Why is the SI unit of Magnetic Pole Strength Ampere-meter?

I never came across this quantity, but I read that one can derive the units of pole strength by assuming that the magnetic force to have a form similar to Coulomb's Law: begin{equation} F = frac{mu_0}{4pi}frac{m_1 m_2}{r^2} end{equation} where $m_1$ and $m_2$ are the magnetic (mono)poles and act as the charges in Coulomb's Law.

As we know that:

• The force $F$ is measured in newton ($mathrm{N}$);
• The permeability $mu_0$ is measured in newton per ampere squared ($mathrm{N} / mathrm{A}^2$);
• The distance $r$ is measured in meters ($mathrm{m}$);

we must have that $m_1$ and $m_2$ have the units of ampere times meter ($mathrm{A}cdotmathrm{m}$) to guarantee the dimensional soundness of the equation. Indeed, from the previous equation begin{equation} [mathrm{N}] = frac{[mathrm{N}]}{[mathrm{A}]^2}frac{[m_1] [m_2]}{[mathrm{m}]^2}quadrightarrowquad [m_1] = [m_1] = [mathrm{A}]cdot[mathrm{m}] end{equation}

PS. recall that the Coulomb's law reads $F = frac{1}{4piepsilon_0}frac{q_1 q_2}{r^2}$.