The entropy of a black hole is given as $$S \propto k_B \frac{A}{l_P^2}$$ where $k_B$ is Boltzmann's constant, $l_P = \sqrt{G \hbar/c^3}$ is the Planck length and $A$ is the area of the event horizon of a black hole and it must be of this form from dimensional analysis. Hawking showed the constant was $1/4$.
However, is it possible to have a "black line", where the entropy would presumably be of the form $$S \propto k_B \frac{L}{l_P}$$ where $L$ would be the length of the singularity?
(I am aware of the following question and admit my knowledge in these areas are negligible and I am not sure if it is the same question.)
