Loading...
research article
Algebraic Divisibility Sequences Over Function Fields
In this note we study the existence of primes and of primitive divisors in function field analogues of classical divisibility sequences. Under various hypotheses, we prove that Lucas sequences and elliptic divisibility sequences over function fields defined over number fields contain infinitely many irreducible elements. We also prove that an elliptic divisibility sequence over a function field has only finitely many terms lacking a primitive divisor.
Loading...
Name
EDS-FunFields.pdf
Type
Preprint
Access type
openaccess
Size
413.81 KB
Format
Adobe PDF
Checksum (MD5)
627d5a756c997832a92816017345ed56