Applications of Nonlinear Boundary Value Problem to the Heat Conduction Equation using Fourier Integrals [ READ ]
Sharmin Akter, Umme Ruman
Old Fashioned definitions of mathematics, as a science of numbers and magnitude are no longer valid. Now-a-days it has many applications in many branches for solving physical problem including geometrical configuration. Partial differential equation plays an important role in mathematics. The aim of this paper is to present various types of partial differential equations with applications. Some partial differential equations almost entirely to a kind of boundary value problems which enters modern applied mathematics at every term have been included and solved by using Fourier transform. Laplace transform and separation of variables method. I have explained the physical problems on the conduction of heat and solved by different methods. Fourier series and its applications in Boundary value problem have also been discussed
Sharmin Akter, Umme Ruman
Old Fashioned definitions of mathematics, as a science of numbers and magnitude are no longer valid. Now-a-days it has many applications in many branches for solving physical problem including geometrical configuration. Partial differential equation plays an important role in mathematics. The aim of this paper is to present various types of partial differential equations with applications. Some partial differential equations almost entirely to a kind of boundary value problems which enters modern applied mathematics at every term have been included and solved by using Fourier transform. Laplace transform and separation of variables method. I have explained the physical problems on the conduction of heat and solved by different methods. Fourier series and its applications in Boundary value problem have also been discussed
