TY - JOUR
T1 - Arithmetic properties of solutions of certain functional equations with transformations represented by matrices including a negative entry
AU - Tanaka, Taka Aki
PY - 2014/6/1
Y1 - 2014/6/1
N2 - Mahler's method gives algebraic independence results for the values of functions of several variables satisfying certain functional equations under the transformations of the variables represented as a kind of the multiplicative action of matrices with integral entries. In the Mahler's method, the entries of those matrices must be nonnegative; however, in the special case stated in this paper, one can admit those matrices to have a negative entry. We show the algebraic independence of the values of certain functions satisfying functional equations under the transformation represented by such matrices, expressing those values as linear combinations of the values of ordinary Mahler functions.
AB - Mahler's method gives algebraic independence results for the values of functions of several variables satisfying certain functional equations under the transformations of the variables represented as a kind of the multiplicative action of matrices with integral entries. In the Mahler's method, the entries of those matrices must be nonnegative; however, in the special case stated in this paper, one can admit those matrices to have a negative entry. We show the algebraic independence of the values of certain functions satisfying functional equations under the transformation represented by such matrices, expressing those values as linear combinations of the values of ordinary Mahler functions.
KW - Algebraic independence
KW - Mahler's method
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U2 - 10.3836/tjm/1406552440
DO - 10.3836/tjm/1406552440
M3 - Article
AN - SCOPUS:84908062929
SN - 0387-3870
VL - 37
SP - 211
EP - 223
JO - Tokyo Journal of Mathematics
JF - Tokyo Journal of Mathematics
IS - 1
ER -