TY - JOUR AU - Guo, Jie AU - Wan, Zhong PY - 2023 TI - A new three-term conjugate gradient algorithm with modified gradient-differences for solving unconstrained optimization problems JO - AIMS Mathematics SP - 2473 EP - 2488 VL - 8 IS - 2 AB - Unconstrained optimization problems often arise from mining of big data and scientific computing. On the basis of a modified gradient-difference, this article aims to present a new three-term conjugate gradient algorithm to efficiently solve unconstrained optimization problems. Compared with the existing nonlinear conjugate gradient algorithms, the search directions in this algorithm are always sufficiently descent independent of any line search, as well as having conjugacy property. Using the standard Wolfe line search, global and local convergence of the proposed algorithm is proved under mild assumptions. Implementing the developed algorithm to solve 750 benchmark test problems available in the literature, it is shown that the numerical performance of this algorithm is remarkable, especially in comparison with that of the other similar efficient algorithms. UR - https://doi.org/10.3934/math.2023128 DO - 10.3934/math.2023128