We prove that there exist exactly three non-equivalent symplectic semifield spreads of PG(5,q2), for q2>2·38odd, whose associated semifield has center containing Fq . Equivalently, we classify, up to isotopy, commutative semifields of order q6, for q2>2· 38odd, with middle nucleus containing Fq2and center containing Fq
We investigate semifields of order $q^{2n}$, n odd, having left nucleus of order $q^n$, middle and r...
AbstractIn [G. Marino, O. Polverino, R. Trombetti, On Fq-linear sets of PG(3,q3) and semifields, J. ...
A new construction is given of cyclic semifields of orders q2n, n odd, with kernel (left nucleus) Fq...
We prove that there exist exactly three non-equivalent symplectic semifield spreads of PG(5,q2), for...
In this paper we show that starting from a symplectic semifield spread S of PG(5, q), q odd, another...
Let q > 2·34t be even. We prove that the only symplectic semifield spread of PG(5, qt), whose ass...
We prove that there exist exactly three non-equivalent symplectic semifield spreads of PG ( 5 , q2),...
We prove that the only symplectic semifield spreads of PG(5,q^2), q>= 2^14, even, whose associated...
We classify symplectic 4-dimensional semifields over Fq, for q≤ 9 , thereby extending (and confirmin...
We classify symplectic 4-dimensional semifields over Fq, for q≤ 9 , thereby extending (and confirmin...
AbstractCommutative semifields are constructed by using their relationship with symplectic spreads. ...
In [G. Marino, O. Polverino, R. Trombetti, On Fq-linear sets of PG(3,q3) and semifields, J. Combin. ...
In [G. Marino, O. Polverino, R. Trombetti, On Fq-linear sets of PG(3,q3) and semifields, J. Combin. ...
We investigate semifields of order $q^{2n}$, n odd, having left nucleus of order $q^n$, middle and r...
We investigate semifields of order $q^{2n}$, n odd, having left nucleus of order $q^n$, middle and r...
We investigate semifields of order $q^{2n}$, n odd, having left nucleus of order $q^n$, middle and r...
AbstractIn [G. Marino, O. Polverino, R. Trombetti, On Fq-linear sets of PG(3,q3) and semifields, J. ...
A new construction is given of cyclic semifields of orders q2n, n odd, with kernel (left nucleus) Fq...
We prove that there exist exactly three non-equivalent symplectic semifield spreads of PG(5,q2), for...
In this paper we show that starting from a symplectic semifield spread S of PG(5, q), q odd, another...
Let q > 2·34t be even. We prove that the only symplectic semifield spread of PG(5, qt), whose ass...
We prove that there exist exactly three non-equivalent symplectic semifield spreads of PG ( 5 , q2),...
We prove that the only symplectic semifield spreads of PG(5,q^2), q>= 2^14, even, whose associated...
We classify symplectic 4-dimensional semifields over Fq, for q≤ 9 , thereby extending (and confirmin...
We classify symplectic 4-dimensional semifields over Fq, for q≤ 9 , thereby extending (and confirmin...
AbstractCommutative semifields are constructed by using their relationship with symplectic spreads. ...
In [G. Marino, O. Polverino, R. Trombetti, On Fq-linear sets of PG(3,q3) and semifields, J. Combin. ...
In [G. Marino, O. Polverino, R. Trombetti, On Fq-linear sets of PG(3,q3) and semifields, J. Combin. ...
We investigate semifields of order $q^{2n}$, n odd, having left nucleus of order $q^n$, middle and r...
We investigate semifields of order $q^{2n}$, n odd, having left nucleus of order $q^n$, middle and r...
We investigate semifields of order $q^{2n}$, n odd, having left nucleus of order $q^n$, middle and r...
AbstractIn [G. Marino, O. Polverino, R. Trombetti, On Fq-linear sets of PG(3,q3) and semifields, J. ...
A new construction is given of cyclic semifields of orders q2n, n odd, with kernel (left nucleus) Fq...
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