LEADER 03567nam  2200829z- 450 
001 9910580213303321
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035   $a(CKB)5690000000011955
035   $a(oapen)https://directory.doabooks.org/handle/20.500.12854/87514
035   $a(EXLCZ)995690000000011955
100   $a20202207d2022      |y             0
101 0 $aeng
135   $aurmn|---annan
181   $ctxt$2rdacontent
182   $cc$2rdamedia
183   $acr$2rdacarrier
200 10$aSymmetry in Modeling and Analysis of Dynamic Systems
210   $aBasel$cMDPI - Multidisciplinary Digital Publishing Institute$d2022
215   $a1 electronic resource (152 p.)
311   $a3-0365-3384-2 
311   $a3-0365-3383-4 
330   $aReal-world systems exhibit complex behavior, therefore novel mathematical approaches or modifications of classical ones have to be employed to precisely predict, monitor, and control complicated chaotic and stochastic processes. One of the most basic concepts that has to be taken into account while conducting research in all natural sciences is symmetry, and it is usually used to refer to an object that is invariant under some transformations including translation, reflection, rotation or scaling.The following Special Issue is dedicated to investigations of the concept of dynamical symmetry in the modelling and analysis of dynamic features occurring in various branches of science like physics, chemistry, biology, and engineering, with special emphasis on research based on the mathematical models of nonlinear partial and ordinary differential equations. Addressed topics cover theories developed and employed under the concept of invariance of the global/local behavior of the points of spacetime, including temporal/spatiotemporal symmetries.
606   $aResearch & information: general$2bicssc
606   $aMathematics & science$2bicssc
610   $atime delay
610   $athird order differential equations
610   $adifference scheme
610   $astability
610   $a?c-Laplacian
610   $aboundary value problem
610   $acritical point theory
610   $athree solutions
610   $amultiple solutions
610   $afixed point theory
610   $aboundary value problems
610   $ageneralized attracting horseshoe
610   $astrange attractors
610   $apoincaré map
610   $aelectronic circuits
610   $anon-canonical differential equations
610   $asecond-order
610   $aneutral delay
610   $amixed type
610   $aoscillation criteria
610   $acell transplantation
610   $acytokines
610   $aischemic stroke
610   $anumerical simulation
610   $arunge-kutta method
610   $astability analysis
610   $aambient assisted living
610   $aAAL
610   $aambient intelligence
610   $aassisted living
610   $auser-interfaces
610   $afuzzy logic
610   $avibrations
610   $asymmetrical structures
610   $aeigenmodes
610   $abuilding
610   $aconcrete
610   $apartial difference equation
610   $ainfinitely many small solutions
610   $a(p,q)-Laplacian
615  7$aResearch & information: general
615  7$aMathematics & science
700   $aAwrejcewicz$b Jan$4edt$059397
702   $aAwrejcewicz$b Jan$4oth
906   $aBOOK
912   $a9910580213303321
996   $aSymmetry in Modeling and Analysis of Dynamic Systems$93030219
997   $aUNINA