On Equation for Initial Values in Theory of the Second Order Ordinary Differential Equations

Abstract

We consider the properties of the second order nonlinear differential equations b''= g(a,b,b') with the function g(a,b,b'=c) satisfying the following nonlinear partial differential equation d2 gccda2-gcdgccda-4dgbcda+ +4gcgbc-3gbgcc+6gbb=0, where: dda=∂∂ a+c ∂∂ b+ g ∂∂ c. Any equation b''=g(a,b,b') with this condition on function g(a,b,b') has the General Integral F(a,b,x,y)=0 shared with General Integral of the second order ODE's y''=f(x,y,y') with condition ∂4 f∂ y'4=0 on function f(x,y,y') or y''+a1(x,y)y'3+3a2(x,y)y'2+3a3(x,y)y'+a4(x,y)=0 with some coefficients ai(x,y).

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