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Problems on Structure of Finite Quasifields and Projective Translation PlanesIt is well-known that the constructions and classification of non-Desarguesian projective planes
Dihedral Group of Order 8 in an Autotopism Group of a Semifield Projective Plane of Odd Order-Desarguesian semifield projective plane of a finite order is solvable (the question 11.76 in Kourovka
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Linear Autotopism Subgroups of Semifield Projective Planes-Desarguesian semifield projective plane of a finite order is solvable (the question 11.76 in Kourovka
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Некоторые результаты об изоморфизмах конечных полуполевых плоскостейThe authors extend an approach to construct and classify the semifield projective planes using
On automorphisms of semifields and semifield planesOn automorphisms of semifields and semifield planes
A Semifield Plane of Odd Order Admitting an Autotopism Subgroup Isomorphic to A5A Semifield Plane of Odd Order Admitting an Autotopism Subgroup Isomorphic to A5
On alternating subgroup A5 in autotopism group of finite semifield planeOn alternating subgroup A5 in autotopism group of finite semifield plane
Semifield Planes Admitting the Quaternion Group Q 8Semifield Planes Admitting the Quaternion Group Q 8
Minimal Polynomials in Finite Semifields semi-
fields. A proper finite semifield has non-associative multiplication, that leads to a number
Semifield planes of odd order that admit a subgroup of autotopisms isomorphic to A 4We develop an approach to constructing and classification of semifield projective planes with the use
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