← 2023 Paper 2

UPSC 2023 Maths Optional Paper 2 Q8a — Step-by-Step Solution

15 marks · Section B

Classification and reduction to canonical form · PDEs · asked 8× in 13 yrs · Read the full method →

Question

Reduce the partial differential equation

2zy22zxy+zxzy(1+1x)+zx=0\dfrac{\partial^2 z}{\partial y^2}-\dfrac{\partial^2 z}{\partial x\partial y}+\dfrac{\partial z}{\partial x}-\dfrac{\partial z}{\partial y}\Bigl(1+\dfrac{1}{x}\Bigr)+\dfrac{z}{x}=0

to canonical form.

Technique

Discriminant classification → characteristic equations → coordinate change to (ξ,η)(\xi,\eta) → chain-rule substitution.

Solution

Step 1 — Classify

Write the principal (second-order) part as Azxx+2Bzxy+Czyy=0A\,z_{xx}+2B\,z_{xy}+C\,z_{yy}=0 with

A=0,2B=1    B=12,C=1.A=0,\qquad 2B=-1\;\Longrightarrow\;B=-\tfrac{1}{2},\qquad C=1.

Discriminant B2AC=140=14>0  B^{2}-AC=\tfrac{1}{4}-0=\tfrac{1}{4}>0\;\Longrightarrow hyperbolic.

Step 2 — Characteristic equations

The characteristic ODE is A(dy)22Bdxdy+C(dx)2=0A(dy)^{2}-2B\,dx\,dy+C(dx)^{2}=0:

0(dy)2+dxdy+(dx)2=0    dx(dy+dx)=0.0\cdot(dy)^{2}+dx\,dy+(dx)^{2}=0\;\Longrightarrow\;dx\bigl(dy+dx\bigr)=0.

Two families:

The Jacobian det ⁣(ξxξyηxηy)=det ⁣(1011)=10\det\!\begin{pmatrix}\xi_x&\xi_y\\\eta_x&\eta_y\end{pmatrix}=\det\!\begin{pmatrix}1&0\\1&1\end{pmatrix}=1\ne 0, so this is a valid coordinate change.

Step 3 — Chain-rule derivatives

With ξ=x,η=x+y\xi=x,\,\eta=x+y:

zx=zξ+zη,zy=zη.z_x=z_\xi+z_\eta,\qquad z_y=z_\eta. zxx=zξξ+2zξη+zηη,zxy=zξη+zηη,zyy=zηη.z_{xx}=z_{\xi\xi}+2z_{\xi\eta}+z_{\eta\eta},\quad z_{xy}=z_{\xi\eta}+z_{\eta\eta},\quad z_{yy}=z_{\eta\eta}.

Step 4 — Substitute

zyyzxy=zηη(zξη+zηη)=zξη.z_{yy}-z_{xy}=z_{\eta\eta}-(z_{\xi\eta}+z_{\eta\eta})=-z_{\xi\eta}. zxzy ⁣(1+1x)+zx=(zξ+zη)zη ⁣(1+1ξ)+zξ=zξzηξ+zξ.z_x-z_y\!\left(1+\tfrac{1}{x}\right)+\tfrac{z}{x}=(z_\xi+z_\eta)-z_\eta\!\left(1+\tfrac{1}{\xi}\right)+\tfrac{z}{\xi}=z_\xi-\tfrac{z_\eta}{\xi}+\tfrac{z}{\xi}.

Combining:

zξη+zξzηξ+zξ=0.-z_{\xi\eta}+z_\xi-\tfrac{z_\eta}{\xi}+\tfrac{z}{\xi}=0.

Multiplying by 1-1 and arranging:

Answer

  zξηzξ+zηzξ=0    ξzξηξzξ+zηz=0.  \boxed{\;z_{\xi\eta}-z_\xi+\frac{z_\eta-z}{\xi}=0\;\Longleftrightarrow\;\xi\,z_{\xi\eta}-\xi\,z_\xi+z_\eta-z=0.\;}
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