Applying Ptolemy's theorem gives us \begin{align*} AP &= EP + \sqrt{3} FP \\ BP &= \sqrt{3} EP + 2 FP \\ CP &= 2 EP + \sqrt{3} FP \\ DP &= \sqrt{3} EP + FP \end{align*}Addition of the above formulas gives $$AP + BP + CP + DP = (3+\sqrt{3}) (EP + FP)$$Hence, the given formula is constant and its value is $\boxed{3+\sqrt{3}}$.