← 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
∂y2∂2z−∂x∂y∂2z+∂x∂z−∂y∂z(1+x1)+xz=0
to canonical form.
Technique
Discriminant classification → characteristic equations → coordinate change to (ξ,η) → chain-rule substitution.
Solution
Step 1 — Classify
Write the principal (second-order) part as Azxx+2Bzxy+Czyy=0 with
A=0,2B=−1⟹B=−21,C=1.
Discriminant B2−AC=41−0=41>0⟹ hyperbolic.
Step 2 — Characteristic equations
The characteristic ODE is A(dy)2−2Bdxdy+C(dx)2=0:
0⋅(dy)2+dxdy+(dx)2=0⟹dx(dy+dx)=0.
Two families:
- dx=0⇒x=const, so ξ=x;
- dy+dx=0⇒x+y=const, so η=x+y.
The Jacobian det(ξxηxξyηy)=det(1101)=1=0, so this is a valid coordinate change.
Step 3 — Chain-rule derivatives
With ξ=x,η=x+y:
zx=zξ+zη,zy=zη.
zxx=zξξ+2zξη+zηη,zxy=zξη+zηη,zyy=zηη.
Step 4 — Substitute
zyy−zxy=zηη−(zξη+zηη)=−zξη.
zx−zy(1+x1)+xz=(zξ+zη)−zη(1+ξ1)+ξz=zξ−ξzη+ξz.
Combining:
−zξη+zξ−ξzη+ξz=0.
Multiplying by −1 and arranging:
Answer
zξη−zξ+ξzη−z=0⟺ξzξη−ξzξ+zη−z=0.