You can find the initial value of "p" by putting in the value t=0. That would give you p=6; since e^0=1. You can find the growth rate of any function by differentiating it w.r.t. time. ...

The mistake is that \exp: \mathbb C \to \mathbb C is no longer a bijection. Thus e^{2\pi i} = e^{0} \not\Rightarrow 2\pi i = 0 In general \exp(z) = \exp(z+2\pi i) \qquad \forall\ z\in\mathbb C ...

If \gamma contains the origin, as the function is not holomorphic everywhere inside the contour, you may not invoke the Fundamental Theorem of Calculus and write \oint_\gamma f(z)\,dz\color{red}=F(z_0)-F(z_0)=0 ...

For p < +\infty, you cannot conclude the L^p convergence of the exponentiated sequence. Let's consider X = (0,1], and \mu the Lebesgue measure. Fix p \in [1,+\infty), and let g(x) = x^{-\frac{1}{2p}} ...

The division rate at time t being \lambda(t) means that P(t+\mathrm dt)=P(t)+(\lambda(t)\mathrm dt)P(t). Hence, for every t\geqslant0, P'(t)=\lambda(t)P(t) and P(t)=\mathrm e^{\Lambda(t)}P_0 ...

To make things a little simpler notation-wise, let X also contain a vector of ones (for the intercept). Also, let \theta_1=(\alpha, \beta_0')' and \theta=(\theta_1', \beta_1)' and P_A=A(A'A)^{-1}A' ...