摘要:设Fq为有限域,f_l=a_(l1)x(~d~(l)_(11))_(11)…x~(d~((l))_(1_(k1)))_(1_(k1))+a_(l2)x~(d~((l))_(21))_(2...设Fq为有限域,f_l=a_(l1)x(~d~(l)_(11))_(11)…x~(d~((l))_(1_(k1)))_(1_(k1))+a_(l2)x~(d~((l))_(21))_(21)…x~(d~((l))_(2k_2)_(2k_2))+…+a_(ln)x~(d~((l))_(n1))_(n1)…x~(d~((l))_(nk_n)_(nk_n)+c_l(l=1,2)为F_q上的一组广义对角多项式,用N_q(V)表示由f_l(l=1,2)确定的族中的F_q有理点的个数.作者利用Adolphson和Sperber的牛顿多面体理论与指数和工具,证明了ord_qN_q(V)≥max{「∑~n_(i=1)1/d_i」-2,0,其中d_i=max{d~(1)_(ij),d~(2)_(ij)|1≤j≤k_i},1≤i≤n.
Abstract:
Let F_q be the finite field and N_q(V) denote the number of F_q rational points on the variety determined by f_l=a_(l1)x(~d~(l)_(11))_(11)…x~(d~((l))_(1_(k1)))_(1_(k1))+a_(l2)x~(d~((l))_(21))_(21)…x~(d~((l))_(2k_2)_(2k_2))+…+a_(ln)x~(d~((l))_(n1))_(n1)…x~(d~((l))_(nk_n)_(nk_n)+c_l(l=1,2) By using the Newton polyhedra technique introduced by Adolphson and Sperber, the authors prove that ord_qN_q(V)≥max{「∑~n_(i=1)1/d_i」-2,0,where d_i=max{d~((1))_(ij),d~((2))_(ij)|1≤j≤k_i},1≤i≤n.显示全部