\displaystyle \varepsilon H=p(t)\big (q(t+\varepsilon )-q(t)\big )-\varepsilon L and š = ā šæ ā š Ė , where the partial derivative with respect to š Ė\displaystyle \dot q holds q(t + ε) fixed. The inverse Legendre transform is š šæ = š š š Ė ā š š» , \displaystyle \varepsilon L=\varepsilon p\dot ...