AN INTEGRAL EQUATION IN AEROELASTICITY A. V. BALAKRISHNAN FSRC / UCLA

1. AN INTEGRAL EQUATION IN AEROELASTICITYA. V. BALAKRISHNANFSRC / UCLA MONS, BELGIUM AUGUST 2006

2. POSSIO INTEGRAL EQUATION

3. SPATIAL-FOURIER TRANSFORMBalakrishnan 2002

4. BALAKRISHNAN-LIN 2002

6. TO CONVERT TO VOLTERRA EQUATION

7. SPECIAL CASE k = 0 AIRFOIL EQUATION SOHNGEN SOLUTION: TRICOMI OPERATOR T

8. g(·) ЄLp, 1 < p < 4/3 (Tricomi) FORfЄC1(-b, b) (~ Lipschitz order α, 1/2 < α ≤ 1) g(·)ЄLp(-b, b), 1 < p < 2 ANDg (x) → 0 as x → b- SOLUTION IS UNIQUE WITH THIS LAST CONDITION

9. VOLTERRA EQUATION

10. A(t,x) → 0 as x → b- FOR UNIQUENESS OF SOLUTION

11. M = 0

12. M = 0 LAPLACE TRANSFORM SOLUTION

13. SEARS 1940 : (1+k L(k, h(k)) never vanishes & INVERSE LAPLACE TRANSFORM OF 1/(1+k L(k, h(k)) =

14. M≠ 0LAPLACE TRANSFORM

16.  VOLTERRA

17. Approximation at Infinity

20. Generalization: Non-Zero Angle of Attack TRANSONIC DIP As M→1, this → ∞ for α ≠ 0 → 0 for α = 0

21. Generalization to 2 Dimensions