Let m denote a squarefree number. Let fm(n) denote the number of partitions of n into parts that are relatively prime to m. Let Φm(z) denote the m-th cyclotomic polynomial. We obtain a generating function for fm(n) that involves factors Φm(zn)
AbstractLet p be a prime, pα=ef+1 and suppose that x is a generator of GF(pα). Then the cyclotomic n...
AbstractWe study coefficients of ternary cyclotomic polynomials Φpqr(z)=∏ρ(z−ρ), where p, q, and r a...
. For odd square-free n ? 1, the cyclotomic polynomial \Phi n (x) satisfies an identity \Phi n (x) =...
Let m denote a squarefree number. Let fm(n) denote the number of partitions of n into parts that are...
For odd square-free n ? 1 the cyclotomic polynomial \Phi n (x) satisfies the identity of Gauss 4\Phi...
The factors of polynomials of the form x^n-1, called cyclotomic polynomials, have various properties...
We present several approaches on finding necessary and sufficient conditions on n so that Φk(xn) is ...
Let p(n) denote the number of partitions of the integer n. The first exact formula for p(n) was publ...
A note about the cyclotomic polynomial pg ()and some related results ZHU Feng—xiang QI Wen-feng Abst...
Cyclotomy is the process of dividing a circle into equal parts, which is precisely the effect obtain...
AbstractLet a(n,k) be the kth coefficient of the nth cyclotomic polynomial. In part I it was proved ...
Let q be a prime power and let be a finite field with q elements. This paper discusses the explicit ...
In this paper, we present three results on cyclotomic polynomials. First, we present results about f...
Abstract. For a finite set A of positive integers, we study the partition function pA(n). This funct...
Abstract. We present three algorithms to calculate Φn(z), the nth cyclo-tomic polynomial. The first ...
AbstractLet p be a prime, pα=ef+1 and suppose that x is a generator of GF(pα). Then the cyclotomic n...
AbstractWe study coefficients of ternary cyclotomic polynomials Φpqr(z)=∏ρ(z−ρ), where p, q, and r a...
. For odd square-free n ? 1, the cyclotomic polynomial \Phi n (x) satisfies an identity \Phi n (x) =...
Let m denote a squarefree number. Let fm(n) denote the number of partitions of n into parts that are...
For odd square-free n ? 1 the cyclotomic polynomial \Phi n (x) satisfies the identity of Gauss 4\Phi...
The factors of polynomials of the form x^n-1, called cyclotomic polynomials, have various properties...
We present several approaches on finding necessary and sufficient conditions on n so that Φk(xn) is ...
Let p(n) denote the number of partitions of the integer n. The first exact formula for p(n) was publ...
A note about the cyclotomic polynomial pg ()and some related results ZHU Feng—xiang QI Wen-feng Abst...
Cyclotomy is the process of dividing a circle into equal parts, which is precisely the effect obtain...
AbstractLet a(n,k) be the kth coefficient of the nth cyclotomic polynomial. In part I it was proved ...
Let q be a prime power and let be a finite field with q elements. This paper discusses the explicit ...
In this paper, we present three results on cyclotomic polynomials. First, we present results about f...
Abstract. For a finite set A of positive integers, we study the partition function pA(n). This funct...
Abstract. We present three algorithms to calculate Φn(z), the nth cyclo-tomic polynomial. The first ...
AbstractLet p be a prime, pα=ef+1 and suppose that x is a generator of GF(pα). Then the cyclotomic n...
AbstractWe study coefficients of ternary cyclotomic polynomials Φpqr(z)=∏ρ(z−ρ), where p, q, and r a...
. For odd square-free n ? 1, the cyclotomic polynomial \Phi n (x) satisfies an identity \Phi n (x) =...
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