Weight systems are functions on chord diagrams satisfying Vassiliev's $4$-term relations. They originate in the theory of finite type knot invariants. Recent developments in understanding weight systems arising from Lie algebras are based on extending these weight systems from chord diagrams (which can be interpreted as involutions without fixed points, considered modulo cyclic shifts) to arbitrary permutations (also modulo cyclic shifts). We suggest relations for functions on permutations, which generalize Vassiliev's relations. We show that the $gl$- and $so$- weight systems satisfy these relations. We also analyze certain properties of these weight systems and study realted Hopf algebras of permutations.