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Partial Differential Equations
Introduction
Partial Differential Equations(PDE) arise when the functions involved ordepend on two or more independent variables. Physical and Engineeringproblems like solid and fluid mechanics, heat transfer, vibrations, electro-magnetic theory and other areas lead to PDE.
Partial Differential Equations are those which involve partialderivatives with respect to two or more independent variables.
E.g.:
∂2u
∂x2+∂2u
∂y2= 0 Two-dimensional Laplace equation ..(1)
∂2u
∂t2= c2
∂2u
∂x2One-dimensional Wave equation ..(2)
∂2u
∂x2+∂2u
∂y2+∂2u
∂z2= 0 Three-dimensional Laplace equation ..(3)
∂u
∂t= c2
∂2u
∂x2One-dimensional heat equation ..(4)
∂z
∂x+∂z
∂y= 1 ..(5)
The ORDER of a PDE is the order of the highest derivatives in theequation.
• NOTE: We restrict our study to PDE’s involving one dependent vari-able z and only two independent variables x and y.
1
Partial Differential Equations
• NOTATIONS:∂z
∂x= p,
∂z
∂y= q,
∂2z
∂x2= r,
∂2z
∂x∂y= s and
∂2z
∂y2= t
Ex. 1 Show that u = sin9t sin(x4) is a solution of a one dimensional wave
equation.
Sol. Here u = sin9t sin(x4).
∂2u
∂t2= c2
∂2u
∂x2.. (1) is one dimensional wave equation.
∂u
∂t=
∂2u
∂t2=
∂u
∂x=
∂2u
∂x2=
Substitute above values in eq. (1), we get
2 Dept. of Mathematics, AITS - Rajkot
Partial Differential Equations
c =
∴ For c = , u = sin9t sin(x4) is a solution of a wave equation.
Ex. 2 Verify that the function u = excosy is the solution of the Laplace
equation∂2u
∂x2+∂2u
∂y2= 0.
Sol.
Dept. of Mathematics, AITS - Rajkot 3
Partial Differential Equations
Ex. 3 Verify that the function u = x3 + 3xt2 is the solution of the wave
equation∂2u
∂t2= c2
∂2u
∂x2for a suitable value of c.
Sol.
4 Dept. of Mathematics, AITS - Rajkot
Partial Differential Equations
Exercise 1.1
Q.1 Verify the following functions are the solutions of the Laplace’s equation∂2u
∂x2+∂2u
∂y2= 0.
(a) u = log(x2 + y2)
(b) u = sinxsinhy
(c) u = tan−1(yx
)Q.2 Verify the following functions are the solutions of the wave equation∂2u
∂t2= c2
∂2u
∂x2for a suitable value of c.
(a) u = x3 + 3xt2
(b) u = cosctsinx
Q.3 Verify the following functions are the solutions of the heat equation∂u
∂t= c2
∂2u
∂x2for a suitable value of c.
(a) u = e−2tcosx
Dept. of Mathematics, AITS - Rajkot 5
Partial Differential Equations
Formation of PDE
Partial Differential equations can be formed either by the elimination of(1) arbitrary constants present in the functional relation present in the rela-tion between the variable(2) arbitrary functions of these variables.
By elimination of arbitrary constants
Consider the function f(x, y, z, a, b) = 0 ..(i)
where a and b are two independent arbitrary constants. To eliminate twoconstants, we require two more equations.
Differentiating eq. (i) partially with respect to x and y in turn, we obtain
∂f
∂x+∂f
∂z
∂z
∂x= 0 ⇒ ∂f
∂x+ p
∂f
∂z= 0 .. (ii)
∂f
∂y+∂f
∂z
∂z
∂y= 0 ⇒ ∂f
∂y+ q
∂f
∂z= 0 .. (iii)
Eliminating a and b from the set of equations (i), (ii) and (iii) , we get aPDE of the first order of the form F (x, y, z, p, q) = 0. .. (iv)
Ex. 1 Eliminate the constants a and b form z = (x+ a)(y + b).
Sol. Given that z = (x+ a)(y + b) ... (1)
Differentiating partially eq. (1) with respect to x and y respectively,we get
∂z
∂x= p = ..(2)
∂z
∂y= q = ..(3)
Eliminating a and b from equation (1), (2) and (3), we get
6 Dept. of Mathematics, AITS - Rajkot
Partial Differential Equations
is the required partial differential equation.
