Applied

[surem]

Can someone please help me to prove the proposition below?

Hilbert´s 16th problem for degree two equations in the plane can be reduced to the problem of finding the maximal number of closed solution of the equation
dp/dQ=A(Q)p³+B(Q)p²+yp, 0<=Q<=2pi

where A and B are polynomials in cosQ and sinQ, A of degree six, B of degree three and y is a constant .

Thanks

 

[Steven G]

Can someone please help me to prove the proposition below?

Hilbert´s 16th problem for degree two equations in the plane can be reduced to the problem of finding the maximal number of closed solution of the equation
dp/dQ=A(Q)p³+B(Q)p²+yp, 0<=Q<=2pi

where A and B are polynomials in cosQ and sinQ, A of degree six, B of degree three and y is a constant .

Thanks

Hi, This is a math help forum. If you need help then please tell us specifically where you are having trouble. Understand that this is not a submit your problem to us and we will solve it for you forum. In the end you will solve the problem!

 

[Deleted member 4993]

Can someone please help me to prove the proposition below?

Hilbert´s 16th problem for degree two equations in the plane can be reduced to the problem of finding the maximal number of closed solution of the equation
dp/dQ=A(Q)p³+B(Q)p²+yp, 0<=Q<=2pi

where A and B are polynomials in cosQ and sinQ, A of degree six, B of degree three and y is a constant .

Thanks

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