The higher order topological complexity is Y.B. Rudyak introduced in 2010, this is a top ological invariant that has many relations with other invariants. To compute higher order topological complexity we usually have to introduce upper bounds by inequalities or by constructing section over the space and lower bound using the congruence property of topological space. In this paper, by using the inequalities for the upper bound of the product space and the property of the homogeneity of the product space, we give the results of the calculation of the product of topological spaces which have large topological complexity. These are important topological spaces in robot theory.

Topological complexity; Cohomology; Homotopy equivalent; Product of topological spaces; Fibrational substitute

[1] Y. B. Rudyak, "On higher analogs of topological complexity," Topology and its Applications, vol. 157, pp. 916-920, 2010.

[2] M. Farber, "Topology of robot motion planning," Topology and its Application, vol. 140, pp. 245-266, 2004.

[3] I. Basabe, J. González, Y.B. Rudyak, and D. Tamaki, "Higher topological complexity and its symmetrization," Algebraic and Geometric Topology, vol. 14, pp. 2103-2124, 2014.

[4] H. M. Tran and V. N. Nguyen, "The higher topological complexity of wegde product of spheres," TNU Journal of Science and Technology, vol. 204, no. 11, pp. 195-197, 2019.

[5] H. M. Tran and V. N. Nguyen, "The higher topological complexity of a complement of complex lines arrangement," TNU Journal of Science and Technology, vol. 225, no. 06, pp. 255-257, 2020.

[6] A. Hatcher, Algebraic Topology. Cambridge University Press, 2002.

[7] A. S. Schwarz, “The genus of fiber space,” Amer. Math. Sci. Transl., vol. 55, pp. 49-140, 1966.