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11 Nov 2019
Apply the generalized integral transform method to solve the following system of coupled PDEs 0y1 Ð°Ñ ? B.C I.C If the operator is given by: 0 an solve the vector PDE, L and the eigen value problem, LKn -Kn, finding the components of the kernel, Wn and Dn, and the final solutions for the y1(x, t) and y2(x,t) profiles. Use: (ulv) - u1vx +^u2v2dx to find the inner products in the final inverteod from of the vector solution:
Apply the generalized integral transform method to solve the following system of coupled PDEs 0y1 Ð°Ñ ? B.C I.C If the operator is given by: 0 an solve the vector PDE, L and the eigen value problem, LKn -Kn, finding the components of the kernel, Wn and Dn, and the final solutions for the y1(x, t) and y2(x,t) profiles. Use: (ulv) - u1vx +^u2v2dx to find the inner products in the final inverteod from of the vector solution: