“Propagation of boundary of inhomogeneous heat conduction equation” accepted to Journal of Applied Mathematics and Computation.
• 2003
معلومات البحث
المؤلفون
Reda G. Abd El -Rahman
الكلمات المفتاحية
Moving boundary condition; Symmetry method
المجلة العلمية
Not Available
الناشر
Not Available
المجلد
141,
العدد
2–3, 5
الصفحات
231–239
publication.type
Local
رابط البحث
Not Available
المواد المرفقة
Not Available
الملخص
We consider the problem of determining analytically the exact solutions of the heat conduction equation in an inhomogeneous medium, described by the diffusion equation ∂tT(x,t)=r1−s∂r(k(r)rs−1∂rT(r,t)) with a position-dependent thermal diffusivity K(r). The unsteady one-dimensional heat conduction equation is transformed into an ordinary differential equation called Kummer’s equation unifiedly in the linear, cylindrical and spherical coordinate systems. Kummer’s equation is solved in terms of the confluent hypergeometric functions. These solutions exist on the conditions that boundaries move with their positions proportional to some functions of time. Progress has been made in this direction by introducing similarity variables and transformations.
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