![etiquetas zebra 2 x 3.5 gap sense etiquetas zebra 2 x 3.5 gap sense](https://0.academia-photos.com/5096655/8703020/9720671/s200_davis.lisboa.jpg)
Returns a polycyclic presentation sequence for the subgroup U or the (Note that a subgroup is also a subfactorĪ pcp for a pcp-group U or a subfactor U / N can be created with Introduce polycyclic presentation sequences or Pcp to compute moreĮfficiently with subfactors. Presentation for a given subfactor can be time-consuming. Is not only a generating set, but an igs.Ģ.8 Pcps - polycyclic presentation sequences for subfactorsĪ subfactor of a pcp-group G is again a polycyclic group for which a The third version isĪvailable for efficiency reasons and assumes that the second list igs2 Has the same functionality and carries shadows. Sifts the elements in the list gens into igs. AddToIgsParallel( igs, gens, igs2, gens2 ).The function returns the subgroup generated In the second form igs is a igs for a subgroup and Induced generating sequence of the subgroup generated by the elements Returns the subgroup of the pcp-group G generated by the elements of Hence it might speed up computations, ifĪ known igs for a group U is set a priori.
![etiquetas zebra 2 x 3.5 gap sense etiquetas zebra 2 x 3.5 gap sense](http://toner.ec/images/thumbs/0000196_1920.jpeg)
Generating set and computes a canonical generating sequence carryingįor a large number of methods for pcp-groups U we will first of allĭetermine an igs for U. In the second form the function takes an igs as input and Returns a canonical generating sequence of the subgroup U ofĪ pcp-group. The second form takes an igs as input and norms it. Returns a normed induced generating sequence of the subgroup U of a The third form computes an igs for the subgroup generated by In the second for the subgroup is given via a generating set Returns an induced generating sequence of the subgroup U of a The following functions canīe used to compute induced generating sequence for a given subgroup Moreover, it is canonical, if the exponent The first one calculated for U is stored as anĪn induced generating sequence of a subgroup of a pcp-group G is a
ETIQUETAS ZEBRA 2 X 3.5 GAP SENSE GENERATOR
Subgroup U need an induced generating sequence or igs of U.Īn igs is a sequence of generator of U whose list of exponent vectorsįorm a matrix in upper triangular form. Returns the subgroup U ¢ U p of U where p is a prime number.Ģ.7 Igs - induced generating sequences for subgroupsĪ subgroup of a pcp-group G can be defined by a set of generators asĭescribed in Section pcpgroup. Returns the group generated by all commutators with u in U Returns the normal closure of V under action of U. Returns a list containing all elements of U. Theįunction does not check if V is a subgroup of U and if it is not, Returns the index of V in U if V is a subgroup of U. Let U, V and N are subgroups of a pcp-group. In this section we describe some important basic functions which areĪvailable for pcp-groups. There are functions provided in polycyclic. Methods that can be applied to pcp-groups. Number of group theoretic questions GAP does not provide generic Methods for groups can be applied for pcp-groups. Pcp-groups are groups in the GAP sense and hence all generic GAP Let I be the set of those i Î ) Ģ.6 Basis methods and functions for pcp-groups Sequence ( g 1, ¼, g n) is called a polycyclic generating G i Î C i such that C i = á g i, C i+1 ñ.
ETIQUETAS ZEBRA 2 X 3.5 GAP SENSE SERIES
Let G be a polycyclic group and let G = C 1 \rhd C 2 ¼ C n\rhd C n+1 = 1 be a polycyclic series, that is, a subnormal series of