The mathematical model and results of numerical solutions are given for the one dimensional problem when the linear equations are written in a rectangular coordinate system. All the computations are easily realizable for two and three dimensional problems when the equations are written in any coordinate system. Explicit and implicit schemes are shown in tabular form for stability and oscillations criteria; the initial temperature distribution is considered uniform
Studies aimed at an increase in the efficiency of calculating transient temperature fields in comple...
Numerical stability in computations of stellar evolution taking into account hydrostatic equilibrium...
A new numerical integrating method is compared in this paper with the most popular two-level schemes...
Hyperbolic heat conduction problem is solved numerically. The explicit and implicit Euler schemes ar...
Explicit schemes are attractive for obtaining finite difference solutions to partial differential eq...
A method is presented for performing efficient and stable finite element calculations of heat conduc...
This paper introduces a set of new fully explicit numerical algorithms to solve the spatially discre...
AbstractThe heat equation is but one example of problems which involve multiple scales. There is a l...
In [l] an economical scheme is put forward for the heat conduction equa-tion with accuracy O(h ” + T...
An exponential finite difference scheme first presented by Bhattacharya for one dimensional unsteady...
Analytic model of thermal flow oscillations in heat exchangers for supercritical fluid
For the purpose to solve heat conduction problems in solids by explicit finite element method, the c...
A symmetrical semi-implicit (SSI)difference sch me is formulated forthe heat conduction equation. Th...
An implicit explicit algorithm for the solution of transient problems in structural dynamics is desc...
A new method is developed for the numerical solution of the heat conduction equation in one space di...
Studies aimed at an increase in the efficiency of calculating transient temperature fields in comple...
Numerical stability in computations of stellar evolution taking into account hydrostatic equilibrium...
A new numerical integrating method is compared in this paper with the most popular two-level schemes...
Hyperbolic heat conduction problem is solved numerically. The explicit and implicit Euler schemes ar...
Explicit schemes are attractive for obtaining finite difference solutions to partial differential eq...
A method is presented for performing efficient and stable finite element calculations of heat conduc...
This paper introduces a set of new fully explicit numerical algorithms to solve the spatially discre...
AbstractThe heat equation is but one example of problems which involve multiple scales. There is a l...
In [l] an economical scheme is put forward for the heat conduction equa-tion with accuracy O(h ” + T...
An exponential finite difference scheme first presented by Bhattacharya for one dimensional unsteady...
Analytic model of thermal flow oscillations in heat exchangers for supercritical fluid
For the purpose to solve heat conduction problems in solids by explicit finite element method, the c...
A symmetrical semi-implicit (SSI)difference sch me is formulated forthe heat conduction equation. Th...
An implicit explicit algorithm for the solution of transient problems in structural dynamics is desc...
A new method is developed for the numerical solution of the heat conduction equation in one space di...
Studies aimed at an increase in the efficiency of calculating transient temperature fields in comple...
Numerical stability in computations of stellar evolution taking into account hydrostatic equilibrium...
A new numerical integrating method is compared in this paper with the most popular two-level schemes...