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Galois geometry is the theory that deals with substructures living in projective spaces over finite fields, also called Galois fields. This collected work presents current research topics in Galois geometry, and their applications. Presented topics include classical objects, blocking sets and caps in projective spaces, substructures in finite classical polar spaces, the polynomial method in Galois geometry, finite semifields, links between Galois geometry and coding theory, as well as links between Galois geometry and cryptography.
Current Research Topics in Galois Geometry Related Books
Galois geometry is the theory that deals with substructures living in projective spaces over finite fields, also called Galois fields. This collected work prese
Galois geometry is the theory that deals with substructures living in projective spaces over finite fields, also called Galois fields. This collected work prese
This book is the second edition of the third and last volume of a treatise on projective spaces over a finite field, also known as Galois geometries. This volum
This book is based on a course given by the author at Harvard University in the fall semester of 1988. The course focused on the inverse problem of Galois Theor
This volume is an outgrowth of the research project "The Inverse Ga lois Problem and its Application to Number Theory" which was carried out in three academic y
