# Submitted Manuscripts

**Rajnish Kumar**

Name, last name: | Rajnish Kumar |

ID: | 8 |

Academic degree, academic title, academic interests: | PhD,Asst. Prof.,Fluid Dynamics, MHD, Nanofluids |

E-mail: | rajnish.bitpatna@gmail.com |

**Radiation effect on MHD mixed convection flow of a nanofluid through a porous medium in the presence of chemical reactions**

**Received:**01.04.2016

**ID:**5

*Is under review*

Resume

**Radiation effect on MHD mixed convection flow of a nanofluid through a porous medium in the presence of chemical reactions**An analysis is made to study radiation effect on MHD flow of CuO nanofluid in the presence of chemical reactions and mixed convection due to non-uniform heat source through a porous medium. The model for the nanofluid incorporates and analyses radiation parameter, Brownian motion, thermopheresis and magnetic field consequences. The nonlinear differential equations are solved for different values of governing parameters by using the function ‘bvp4c’ of MATLAB. A comparative study of our result with previously reported results is given. It is worth citing that the thermal boundary layer thickness reduces with rise in unsteadiness of parameterA. The decrease in value of thermal radiation Nr means an enhancement in Rosseland absorptivity

**Radiatsionnoye vozdeystviye na MGD smeshannoy konvektsii techeniya nanodispersiya cherez poristuyu sredu v prisutstvii khimicheskikh reaktsiy**Analiz provoditsya dlya izucheniya radiatsionnogo vozdeystviya na MGD- techeniya CuO nanodispersiya v prisutstvii khimicheskikh reaktsiy i smeshannoy konvektsii vsledstviye neravnomernogo istochnika tepla cherez poristuyu sredu . Model' dlya nanodispersiya vklyuchayet v sebya i analiz parametrov izlucheniya, brounovskoye dvizheniye , thermopheresis i posledstviya magnitnogo polya . Nelineynyye differentsial'nyye uravneniya reshayutsya pri razlichnykh znacheniyakh parametrov zadachi , ispol'zuya funktsiyu ' bvp4c ' v srede MATLAB . Provedeno sravnitel'noye issledovaniye nashego rezul'tata s raneye soobshchennykh rezul'tatov dan . Stoit so ssylkoy , chto tolshchina teplovogo pogranichnogo sloya umen'shayetsya s rostom shatkosti parametr A . Umen'sheniye velichiny teplovogo izlucheniya Nr oznachayet usileniye v Rosselandu pogloshchatel'noy

**Ravins .**,

Name, last name: | Ravins . |

ID: | 4 |

Academic degree, academic title, academic interests: | Ph. D., Assistant Professor, Mathematical Modelling, Computational and Mathematical Biology |

E-mail: | ravinsdohare@gmail.com |

**Naseem Ahmad**

Name, last name: | Naseem Ahmad |

ID: | 5 |

Academic degree, academic title, academic interests: | Ph. D., Professor, Fluid Dynamics, Mechanics, Mathematical Modelling |

E-mail: | nahmad4@jmi.ac.in |

**Unsteady Visco-elastic Boundary Layer Flow past a Stretching Plate and Heat Transfer**

**Received:**16.01.2016

**ID:**2

*Is under review*

Resume

**Unsteady Visco-elastic Boundary Layer Flow past a Stretching Plate and Heat Transfer**A closed form solution to the unsteady boundary layer flow of visco-elastic fluid (Walter’s Liquid B Model) past a stretching plate has been obtained. Using the obtained velocity components u and v, the heat transfer problem has been studied. The behaviour of velocity components and temperature field has been studied though the graphs drawn for various randomly chosen values of time duration and visco-elasticity. Boundary layer thickness, skin friction and the Nusselt number have also been obtained and studied through graphs.

**Unsteady Visco-elastic Boundary Layer Flow past a Stretching Plate and Heat Transfer**A closed form solution to the unsteady boundary layer flow of visco-elastic fluid (Walter’s Liquid B Model) past a stretching plate has been obtained. Using the obtained velocity components u and v, the heat transfer problem has been studied. The behaviour of velocity components and temperature field has been studied though the graphs drawn for various randomly chosen values of time duration and visco-elasticity. Boundary layer thickness, skin friction and the Nusselt number have also been obtained and studied through graphs.

**Gurmeet Singh Bhatia**

Name, last name: | Gurmeet Singh Bhatia |

ID: | 1 |

Academic degree, academic title, academic interests: | M.Phil, Associate Professor, Geometric Function Theory |

E-mail: | meetgur111@gmail.com |

**CONSTRUCTION OF COEFFICIENT INEQUALITY FOR A NEW SUBCLASS OF CLASS OF STARLIKE ANALYTIC FUNCTIONS**

**Received:**07.04.2015

**ID:**1

*Is under review*

Resume

**CONSTRUCTION OF COEFFICIENT INEQUALITY FOR A NEW SUBCLASS OF CLASS OF STARLIKE ANALYTIC FUNCTIONS**In this paper, we will discuss a newly constructed subclass of analytic starlike functions by which we will be obtaining sharp upper bounds of the functional |a_3-µa_2^2 | for the analytic function f(z)= z+ ∑_(n=2)^∞▒a_n z^n,|z|<1 belonging to this subclasses.

**СТРОИТЕЛЬСТВО коэффициента неравенство для нового подкласса КЛАССА звездноподобных аналитических функций**В этой статье мы обсудим, в недавно построенном подкласс аналитических функций звездных , с помощью которых мы будем получать точные верхние границы функционала | a_3 - μa_2 ^ 2 | для аналитической функции F (Z ) = Z + Σ_ (п = 2 ) ^ ∞▒a_n г ^ п, | г | < 1 , относящиеся к этому подклассов.