Ex. 2 Find the differential equation of the set of all spheres whose centreslie on the z-axis.Sol. The equation of the spheres with centres on the z-axis is
..(1)
Differentiating partially eq. (1) with respect to x and y respectively,we get
Eliminating arbitrary constant from (2) and (3), we get
is the required partial differential equation.
Dept. of Mathematics, AITS - Rajkot 7
Partial Differential Equations
By elimination of arbitrary functions
Consider a relation between x, y and z of the type φ(u, v) = 0 ..(v)
where u and v are known functions of x, y and z and φ is an arbitraryfunction of u and v.
Differentiating equ. (v) partially with respect to x and y, respectively,we get
∂φ
∂u
(∂u
∂x+∂u
∂zp
)+∂φ
∂v
(∂v
∂x+∂v
∂zp
)= 0 .. (vi)
∂φ
∂u
(∂u
∂y+∂u
∂zq
)+∂φ
∂v
(∂v
∂y+∂v
∂zq
)= 0 .. (vii)
Eliminating∂φ
∂uand
∂φ
∂vfrom the eq. (vi) and (vii), we get the
equations
∂(u, v)
∂(y, z)p +
∂(u, v)
∂(z, x)q =
∂(u, v)
∂(x, y).. (viii)
which is a PDE of the type (iv).
since the power of p and q are both unity it is also linear equation,whereas eq. (iv) need not be linear.
Ex. 1 Eliminate the arbitrary function from the equation
z = xy + f(x2 + y2).
Sol. Let x2 + y2 = u.
∴ z = xy + f(u) .. (1)
differentiating eq. (1) with respect to x and y respectively, we get
8 Dept. of Mathematics, AITS - Rajkot
Partial Differential Equations
p = ..(2)
q = ..(3)
eliminating from (2) and (3), we get
Ex. 2 Eliminate arbitrary function from the equationf(x+ y + z, x2 + y2 + z2) = 0.Sol. Let x+ y + z = u, x2 + y2 + z2 = v then
f(u, v) = 0 .. (1)
Differentiating (1) with respect to x and y, we get
∂f
∂u
(∂u
∂x+∂u
∂zp
)+∂f
∂v
(∂v
∂x+∂v
∂zp
)= 0 .. (2)
∂f
∂u
(∂u
∂y+∂u
∂zq
)+∂f
∂v
(∂v
∂y+∂v
∂zq
)= 0 .. (3)
Now
∂u
∂x=
∂v
∂x=
∂u
∂y=
∂v
∂y=
∂u
∂z=
∂v
∂z=
Dept. of Mathematics, AITS - Rajkot 9
Partial Differential Equations
substituting above values in eq. (2) and (3), we get
eliminating and from above eq. (4) and (5), we get
is the required partial differential equation of the first order.
10 Dept. of Mathematics, AITS - Rajkot
Partial Differential Equations
Exercise 1.2
Q.1 Form the partial differential equation by eliminating the arbitraryconstants from the following:
1. z = (x2 + a)(y2 + b)
2. (x− a)2 + (y − b)2 + z2 = 1
Q.2 Form the partial differential equations by eliminating the arbitraryfunctions from the following:
1. z = f(x2 − y2)
2. z = x+ y + f(xy)
3. f(xy + z2, x+ y + z) = 0
4. f(x2 + y2 + z2, xyz) = 0
Dept. of Mathematics, AITS - Rajkot 11
Partial Differential Equations
Integrals of Partial Differential Equation
• A solution or integral of a partial differential equation is a relationbetween the dependent and the independent variables that satisfiesthe differential equation.
• A solution which contains a number of arbitrary constants equal tothe independent variables, is called a complete integral.
• A solution obtained by giving particular values to the arbitraryconstants in a complete integral is called a particular integral.
• Singular integral
Let F (x, y, z, p, q) = 0 .. (1)
be the partial differential equation whose complete integral is
f(x, y, z, a, b) = 0 .. (2)
eliminating a, b between eq. (2) and∂f
∂a= 0,
∂f
∂b= 0
if it exists, is called a singular integral.
• General Integral
In eq. (2), if we assume b = φ(a), then (2) becomes
f [x, y, z, a, φ(a)] = 0 .. (3)
differentiating (2) partially with respect to a,
∂f
∂a+∂f
∂bφ′(a) = 0 .. (4)
eliminating a between theses two equations (3) and (4), if it exists, iscalled the general integral of eq. (1).
12 Dept. of Mathematics, AITS - Rajkot
Partial Differential Equations
Solutions of PDE by the method of Direct
Integration
This method is applicable to those problems, where direct integration ispossible.
