I think it must be 1+m-p=1 and mp=h^4 solving this we get m=\pm h^2 and p=\pm h^2

You could have negative values for K in your solutions. There are two branches to this DE. If you had a suitable initial condition to the DE then wolfram (I don't have maple) find it, e.g.: ...

There is no difference, because D^{\alpha}(x(t)-x_0)=D^{\alpha}x(t)-D^{\alpha}x_0=D^{\alpha}x(t)

\begin{array}{ll} \text{minimize} & \rm x^T P_1^{-1} x\\ \text{subject to} & \rm x^T P_2^{-1} x = 1\end{array} where \rm P_1, P_2 are symmetric and positive definite. From the symmetry of \rm P_2 ...

If one is familiar with the concepts of sufficiency and completeness, then this problem is not too difficult. Note that f(x; \theta) is the density of a \Gamma(2, \theta) random variable. The ...

Simply note that T^2=I but T\ne I. This gives you the minimal polynomial of T. The characteristic polynomial has the same irreducible factors as the minimal polynomial and degree equal to the ...