考虑共振情形下三阶微分方程m-点边值问题x'''(t)=f(t,x(t),x'(t),x"(t))+p(t),t∈(0,1), x(0)=0,x"(0)=0,x'(1)=sum from i=1 to m-1 a_ix'(ξi),其中a_i≥0,0<ξ1<ξ2<…<ξm-2<1且...考虑共振情形下三阶微分方程m-点边值问题x'''(t)=f(t,x(t),x'(t),x"(t))+p(t),t∈(0,1), x(0)=0,x"(0)=0,x'(1)=sum from i=1 to m-1 a_ix'(ξi),其中a_i≥0,0<ξ1<ξ2<…<ξm-2<1且Σ_(i=1)^(m-2) a_i=1.利用Mawhin重合度拓展定理,得到该问题解存在性的新的结果.展开更多
本文研究一类具偏差变元的高阶中立型方程d^m/dt^m(x(t)-sum from i=1 to ∞ ( )c_ix(t-r_i))=g(t,x(t-τ(t)))+p(t)周期解存在性问题,其中f,p和τ为R上连续函数,p(t+2π)≡p(t),τ(t+2π)≡τ(t)且integral from n=0 to ∞ ( )p(s)ds=...本文研究一类具偏差变元的高阶中立型方程d^m/dt^m(x(t)-sum from i=1 to ∞ ( )c_ix(t-r_i))=g(t,x(t-τ(t)))+p(t)周期解存在性问题,其中f,p和τ为R上连续函数,p(t+2π)≡p(t),τ(t+2π)≡τ(t)且integral from n=0 to ∞ ( )p(s)ds=0;g∈C(R×R,R)满足g(t+2π,x)≡g(t,x),■x∈R,c_i,c_i(i=1,2,…,n)为常数,m和n为正整数.利用Mawhin重合度拓展定理,我们得到了周期解存在性的结果。展开更多
文摘考虑共振情形下三阶微分方程m-点边值问题x'''(t)=f(t,x(t),x'(t),x"(t))+p(t),t∈(0,1), x(0)=0,x"(0)=0,x'(1)=sum from i=1 to m-1 a_ix'(ξi),其中a_i≥0,0<ξ1<ξ2<…<ξm-2<1且Σ_(i=1)^(m-2) a_i=1.利用Mawhin重合度拓展定理,得到该问题解存在性的新的结果.
基金Research Foundation for Doctor Station of Ministry of Education of China(20113401110001)Nature Science Foundation of Anhui Province(1308085MA01)+1 种基金Excellent Young Talents Foundation of Anhui Province(2013SQRL080ZD)Graduate Academic Innovation Research Project of Anhui University(10117700020)
文摘本文研究一类具偏差变元的高阶中立型方程d^m/dt^m(x(t)-sum from i=1 to ∞ ( )c_ix(t-r_i))=g(t,x(t-τ(t)))+p(t)周期解存在性问题,其中f,p和τ为R上连续函数,p(t+2π)≡p(t),τ(t+2π)≡τ(t)且integral from n=0 to ∞ ( )p(s)ds=0;g∈C(R×R,R)满足g(t+2π,x)≡g(t,x),■x∈R,c_i,c_i(i=1,2,…,n)为常数,m和n为正整数.利用Mawhin重合度拓展定理,我们得到了周期解存在性的结果。