@techreport{RISC4849,author = {Manuel Kauers and Lily Yen},
title = {{On the length of integers in telescopers for proper hypergeometric terms}},
language = {english},
abstract = {We show that the number of digits in the integers of a creative telescoping
relation of expected minimal order for a bivariate proper hypergeometric term
has essentially cubic growth with the problem size. For telescopers of higher
order but lower degree we obtain a quintic bound. Experiments suggest that
these bounds are tight. As applications of our results, we give an improved
bound on the maximal possible integer root of the leading coefficient of a
telescoper, and the first discussion of the bit complexity of creative
telescoping.},
number = {1311.3720},
year = {2013},
institution = {ArXiv},
length = {20}
}