AbstractWe will exhibit certain continued fraction expansions for power series over a finite field, with all the partial quotients of degree one, which are non-quadratic algebraic elements over the field of rational functions
AbstractThe continued fraction expansion for a quartic power series over the finite field F13 was co...
AbstractWe define two finite q-analogs of certain multiple harmonic series with an arbitrary number ...
In this paper we present a method for solving the Diophantine equation, first we find the polynomial...
AbstractAccording to a well-known result of S. N. Bernstein, ex can be approximated uniformly on [−1...
AbstractWe define and describe a class of algebraic continued fractions for power series over a fini...
Quadratic irrationals √D have a periodic representation in terms of continued fractions. In this pap...
AbstractFor an irrational number x and n⩾1, we denote by kn(x) the exact number of partial quotients...
AbstractLet F be a finite field with q=pf elements, where p is a prime. Let N be the number of solut...
AbstractLet A=Fq[t] denote the ring of polynomials over the finite field Fq. We denote by e a certai...
AbstractIn a recent paper by the authors, a bounded version of Göllnitz's (big) partition theorem wa...
AbstractIn a recent paper M. Buck and D. Robbins have given the continued fraction expansion of an a...
AbstractThere is increasing interest inq-series with |q|=1. In analysis of these, all important role...
For each rational number not less than 2, we provide an explicit family of continued fractions of al...
We study unilateral series in a single variable q where its exponent is an unbounded increasing func...
AbstractErdös and Reddy (Adv. Math. 21 (1976) 78) estimated the lower bound in question to be 2.75−1...
AbstractThe continued fraction expansion for a quartic power series over the finite field F13 was co...
AbstractWe define two finite q-analogs of certain multiple harmonic series with an arbitrary number ...
In this paper we present a method for solving the Diophantine equation, first we find the polynomial...
AbstractAccording to a well-known result of S. N. Bernstein, ex can be approximated uniformly on [−1...
AbstractWe define and describe a class of algebraic continued fractions for power series over a fini...
Quadratic irrationals √D have a periodic representation in terms of continued fractions. In this pap...
AbstractFor an irrational number x and n⩾1, we denote by kn(x) the exact number of partial quotients...
AbstractLet F be a finite field with q=pf elements, where p is a prime. Let N be the number of solut...
AbstractLet A=Fq[t] denote the ring of polynomials over the finite field Fq. We denote by e a certai...
AbstractIn a recent paper by the authors, a bounded version of Göllnitz's (big) partition theorem wa...
AbstractIn a recent paper M. Buck and D. Robbins have given the continued fraction expansion of an a...
AbstractThere is increasing interest inq-series with |q|=1. In analysis of these, all important role...
For each rational number not less than 2, we provide an explicit family of continued fractions of al...
We study unilateral series in a single variable q where its exponent is an unbounded increasing func...
AbstractErdös and Reddy (Adv. Math. 21 (1976) 78) estimated the lower bound in question to be 2.75−1...
AbstractThe continued fraction expansion for a quartic power series over the finite field F13 was co...
AbstractWe define two finite q-analogs of certain multiple harmonic series with an arbitrary number ...
In this paper we present a method for solving the Diophantine equation, first we find the polynomial...