Let d ≥ 3 be an integer, and set r = 2^d-1 + 1 for 3 ≤ d ≤ 4, r = 17 5~ "2441 for 5 ≤ d ≤ 6, r = d^2+d+1 for 7 ≤ d ≤ 8, and r = d^2+d+2 for d ≥ 9, respectively. Suppose that Фi(x, y) E Z[x, y] (1 ≤...Let d ≥ 3 be an integer, and set r = 2^d-1 + 1 for 3 ≤ d ≤ 4, r = 17 5~ "2441 for 5 ≤ d ≤ 6, r = d^2+d+1 for 7 ≤ d ≤ 8, and r = d^2+d+2 for d ≥ 9, respectively. Suppose that Фi(x, y) E Z[x, y] (1 ≤ i ≤ r) are homogeneous and nondegenerate binary forms of degree d. Suppose further that λ1, λ2,. ..., λr are nonzero real numbers with λ1/λ2 irrational, and λ1λ1(x1, y1) + λ2q)2(x2, y2) + ... + ),λrФr(xr, yr) is indefinite. Then for any given real η and σ with 0 〈 cr 〈 22-d, it is proved that the inequalityhas infinitely |r∑i=1λФi(xi,yi)+η|〈(max 1≤i≤r{|xi|,|yi|})^-σmany solutions in integers Xl, x2,..., xr, Yl, Y2,.--, Yr. This result constitutes an improvement upon that of B. Q. Xue.展开更多
文摘Let d ≥ 3 be an integer, and set r = 2^d-1 + 1 for 3 ≤ d ≤ 4, r = 17 5~ "2441 for 5 ≤ d ≤ 6, r = d^2+d+1 for 7 ≤ d ≤ 8, and r = d^2+d+2 for d ≥ 9, respectively. Suppose that Фi(x, y) E Z[x, y] (1 ≤ i ≤ r) are homogeneous and nondegenerate binary forms of degree d. Suppose further that λ1, λ2,. ..., λr are nonzero real numbers with λ1/λ2 irrational, and λ1λ1(x1, y1) + λ2q)2(x2, y2) + ... + ),λrФr(xr, yr) is indefinite. Then for any given real η and σ with 0 〈 cr 〈 22-d, it is proved that the inequalityhas infinitely |r∑i=1λФi(xi,yi)+η|〈(max 1≤i≤r{|xi|,|yi|})^-σmany solutions in integers Xl, x2,..., xr, Yl, Y2,.--, Yr. This result constitutes an improvement upon that of B. Q. Xue.
