Let $F$ be a hyperbolic surface of finite type. Suppose $\alpha$ is a simple closed geodesic and $\beta$ is any closed geodesic intersecting $\alpha$. Consider a Fenchel-Nielsen coordinate of the Teichmuller space containing $\alpha.$ Let $l_{x}$ denote the length of a geodesic $x$.
By "Margulis Lemma", there exists $\epsilon$ such that after $l_{\alpha}<\epsilon$, if we decrease $l_{\alpha}$, $l_{\beta}$ will increase exponentially.
Q) What happens to $l_{\beta}, $if we start increasing the length of $l_{\alpha}$?
More precisely, when we just increase $l_{\alpha}$, given any $L_1$ does there exists $L_2$ such that $l_{\beta}<L_2$, whenever $l_{\alpha}>L_1$. If so, can we explicitely find a relation between $L_1$ and $L_2$, i.e. what happens to $l_{\beta}$ in a continuous path in the Teichmüller space along which $l_{\alpha}$ increases.
