Title :
Algebraic function fields over finite fields with many rational places
Author :
Garcia, Arnaldo ; Stichtenoth, Menning
Author_Institution :
Inst. de Matematica Pura e Aplicada, Rio de Janeiro, Brazil
fDate :
11/1/1995 12:00:00 AM
Abstract :
Algebraic function fields (or equivalently, algebraic curves) provide a useful tool for coding theory (for instance, algebraic-geometric codes and trace codes), but also for other branches of information theory. In these applications, the number of rational places of a function field plays a crucial role. One is particularly interested in function fields having a large number of rational places. After a short introduction into the mathematical theory of algebraic functions, the paper gives a survey of old and new results on the number of rational places of function fields
Keywords :
BCH codes; Goppa codes; algebraic geometric codes; dual codes; reviews; sequential codes; AG codes; BCH code duals; algebraic function fields; algebraic functions; algebraic-geometric codes; coding theory; finite fields; geometric Goppa codes; information theory; m-sequences; mathematical theory; rational places; trace codes; Binary codes; Erbium; Galois fields; Geometry; Information theory; Linear code; Mathematics; Polynomials; Writing;
Journal_Title :
Information Theory, IEEE Transactions on
