TY  - JOUR
T1  - An Asymptotic Solution to the Blasius Equation and Nonexistence of
Periodic Orbits of the Blasius System
AU - Trujillo, Javier-Antonio AU - Marin-Ramirez, Ana-Magnolia AU - Ortiz-Ortiz, Ruben-Dario 
JO  - Journal of Engineering and Applied Sciences
VL  - 13
IS  - 10
SP  - 3392
EP  - 3395
PY  - 2018
DA  - 2001/08/19
SN  - 1816-949x
DO  - jeasci.2018.3392.3395
UR  - https://makhillpublications.co/view-article.php?doi=jeasci.2018.3392.3395
KW  - Boundary layer
KW  -Blasius equation
KW  -numerical solution
KW  -dynamical systems
KW  -periodic orbits
KW  -plane
AB  - In this study, we find a Blasius solution using Neumann series for big values of the independent
variable and we also prove that the Blasius dynamical system on the three dimensional space does not have
periodic orbits by mean of an auxiliary function and Poincare’s method of tangential curves. Also, we use finite
differences method to find a numerical solution of the Blasius equation, for this porpose we write a code in
MATLAB which gives values of the solution, first and second derivatives and its respective plot on the plane.
ER  -