Počet záznamov: 1
On discrete versions of two Accola´s theorems about automorphism groups of Riemann surfaces
SYS 0255524 LBL 00916^^^^^2200265^^^450 005 20240509115028.0 014 $a 000407284000002 $2 CCC 014 $a 000407284000002 $2 WOS CC. SCIE 014 $a 2-s2.0-85026860576 $2 SCOPUS 017 70
$a 10.1007/s13324-016-0138-4 $2 DOI 100 $a 20180214d2017 m y slo 03 ba 101 0-
$a eng 102 $a CH 200 1-
$a On discrete versions of two Accola´s theorems about automorphism groups of Riemann surfaces $f Maxim Limonov, Roman Nedela, Alexander Mednykh 330 $a In this paper we give a few discrete versions of Robert Accola’s results on Riemann surfaces with automorphism groups admitting partitions. As a consequence, we establish a condition for γ-hyperelliptic involution on a graph to be unique. Also we construct an infinite family of graphs with more than one γ-hyperelliptic involution. 463 -1
$1 001 umb_un_cat*0293279 $1 011 $a 1664-2368 $1 011 $a 1664-235X $1 200 1 $a Analysis and Mathematical Physics $v Vol. 7, no. 3 (2017), pp. 233-243 $1 210 $a Cham $c Springer Nature Switzerland AG $d 2017 606 0-
$3 umb_un_auth*0226123 $a Riemanove plochy $X Riemann surfaces 606 0-
$3 umb_un_auth*0039537 $a grafy $X charts $X graphs 606 0-
$3 umb_un_auth*0211656 $a automorphism groups 606 0-
$3 umb_un_auth*0265953 $a hyperelliptic graphs 606 0-
$3 umb_un_auth*0265954 $a hyperelliptic involutions 606 0-
$3 umb_un_auth*0265955 $a harmonic maps 615 $n 51 $a Matematika 675 $a 51 700 -1
$3 umb_un_auth*0249455 $a Limonov $b Maksim $4 070 $9 33 701 -0
$3 umb_un_auth*0001645 $a Nedela $b Roman $f 1960- $p UMBFP05 $9 34 $4 070 $T Katedra informatiky 701 -1
$3 umb_un_auth*0120028 $a Mednykh $b Alexander $f 1953- $9 33 $4 070 801 $a SK $b BB301 $g AACR2 $9 unimarc sk T85 $x existuji fulltexy
Počet záznamov: 1