Comparison of Solution Methods for the Boundary Function Equation

L. Tonks and I. Langmuir, “A general theory of the plasma of an arc,” Phys. Rev., 34, No. 6, 876–922 (1929). G. A. Emmerg, R. M. Wieland, A. T. Mense, and J. N. Davidson, “Electric sheath and presheath in a collisionless, finite ion temperature plasma,” Phys. Fluids, 23, No. 4, 803–823 (1980). D. S. Filippychev, “Simulation of the “plasm–sheath” equation using a grid with condensation,” Prikl. Matem. Informat., Moscow, MAKS Press, No. 14, 35–54 (2003) . D. S. Filippychev, “Simulation of the “plasma–sheath” equation,” Vestn. MGU, Ser. 15: Vychisl. Matem. Kibern., No. 4: 32–39 (2004). D. S. Filippychev, “Boundary function method to derive the asymptotic solution of the ‘plasma– sheath’ equation,” Prikl. Matem. Informat., Moscow, MAKS Press, No. 19, 21-40 (2004). A. B. Vasil’eva and V. F. Butuzov, Asymptotic Expansion of Solutions of Singularly Perturbed Equations [in Russian], Nauka, Moscow (1973). D. S. Filippychev, “Application of the dual operator formalism to obtain the zeroth-order boundary function of the ‘plasma –sheath’ equation,” Prikl. Matm. Informat., Moscow, MAKS Press, No. 22, 76-90 (2005). D. S. Filippychev, “Numerical solution of the boundary function differential equation,” Vestn. MGU, Ser. 15: Vychisl. Matem. Kibern., No. 2, 10–14 (2006). D. S. Filippychev, “Numerical solution of the differential equation describing the behavior of a zeroth-order boundary function,” Prikl. Matem. Informat., Moscow, MAKS Press, No. 23, 24–35 (2006). D. S. Filippychev and V. V. Nevedov, “Boundary layer method and its application for the ‘plasma – layer’ equation with Emmert kernel,” in: European Science and Technology, 6th Int. Sci. Conf. Munich, Vol. 1 (2013), pp. 410–415. D. G. Cacuci, R. B. Perez, and V. Protopopescu, “Duals and propagators: A canonical formalism for nonlinear equations,” J. Math. Phys., 29, No. 2, 335–361 (1988).