I think you are confusing the space in which the hopping matrix acts, which has dimension N where N is the number of atomic sites, which the much bigger Fock space on which the a and a^\dagger ...

The formula to calculate the determinant is given by \sum_{\sigma \in S_n} (-1)^{\sigma} a_{1\sigma(1)} \times \cdots \times a_{n \sigma(n)}, if you want me to explain the whole formula, I can ...

The dot product is a scalar, not a vector, so you are obvious wrong. And then you seem to attach specific meanings to k and j when there are just used as variables in that statement. \underline{\hat{e_k}} ...

Let \tau be a bounded \mathbb{F}-stopping time and F \in \mathcal{F}_{\tau}. We define a new stopping time by setting \varrho(\omega) := \begin{cases} \tau(\omega), & \omega \in F, \\ \infty, &\text{otherwise} \end{cases}. ...

Solution in the case of a_{1i} \neq 0 for all i: Suppose that a_1 is a multiple of a_i for some a_i. This means that \tilde v_1 = \tilde v_i. It follows that b^T \tilde v_1 = b^T \tilde v_i ...

What this actually means is that X(x) = \frac x\delta is to be composed with a function in x, g(x) such that we obtain a function in X, f(X), hence. f(X(x)) = f(\frac x\delta) and \frac {d^2}{dx^2} f(X(x)) = \frac{d^2}{dx^2} f(\frac x\delta) = \frac d{dx} \Big( f'(\frac x\delta) \cdot \underbrace{\frac d{dx} X(x)}_{=\frac1\delta} \Big) \\ = \frac1\delta \frac d{dx} f'(\frac x\delta) = \frac1\delta f''(\frac x\delta) \cdot \underbrace{\frac d{dx} X(x)}_{=\frac1\delta} = \frac1{\delta^2} f''(\frac x\delta) = \frac1{\delta^2} f''(X) ...