Add to ORKGEvery symplectic spread of PG(3, q), or equivalently every ovoid of Q(4, q), is shown to give a certain family of permutation polynomials of GF(q) and vice-versa. This leads to an algebraic proof of the existence of the Tits-L¨uneburg spread of W(22h+1) and the Ree-Tits spread of W(32h+1), as well as to a new family of low-degree permutation polynomials over GF(32h+1)
We construct an infinite family of symplectic spreads in spaces of odd rank and characteristic
We construct an infinite family of symplectic spreads in spaces of odd rank and characteristic
If is a finite symplectic translation plane, it is shown that any affine homology group is cyclic a...
Every symplectic spread of PG(3, q), or equivalently every ovoid of Q(4, q), is shown to give a cert...
Every symplectic spread of PG(3, q), or equivalently every ovoid of Q(4, q), is shown to give a cert...
AbstractUsing a class of permutation polynomials of F32h+1 obtained from the Ree–Tits slice symplect...
AbstractA (line) spread in PG(3, q) is any set of q2 + 1 disjoint lines in PG(3, q). The spread S is...
It is shown that any symplectic spread of symplectic dimension 2 corresponding to a flock of a quadr...
We construct an infinite family of symplectic spreads in spaces of odd rank and characteristic
We construct an infinite family of symplectic spreads in spaces of odd rank and characteristic
We construct an infinite family of symplectic spreads in spaces of odd rank and characteristic
We construct an infinite family of symplectic spreads in spaces of odd rank and characteristic
We construct an infinite family of symplectic spreads in spaces of odd rank and characteristic
We construct an infinite family of symplectic spreads in spaces of odd rank and characteristic
If is a finite symplectic translation plane, it is shown that any affine homology group is cyclic a...
We construct an infinite family of symplectic spreads in spaces of odd rank and characteristic
We construct an infinite family of symplectic spreads in spaces of odd rank and characteristic
If is a finite symplectic translation plane, it is shown that any affine homology group is cyclic a...
Every symplectic spread of PG(3, q), or equivalently every ovoid of Q(4, q), is shown to give a cert...
Every symplectic spread of PG(3, q), or equivalently every ovoid of Q(4, q), is shown to give a cert...
AbstractUsing a class of permutation polynomials of F32h+1 obtained from the Ree–Tits slice symplect...
AbstractA (line) spread in PG(3, q) is any set of q2 + 1 disjoint lines in PG(3, q). The spread S is...
It is shown that any symplectic spread of symplectic dimension 2 corresponding to a flock of a quadr...
We construct an infinite family of symplectic spreads in spaces of odd rank and characteristic
We construct an infinite family of symplectic spreads in spaces of odd rank and characteristic
We construct an infinite family of symplectic spreads in spaces of odd rank and characteristic
We construct an infinite family of symplectic spreads in spaces of odd rank and characteristic
We construct an infinite family of symplectic spreads in spaces of odd rank and characteristic
We construct an infinite family of symplectic spreads in spaces of odd rank and characteristic
If is a finite symplectic translation plane, it is shown that any affine homology group is cyclic a...
We construct an infinite family of symplectic spreads in spaces of odd rank and characteristic
We construct an infinite family of symplectic spreads in spaces of odd rank and characteristic
If is a finite symplectic translation plane, it is shown that any affine homology group is cyclic a...