OP asks:
What is the sign (+tive/-tive) of the third order central moment of a positive linear combination of log-normal random variables`
Let $Z = a X + b Y$. Then, for any random variables $X$ and $Y$ that are independent, it can be shown that:
$$E[(Z-\mu_Z)^3] = a^3 \mu_3(X) + b^3 \mu_3(Y)$$
where $\mu_3(X) = E[(X-\mu_X)^3]$ denotes the third central moment of $X$ ... and similarly for $\mu_3(Y) $. If a random variable $X$ is Lognormal, then:
$$\mu_3(X) = \left(e^{\sigma ^2}-1\right)^2 \left(e^{\sigma ^2}+2\right) e^{3 \mu +\frac{3 \sigma ^2}{2}}$$
is strictly positive. Thus, if $a$ and $b$ are positive, then $E[(Z-\mu_Z)^3]$ is positive.