Since you asked for an intuitive way to understand covariance and contravariance, I think this will do. First of all, remember that the reason of having covariant or contravariant tensors is because ...

Assuming a dense system, solving the KKT system gives the solution as \begin{bmatrix} Q & A^*\\A & 0 \end{bmatrix}\begin{bmatrix} \mathbf{x}^\star\\\boldsymbol{\nu}^\star \end{bmatrix} = -\begin{bmatrix} \mathbf{p}\\\mathbf{b} \end{bmatrix} ...

This is in general not true. Consider the ideal (complete intersection) I=(x,y,zt-1)\subset k[x,y,z,t] for any field k. Then I can also be generated by (x, yz, zt-1). It can be shown that ...

We are asked to solve this using Variation of Parameters (VoP), given: \tag 1 y''-3y'+2y=4x+4 Step 1 Find the homogenous solution to (1), so we have: \tag 2 y''-3 y'+ 2 y = 0 This yields: y_h = c_1e^x + c_2 e^{2x} ...

Assume that L is regular and take w = 0^n1^n \in L. By the Pumping Lemma, we can write w = xyz where y \not = \epsilon, |xy| \leq n, and xy^iz \in L for all i \geq 0. Now, because |xy| \leq n ...

The beginning looks fine. However, note that you need one Lagrange multiplier per constraint. Thus you need a vector \lambda. The function to minimize is then \operatorname{tr}(A^T-B^T)(A-B) - \lambda^T (B x -v). ...