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Crandall-Rabinowitz type bifurcation for non-differentiable perturbations of smooth mappings
SYS 0486946 LBL 01000a^^22220027750^450 005 20240103215637.0 014 $a 85034205258 $2 SCOPUS 017 $a 10.1007/978-3-319-64173-7_12 $2 DOI 100 $a 20180220d m y slo 03 ba 101 $a eng $d eng 102 $a CH 200 1-
$a Crandall-Rabinowitz type bifurcation for non-differentiable perturbations of smooth mappings 215 $a 19 s. $c P 463 -1
$1 001 cav_un_epca*0486947 $1 010 $a 978-3-319-64172-0 $1 011 $a 2194-1009 $1 200 1 $a Patterns of Dynamics $v S. 184-202 $1 210 $a Cham $c Springer $d 2017 $1 225 $a Springer Proceedings in Mathematics & Statistics $v 205 $1 702 1 $a Gurevich $b P. $4 340 $1 702 1 $4 340 $a Hell $b J. $1 702 1 $4 340 $a Sandstede $b B. $1 702 1 $4 340 $a Scheel $b A. 610 $a nonsmooth equation 610 $a Lipschitz bifurcation branch 610 $a formula for the bifurcation direction 700 -1
$3 cav_un_auth*0051233 $a Recke $b L. $y DE $4 070 701 -1
$3 cav_un_auth*0267722 $a Väth $b Martin $p MU-W $i Evoluční diferenciální rovnice $j Evolution Differential Equations $l EDE $w Evolution Differential Equations $y DE $4 070 $T Matematický ústav AV ČR, v. v. i. 701 -1
$3 cav_un_auth*0100675 $a Kučera $b Milan $p MU-W $i Evoluční diferenciální rovnice $j Evolution Differential Equations $l EDE $w Evolution Differential Equations $y CZ $4 070 $T Matematický ústav AV ČR, v. v. i. 701 -1
$3 cav_un_auth*0021196 $a Navrátil $b J. $y CZ $4 070 856 $u https://link.springer.com/chapter/10.1007/978-3-319-64173-7_12
Number of the records: 1