. The expression of cyclotomic polynomial Фpq (x) is concerned for a long time. A simple and explicit expression of Фpq (x) in Z[x] has been showed. The form of the factors of Фpq (x) over F2 and the upper, l.... The expression of cyclotomic polynomial Фpq (x) is concerned for a long time. A simple and explicit expression of Фpq (x) in Z[x] has been showed. The form of the factors of Фpq (x) over F2 and the upper, lower bounds of their Hamming weight are provided.展开更多
Borwein and Choi conjectured that a polynomial P(x) with coefficients ±1 of degree N - 1 is cyclotomic iffP(x)=±Φp1(±x)ΦP2(±x^p1)…Φpr(±x^p1p2…pr-1),where N = P1P2 … pτ and the...Borwein and Choi conjectured that a polynomial P(x) with coefficients ±1 of degree N - 1 is cyclotomic iffP(x)=±Φp1(±x)ΦP2(±x^p1)…Φpr(±x^p1p2…pr-1),where N = P1P2 … pτ and the pi are primes, not necessarily distinct. Here Φ(x) := (x^p - 1)/(x - 1) is the p-th cyclotomic polynomial. They also proved the conjecture for N odd or a power of 2. In this paper we introduce a so-called E-transformation, by which we prove the conjecture for a wider variety of cases and present the key as well as a new approach to investigate the coniecture.展开更多
Using the connection between McKay quiver and Loewy matrix, and the properties of characteristic polynomial of Loewy matrix, we give a generalized way to determine the McKay quiver for a finite subgroup of a generaliz...Using the connection between McKay quiver and Loewy matrix, and the properties of characteristic polynomial of Loewy matrix, we give a generalized way to determine the McKay quiver for a finite subgroup of a generalized linear group.展开更多
Let K2 be the Milnor functor and let Фn (x)∈ Q[X] be the n-th cyclotomic polynomial. Let Gn(Q) denote a subset consisting of elements of the form {a, Фn(a)}, where a ∈ Q^* and {, } denotes the Steinberg sym...Let K2 be the Milnor functor and let Фn (x)∈ Q[X] be the n-th cyclotomic polynomial. Let Gn(Q) denote a subset consisting of elements of the form {a, Фn(a)}, where a ∈ Q^* and {, } denotes the Steinberg symbol in K2Q. J. Browkin proved that Gn(Q) is a subgroup of K2Q if n = 1,2, 3, 4 or 6 and conjectured that Gn(Q) is not a group for any other values of n. This conjecture was confirmed for n =2^T 3S or n = p^r, where p ≥ 5 is a prime number such that h(Q(ζp)) is not divisible by p. In this paper we confirm the conjecture for some n, where n is not of the above forms, more precisely, for n = 15, 21,33, 35, 60 or 105.展开更多
Some researchers have proved that Adam's conjecture is wrong. However, under special conditions,it is right. Let Zn be a cyclic group of order n and Cn(S) be the circulant digraph of Zn with respect to S?Zn/{0}. ...Some researchers have proved that Adam's conjecture is wrong. However, under special conditions,it is right. Let Zn be a cyclic group of order n and Cn(S) be the circulant digraph of Zn with respect to S?Zn/{0}. In the literature, some people have used a spectral method to solve the isomorphism for the circulants of prime-power order. In this paper, we also use the spectral method to characterize the circulants of order paqbωc(where p,q and ω are all distinct primes), and to make Adam's conjecture right.展开更多
基金National Natural Science Foundation of China(60673081)the National 863 Plan(2006AA01Z417).
文摘. The expression of cyclotomic polynomial Фpq (x) is concerned for a long time. A simple and explicit expression of Фpq (x) in Z[x] has been showed. The form of the factors of Фpq (x) over F2 and the upper, lower bounds of their Hamming weight are provided.
基金Research partially supported by Program for New Century Excellent Talents in University Grant # NCET-06-0785by SRF for ROCS, SEM
文摘Borwein and Choi conjectured that a polynomial P(x) with coefficients ±1 of degree N - 1 is cyclotomic iffP(x)=±Φp1(±x)ΦP2(±x^p1)…Φpr(±x^p1p2…pr-1),where N = P1P2 … pτ and the pi are primes, not necessarily distinct. Here Φ(x) := (x^p - 1)/(x - 1) is the p-th cyclotomic polynomial. They also proved the conjecture for N odd or a power of 2. In this paper we introduce a so-called E-transformation, by which we prove the conjecture for a wider variety of cases and present the key as well as a new approach to investigate the coniecture.
基金Foundation item:This work is partly supported by NSF(103710036)of Chinakey project(02A024)of provincial Ministry of Foundation of Hunan.
文摘Using the connection between McKay quiver and Loewy matrix, and the properties of characteristic polynomial of Loewy matrix, we give a generalized way to determine the McKay quiver for a finite subgroup of a generalized linear group.
基金This work is supported by SRFDP,the 973 Grant,the National Natural Science Foundation of China 10471118the Jiangsu Natural Science Foundation Bk2002023
文摘Let K2 be the Milnor functor and let Фn (x)∈ Q[X] be the n-th cyclotomic polynomial. Let Gn(Q) denote a subset consisting of elements of the form {a, Фn(a)}, where a ∈ Q^* and {, } denotes the Steinberg symbol in K2Q. J. Browkin proved that Gn(Q) is a subgroup of K2Q if n = 1,2, 3, 4 or 6 and conjectured that Gn(Q) is not a group for any other values of n. This conjecture was confirmed for n =2^T 3S or n = p^r, where p ≥ 5 is a prime number such that h(Q(ζp)) is not divisible by p. In this paper we confirm the conjecture for some n, where n is not of the above forms, more precisely, for n = 15, 21,33, 35, 60 or 105.
基金supported by Start high-level personnel of scientific research funds of Jiangsu Second Normal University(No.918001)NSFC(11171283)
文摘Some researchers have proved that Adam's conjecture is wrong. However, under special conditions,it is right. Let Zn be a cyclic group of order n and Cn(S) be the circulant digraph of Zn with respect to S?Zn/{0}. In the literature, some people have used a spectral method to solve the isomorphism for the circulants of prime-power order. In this paper, we also use the spectral method to characterize the circulants of order paqbωc(where p,q and ω are all distinct primes), and to make Adam's conjecture right.