How to solve a boundary value problem (differential equations) which contains dependent variable values at the boundary??? The equation is like a integro-differential equation.

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(-iy+y'''')=(A+Bx)y'''(0)+(C+Dx)y''(0)
  1. Here A,B,C and D are constants.
  2. y'''(0) are the dependent variable 3rd order derivative at x=0.
  3. Like wise y''(0) is the 2nd oder derivative of y at x=0
  4. BCs y(0)=0, y'(0)=1, y''(1)=0 and y'''(1)=0

Accepted Answer

Torsten
Torsten on 12 Apr 2017
Edited: Torsten on 12 Apr 2017
Try "dsolve" on the problem
(-iy+y'''')=(A+Bx)*C2+(C+Dx)*C1
with boundary conditions
y(0)=0, y'(0)=1, y''(1)=0, y'''(1)=0, y''(0)=C1, y'''(0)=C2.
Best wishes
Torsten.
  7 Comments
Torsten
Torsten on 12 Apr 2017
Since there is no integral involved in the differential equation, I don't see an obvious relation to integro-differential equations. But I might be wrong.
Best wishes
Torsten.
T S Singh
T S Singh on 12 Apr 2017
Sorry I forgot to mention, the y'''(0) and y''(0) term in the differential equation was obtained from an integration expression, and these two terms remained because y'''(1) and y''(1) are zero because of the boundary conditions.

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