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A variational approach to bifurcation points of a reaction-diffusion system with obstacles and neumann boundary conditions
SYS 0458817 LBL 01000a^^22220027750^450 005 20240103212149.3 014 $a 84957589965 $2 SCOPUS 014 $a 000369303200001 $2 WOS 017 $a 10.1007/s10492-016-0119-9 $2 DOI 100 $a 20160420d m y slo 03 ba 101 $a eng 102 $a CZ 200 1-
$a A variational approach to bifurcation points of a reaction-diffusion system with obstacles and neumann boundary conditions 215 $a 25 s. $c P 463 -1
$1 001 cav_un_epca*0290654 $1 011 $a 0862-7940 $e 1572-9109 $1 200 1 $a Applications of Mathematics $v Roč. 61, č. 1 (2016), s. 1-25 $1 210 $c Springer 610 $a reaction-diffusion system 610 $a unlateral condition 610 $a variational inequality 700 -1
$3 cav_un_auth*0330049 $a Eisner $b Jan $i Laboratoř genetiky ryb $j Laboratory of Fish Genetics $k LGR $p UZFG-Y $w Biodiversity and Evolution Team $T Ústav živočišné fyziologie a genetiky AV ČR, v. v. i. 701 -1
$3 cav_un_auth*0100675 $a Kučera $b Milan $i Evoluční diferenciální rovnice $j Evolution Differential Equations $l EDE $p MU-W $w Evolution Differential Equations $T Matematický ústav AV ČR, v. v. i. 701 -1
$3 cav_un_auth*0267722 $a Väth $b Martin $i Evoluční diferenciální rovnice $j Evolution Differential Equations $l EDE $p MU-W $w Evolution Differential Equations $T Matematický ústav AV ČR, v. v. i.
Number of the records: 1