (58) reduced to qðs þ 1Þ ½qsðs þ 1Þ pð1 us Þ D u ¼ 0: D qsðs þ 1Þ p ðs þ 1Þð1 c2 sÞ The compatible ﬁrst order diﬀerential equation is

ð61Þ

ð62Þ

E.S. Fahmy / Chaos, Solitons and Fractals 38 (2008) 1209–1216

u0

½qsðs þ 1Þ p ð1 us Þu ¼ 0: ðs þ 1Þð1 c2 sÞ

1215

ð63Þ

By direct integration we get 1s ½qsðs þ 1Þ ps Þ ; ðz z u ¼ 1 exp 0 ðs þ 1Þð1 c2 sÞ

ð64Þ

or uþ ðzÞ ¼

1s 1 1 ½qsðs þ 1Þ ps tanh ðz z Þ ; 0 2 2 ðs þ 1Þð1 c2 sÞ 0 2 311s

B1 1 6 ½qsðs þ 1Þ ps 7C qﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃﬃ ðz z0 Þ5A : u ðzÞ ¼ @ coth 4 2 2 2 2 ðs þ 1Þ ð1 c sÞ

ð65Þ

ð66Þ

Following the work of Reyes and Rosu [26,27], we ﬁnd a two-parameter solution for the special case when s ¼ 1. In 2

2ð1c sÞ 2qsp this case u1 ðuÞ ¼ 2ð1c 2 sÞð1 uÞ and u2 ðuÞ ¼ 2qsp , one particular solution is obtained from (64) as

u1 ðzÞ ¼ ð1 þ exp½hðz z0 ÞÞ1

ð67Þ

and Eq. (63) is transformed to the following Riccati equation u0

2qs p ð1 uÞu ¼ 0: 2ð1 c2 sÞ

The two-parameter solution is obtained from (67) and (68) as: h i 1 2qsp ð1 þ exp 2ð1c 2 sÞ ðz z0 Þ Þ h i h i ul ðzÞ ¼ u1 þ : 2qsp 2qsp exp 2ð1c 1 2 sÞ ðz z0 Þ ½k 1 þ exp 2ð1c2 sÞ ðz z0 Þ

ð68Þ

ð69Þ

4. Conclusions In this paper, the eﬃcient factorization method that was proposed by Rosu and Cornejo-Pe´erez [20] has been applied to some important time-delayed nonlinear partial diﬀerential equations: Generalized time-delayed Burger’s Huxley equation, time-delayed convective Fisher equation, and generalized time-delayed Burger’s–Fisher. Exact particular solutions have been obtained and a two-parameter solution have been obtained for the time-delayed convective Fisher equation, Generalized time-delayed Burger’s Huxley equation when d ¼ 1, and for the generalized time-delayed Burger’s–Fisher when s ¼ 1.

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Travelling wave solutions for some time-delayed equations through factorizations

Travelling wave solutions for some time-delayed equations through factorizations

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