Ex. 1 Solve∂2z
∂x∂y= x3 + y3
Sol. Given that∂
∂x
(∂z
∂y
)= x3 + y3
Integrating w.r.t to keeping constant, we get
∴∂z
∂y=
Now integrating w.r.t. to keeping as constant
∴ z =
Dept. of Mathematics, AITS - Rajkot 13
Partial Differential Equations
Ex. 2 Solve∂2u
∂x∂t= e−tcosx
Sol. Given that∂
∂x
(∂u
∂t
)= e−tcosx
Integrating w.r.t to keeping constant, we get
Now integrating w.r.t. to keeping as constant
14 Dept. of Mathematics, AITS - Rajkot
Partial Differential Equations
Ex. 3 Solve∂3z
∂x2∂y= cos(2x+ 3y)
Sol. Given that∂2
∂x2
(∂z
∂y
)= cos(2x+ 3y)
Integrating w.r.t to keeping constant, we get
∴∂
∂x
(∂z
∂y
)=
Integrating w.r.t. to keeping as constant
Finally integrating w.r.t. to keeping as constant
Dept. of Mathematics, AITS - Rajkot 15
Partial Differential Equations
Lagrange’s Equation
We have∂(u, v)
∂(y, z)p+
∂(u, v)
∂(z, x)q =
∂(u, v)
∂(x, y)This can be expressed in the form Pp+Qq = R, where P, Q and R arefunctions of x, y and z. This partial differential equation is known asLagrange’s equation.
Method to solve Pp+Qq = R
In order to solve the equation Pp+Qq = R
1 Form the subsidiary (auxiliary ) equation
dx
P=dy
Q=dz
R
2 Solve these subsidiary equations by the method of grouping or by themethod of multiples or both to get two independent solutions u = c1and v = c2.
3 Then φ(u, v) = 0 or u = f(v) or v = f(u) is the general solution ofthe equation Pp+Qq = R.
Ex. 1 Solvey2z
x
∂z
∂x+ xz
∂z
∂y= y2.
Sol. The given equation can be written as ( in for of p and q)
y2zp+ x2zq = xy2
comparing with Pp+Qq = R, we get
P = , Q = and R =
The subsidiary equations are
dx
P=dy
Q=dz
R
Taking first two, we have
16 Dept. of Mathematics, AITS - Rajkot
Partial Differential Equations
Now taking first and third, we have
Ex. 2 Find the general solution of the differential equationx2p+ y2q = (x+ y)zSol. Comparing with Pp+Qq = R, we get
P = , Q = and R =
The subsidiary equations are
dx
P=dy
Q=dz
R
Dept. of Mathematics, AITS - Rajkot 17
Partial Differential Equations
Taking first two, we have
Ex. 3 Solve (y + z)p+ (z + x)q = x+ y
Ex. 4 Solve pz − qz = z2 + (x+ y)2
Ex. 5 Solve x2(y − z)p+ y2(z − x) = z2(x− y)
Ex. 6 Solve (z2 − 2yz − y2)p+ (xy + zx)q = xy − zx
Exercise
1. xp+ yq = z
2. xp− yq = xy
3. (1− x)p+ (2− y)q = 3− z
4. zxp− zyq = y2 − x2
5. (y − z)p+ (z − x)q = x− y
6. p− 2q = 2x− ey + 1
7. x(y2 − z2)p+ y(z2 − x2)q = z(x2 − y2)
18 Dept. of Mathematics, AITS - Rajkot
Partial Differential Equations
Special type of Nonlinear PDE of the first
order
A PDE which involves first order derivatives p and q with degree more thanone and the products of p and q is called a non-linear PDE of the firstorder.There are four standard forms of these equations.
1. Equations involving only p and q
2. Equations not involving the independent variables
3. Separable equations
4. Clairaut’s form
Standard Form 1. Equations involving only p and q
Such equations are of the form f(p,q)=0
z = ax+ by + c ... (1)
is a solution of the equation f(p, q) = 0
provided f(a, b) = 0 (means put p = a and q = b) ... (2)
solving (2) for b, b = F (a)
Hence the complete integral is z = ax+ F (a)y + c
where a and c are arbitrary constants.
