. "Stiff systems, Modern Taylor Series Method, Differential equations, Continous system modelling"@en . . "114-119" . "6"^^ . . "Tuh\u00E9 syst\u00E9my v teorii a praxi"@cs . "Stiff systems in theory and practice" . "Proceedings of the 6th EUROSIM Congress on Modelling and Simulation" . . . "Stiff systems in theory and practice" . "[6288EB76AE0A]" . . "ARGE Simulation News" . "Stiff systems in theory and practice"@en . . . "Zbo\u0159il, Franti\u0161ek" . "RIV/00216305:26230/07:PU73561" . . . . "Ljubljana" . "Ljubljana" . "4"^^ . "452513" . . "978-3-901608-32-2" . "Pindry\u010D, Milan" . "RIV/00216305:26230/07:PU73561!RIV08-MSM-26230___" . "2007-09-09+02:00"^^ . "The words "stiff system" are used frequently in this work as it is the top topic of it. In particular the paper deals with stiff systems of differential equations. To solve this sort of system numerically
is a diffult task. In spite of the fact that we come across stiff systems quite often in the common practice, it was real challenge even to find suitable articles or other bibliography that would discuss the matter properly.
On the other hand a very interesting and promissing numerical method of solving systems of ordinary differential equations based on Taylor series has appeared. The question was how to harness the said "Modern Taylor Series Method" for solving of stiff systems.
The potential of the Taylor series has been exposed by many practical experiments and a way of detection and solution of large systems of ordinary differential equations has been found. Generally speaking, a stiff system contains several components, some of them are heavily suppressed while the"@en . . "4"^^ . . . . "26230" . . "The words "stiff system" are used frequently in this work as it is the top topic of it. In particular the paper deals with stiff systems of differential equations. To solve this sort of system numerically
is a diffult task. In spite of the fact that we come across stiff systems quite often in the common practice, it was real challenge even to find suitable articles or other bibliography that would discuss the matter properly.
On the other hand a very interesting and promissing numerical method of solving systems of ordinary differential equations based on Taylor series has appeared. The question was how to harness the said "Modern Taylor Series Method" for solving of stiff systems.
The potential of the Taylor series has been exposed by many practical experiments and a way of detection and solution of large systems of ordinary differential equations has been found. Generally speaking, a stiff system contains several components, some of them are heavily suppressed while the" . . . "\u0160\u00E1tek, V\u00E1clav" . "\u010Cl\u00E1nek se zab\u00FDv\u00E1 probl\u00E9mem \u0159e\u0161en\u00ED Tuh\u00FDch soustav diferenci\u00E1ln\u00EDch rovnic s pou\u017Eit\u00EDm Modern\u00ED metody Taylorovy \u0159ady.  Jsou zde uvedeny uk\u00E1zky v\u00FDpo\u010Dtu na konkr\u00E9tn\u00EDch p\u0159\u00EDkladech.
"@cs . "Tuh\u00E9 syst\u00E9my v teorii a praxi"@cs . "Kunovsk\u00FD, Ji\u0159\u00ED" . . "Z(MSM0021630528)" . "Stiff systems in theory and practice"@en .