Note that $B$ is the midpoint of arc $\widehat{DF}$ of $\odot(ABC)$, so the incenter of $\triangle DFJ$, $K$, is a point on segment $JB$ such that $BK = BF = BD$. Similarly, $L$ is on segment $JC$ such that $CD = CE = CF$. Also, it can be easily seen that $(J, D; B, C) = -1$ (e.g. by noting that $JM$ and $JD$ is isogonal w.r.t. $\angle BAC$, so $JD$ is a symmedian of $\triangle JBC$). Therefore \[ \frac{KB}{LC} = \frac{DB}{DC} = \frac{JB}{JC} \implies KL \parallel BC. \]

Let $BH\cap AC=Y, CH\cap AB=Z,$ hence $J\in (AYZ)\Rightarrow \triangle JZB\sim \triangle JYC\Rightarrow \dfrac{JB}{JC}=\dfrac{ZB}{YC}=\dfrac{BD}{CD}$ Now note that $BF=BH=BD\Rightarrow \overline{J,L,B}$ and $BL=BD,$ similarly $\overline{J,K,C}$ and $CK=CD$ $\Rightarrow \dfrac{JB}{JC}=\dfrac{BL}{CK}\Rightarrow LK\parallel BC.$