Comments on “A one-step optimal homotopy analysis method for nonlinear differential equations”

## Marinca et al. [1] made some comments on our paper [2] and pointed out ''some fundamental mistakes and misinterpretations along with a false conclusion". Unfortunately, Marinca's comments are wrong. Here, we further reveal the essence of Marinca's approach, and point out the reason why their me

In this paper, a one-step optimal approach is proposed to improve the computational efficiency of the homotopy analysis method (HAM) for nonlinear problems. A generalized homotopy equation is first expressed by means of a unknown embedding function in Taylor series, whose coefficient is then determi

In this paper, an optimal homotopy-analysis approach is described by means of the nonlinear Blasius equation as an example. This optimal approach contains at most three convergence-control parameters and is computationally rather efficient. A new kind of averaged residual error is defined, which can

This paper presents general framework for solving the nth-order integro-differential equation using homotopy analysis method (HAM) and optimal homotopy asymptotic method (OHAM). OHAM is parameter free and can provide better accuracy over the HAM at the same order of approximation. Furthermore, in OH