Mathematical model of back propagation for stock price forecasting

[1] [1] Laughlin J M. Some new transformations for Bailey pairs and WP-Bailey pairs[J]. Central European Journal of Mathematics, 2020, 8(3):474-487. LaughlinJM. Some new transformations for Bailey pairs and WP-Bailey pairs[J] Central European Journal of Mathematics 2020 8 3 474 487 Search in Google Scholar

[2] [2] Abozaid A A, Selim H H, Gadallah K, et al. Periodic orbit in the frame work of restricted three bodies under the asteroids belt effect[J]. Applied Mathematics and Nonlinear Sciences, 2020, 5(2):157-176. AbozaidAA SelimHH GadallahK etal Periodic orbit in the frame work of restricted three bodies under the asteroids belt effect[J] Applied Mathematics and Nonlinear Sciences 2020 5 2 157 176 Search in Google Scholar

[3] [3] Bing H, Xu Y, Hu J. Crank–Nicolson finite difference scheme for the Rosenau–Burgers equation[J]. Applied Mathematics 8 Computation, 2018, 204(1):311-316. BingH XuY HuJ Crank–Nicolson finite difference scheme for the Rosenau–Burgers equation[J] Applied Mathematics & Computation 2018 204 1 311 316 Search in Google Scholar

[4] [4] Kanna M, Kumar R P, Nandappa S, et al. On Solutions of Fractional order Telegraph Partial Differential Equation by Crank-Nicholson Finite Difference Method[J]. Applied Mathematics and Nonlinear Sciences, 2020, 5(2):85-98. KannaM KumarRP NandappaS etal On Solutions of Fractional order Telegraph Partial Differential Equation by Crank-Nicholson Finite Difference Method[J] Applied Mathematics Nonlinear Sciences 2020 5 2 85 98 Search in Google Scholar

[5] [5] Pochinka O V, Shubin D D. On 4-dimensional flows with wildly embedded invariant manifolds of a periodic orbit[J]. Applied Mathematics and Nonlinear Sciences, 2020, 5(2):261-266. PochinkaOV ShubinDD On 4-dimensional flows with wildly embedded invariant manifolds of a periodicorbit[J] Applied Mathematics and Nonlinear Sciences 2020 5 2 261 266 Search in Google Scholar

[6] [6] Alghamdi M H, Alshaery A A. Mathematical Algorithm for Solving Two–Body Problem[J]. Applied Mathematics and Nonlinear Sciences, 2020, 5(2):217-228. AlghamdiMH AlshaeryAA Mathematical Algorithm for Solving Two–Body Problem[J] Applied Mathematics and Nonlinear Sciences 2020 5 2 217 228 Search in Google Scholar

[7] [7] Saouli M A. Existence of solution for Mean-field Reflected Discontinuous Backward Doubly Stochastic Differential Equation[J]. Applied Mathematics and Nonlinear Sciences, 2020, 5(2):205-216. SaouliMA Existence of solution for Mean-field Reflected Discontinuous Backward Doubly Stochastic Differential Equation[J] Applied Mathematics and Nonlinear Sciences 2020 5 2 205 216 Search in Google Scholar

[8] [8] Khalifeh M H, Yousefi-Azari H, Ashrafi A R. The first and second Zagreb indices of some graph operations[J]. Discrete Applied Mathematics, 2019, 157(4):804-811. KhalifehMH Yousefi-AzariH AshrafiAR The first and second Zagreb indices of some graph operations[J] Discrete Applied Mathematics 2019 157 4 804 811 Search in Google Scholar

[9] [9] V Medvedev, Zhuzhoma E. Any closed 3-manifold supports A-flows with 2-dimensional expanding attractors[J]. Applied Mathematics and Nonlinear Sciences, 2020, 5(2):307-310. MedvedevV ZhuzhomaE Any closed 3-manifold supports A-flows with 2-dimensional expanding attractors[J] Applied Mathematics and NonlinearSciences 2020 5 2 307 310 Search in Google Scholar

[10] [10] Malkin M I, Safonov K A. Monotonicity and non-monotonicity regions of topological entropy for Lorenz-like families with infinite derivatives[J]. Applied Mathematics and Nonlinear Sciences, 2020, 5(2):293-306. MalkinMI SafonovKA Monotonicity and non-monotonicity regions of topological entropy for Lorenz-like families with infinite derivatives[J] Applied Mathematics and Nonlinear Sciences 2020 5 2 293 306 Search in Google Scholar