On the Helicity conservation for the incompressible Euler equations

In this work we investigate the helicity regularity for weak solutions of the incompressible Euler equations. To prove regularity and conservation of the helicity we will threat the velocity $u$ and its $curl\, u$ as two independent functions and we mainly show that the helicity is a constant of motion assuming $u \in L^{2r}_t(C^\theta_x)$ and $curl \,u \in L^{\kappa}_t(W^{\alpha,1}_x)$ where $r,\kappa $ are conjugate H\"older exponents and $2\theta+\alpha \geq 1$. Using the same techniques we also show that the helicity has a suitable H\"older regularity even in the range where it is not necessarily constant.