%0 Journal Article %T Bifurcations of resonant double homoclinic loops for higher dimensional systems %A Jin, Yinlai %A Xu, Han %A Gao, Yuerang %A Zhao, Xue %A Xie, Dandan %J Journal of Mathematics and Computer Science %D 2016 %V 16 %N 2 %@ ISSN 2008-949X %F Jin2016 %X In this work, we study the bifurcation problems of double homoclinic loops with resonant condition for higher dimensional systems. The Poincaré maps are constructed by using the foundational solutions of the linear variational systems as the local coordinate systems in the small tubular neighborhoods of the homoclinic orbits. We obtain the existence, number and existence regions of the small homoclinic loops, small periodic orbits, and the large homoclinic loops, large periodic orbits, respectively. Moreover, the complete bifurcation diagrams are given. %9 journal article %R 10.22436/jmcs.016.02.05 %U http://dx.doi.org/10.22436/jmcs.016.02.05 %P 165-177