Ex. 1 Solve pq = p+ qSol. Here the give DE involves on p and q (so standard form 1)
The solution is
put p = and q =
therefore,
b =
Dept. of Mathematics, AITS - Rajkot 19
Partial Differential Equations
Hence the complete solution is
Exercise
Solve the following equations
1. pq = 1
2. p = q2
3. p2 + q2 = 4
4. pq + p+ q = 0
20 Dept. of Mathematics, AITS - Rajkot
Partial Differential Equations
Standard Form 2. Equations not involving theindependent variables
Such equations are of the form f(z,p,q)=0
Consider f(z, p, q) = 0 .. (1)
since z is a function of x and y
dz =∂z
∂xdx+
∂z
∂ydy = pdx+ qdy
let q = ap
then eq (1) becomes f(z, p, ap) = 0 .. (2)
solving (2) for p i.e. p = φ(z, a)
∴ dz = φ(z, a) dx + a φ(z, a) dy
∴dz
φ(z, a)= dx+ ady
integrating, we get∫ dz
φ(z, a)= x+ ay + b which is a complete integral.
Ex. 1 Solve: p2z2 + q2 = 1Sol. Given equation involves only p, q and z (standard form 2)
Therefore putting q = ap in given equation, we get
Now dz = pdx+ qdy, substituting above values in this equation andintegrate
Dept. of Mathematics, AITS - Rajkot 21
Partial Differential Equations
Ex. 2 Solve: p(1 + q) = qzEx. 3 Solve: z = p2 + q2
Exercise
1 q(p2z + q2) = 4
2 pq = z2
3 p+ q = z
4 zpq = p+ q
5 z2 = 1 + p2 + q2
22 Dept. of Mathematics, AITS - Rajkot
Partial Differential Equations
Standard Form 3. Separable equations
Such equations are of the form f1(x,p) = f2(y,q)
A first order PDE is seperable if it can be written in the form
f1(x, p) = f2(y, q)
We assume each side equal to an arbitrary constant a.
solving f1(x, p) = a ⇒ p = φ1(x, a)
solving f2(y, q) = a ⇒ q = φ2(y, a)
∴ z =∫φ1(x, a)dx+
∫φ2(y, a)dy which is complete integral
Ex. 1 Solve: p− x2 = q + y2
Sol. Writing equation in the form
p− x2 = q + y2 = a
∴ p = a+ x2 and q = a− y2
Now dz = pdx+ qdy
dz = dx+ dy
Integrating both sides, we get
z =
Ex. 2 Solve: p2 + q2 = x2 + y2
Sol. Writing equation in the form
p2 − x2 = y2 − q2
Let p2 − x2 = a and y2 − q2 = a
Hence, p2 = x2 + a, q2 = y2 − a
Dept. of Mathematics, AITS - Rajkot 23
Partial Differential Equations
∴ p = and q =
Now dz = pdx+ qdy
dz =
Exercise
1. q − p+ x− y = 0
2. p+ q = x+ y
3. P 2 + q2 = x+ y
4. pq = xy
5. py + qx = pq
6. p+ q = sinx+ siny
24 Dept. of Mathematics, AITS - Rajkot
Partial Differential Equations
Standard Form 4. Clairaut’s form
A first-order PDE is said to be of Clairaut type if it can be written in theform,
z = px+ qy + f(p, q)
substitute p = a and q = b in f(p, q)
The solution of the the equation is z = ax+ by + f(a, b)
Ex. 1 Solve: z = px+ qy +√
1 + p2 + q2
Sol. The complete integral is obtained
z = px+ qy +√
1 + a2 + b2
Ex. 2 Solve: (p+ q)(z − xp− yq) = 1.Sol.
Exercise
Solve the following equations.
1. z = px+ qy + p2q2
2. z = px+ qy + 2√pq
3. z = px+ qy +q
p− p
4. (1− x)p+ (2− y)q = 3− z
5.z
pq=x
q+y
p+√pq
Dept. of Mathematics, AITS - Rajkot 25
Partial Differential Equations
Classification of the PDE of second order
Consider the equation of the second order as
A∂2u
∂x2+B
∂2u
∂x∂y+ C
∂2u
∂2y+ f
{x, y, u,
∂u
∂x,∂u
∂y
}= 0 (1)
where A is positive
Now the equation (1) is
(i) elliptic if B2 − 4AC < 0
(ii) hyperbolic if B2 − 4AC > 0
(iii) parabolic if B2 − 4AC = 0.
Exercise
Classify the following differential equations.
1 2∂2u
∂t2+ 4
∂2u
∂x∂t+ 3
∂2u
∂x2= 0
2 4∂2u
∂t2− 9
∂2u
∂x∂t+ 5
∂2u
∂x2= 0
3∂2u
∂t2+ 4
∂2u
∂x∂t+ 4
∂2u
∂x2= 0
26 Dept. of Mathematics, AITS - Rajkot
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