RT Journal Article ID 6f764b65629d1c38 A1 Saedodin, Seyfolah A1 Barforoush, Mohammad Sadegh Motaghedi T1 AN EXACT SOLUTION FOR THERMAL ANALYSIS OF A CYLINDRICAL OBJECT USING A HYPERBOLIC HEAT CONDUCTION MODEL JF Heat Transfer Research JO HTR YR 2012 FD 2012-10-17 VO 43 IS 5 SP 405 OP 423 K1 non-Fourier K1 relaxation time K1 heat conduction K1 analytical solution K1 separation of variables AB The purpose of the present paper is to carry out the non-Fourier effect subjected to a special heat-flux boundary condition. The governing equation is expressed in cylindrical coordinates and is solved by deriving the analytical solution. The temperature layers and profiles of sample calculations are performed. It is found that, as much as the Vernotte number is higher, a point can get to higher temperature during the process. Also, it can be perceived that the temperature of different points of the object becomes even lower than the initial temperature. PB Begell House LK https://www.dl.begellhouse.com/journals/46784ef93dddff27,2de5ab56358d64ba,6f764b65629d1c38.html