This question is closely related to the Prouhet-Tarry-Escott problem . The so-called ideal solution to PTE asks for two distinct sets of integers A and B with |A|=|B|=d, such that for all k ...

The given optimization problem can be written in the form \begin{array}{ll} \text{minimize} & | \mathrm a^{\top} \mathrm z - b |\\ \text{subject to} & -s 1_n \leq \mathrm z \leq s 1_n\\ & \mathrm z \in \mathbb Z^n\end{array} ...

The answer is "yes". The following ideas can be found in standard texts. The functional \omega:T\mapsto \langle T\xi,\eta\rangle is normal, so it has a polar decomposition: \omega = v |\omega| ...

You should really use mutlidimensional calculus: Note that \Delta u = \mathrm{trace}(\mathrm{Hess} \, u). Now we define v(x) = u(Ux) for some orthogonal matrix U \in O(n). Then D_xv = (D_{Ux} v) U ...

You have \frac{h(x)}{f(x)}=1+O(\frac{g(x)}{f(x)}). Now note that \lim \frac{g(x)}{f(x)}=0 implies that the reciprocal is also \frac{f(x)}{h(x)}=1+O(\frac{g(x)}{f(x)}), hence \frac{1}{h(x)} = \frac1{f(x)}+O\left(\frac{g(x)}{f^2(x)}\right). ...

When I try to solve the ODE in your Matlab file with the built-in solver ode45, I get a very similar picture. So I think your implementation of RK4 is fine. I don't know what makes you that certain ...