A Promising Practice: Using Facebook as a Communication and Social Networking Tool

Individuals with autism often face barriers to social interaction. Residing in a rural environment can compound these difficulties for individuals diagnosed with autism. Some of the reasons include transportation problems and small social networks, in addition to the characteristics of autism. This article discusses a promising practice for supporting the communication and social opportunities for individuals with autism. The authors examined how Facebook supported the social interaction of Jacob, a 28-year old with High Functioning Autism. The findings suggested that, through Facebook, Jacob increased the quantity and quality of social ties he had with others. The authors argue that although online social networking has limitations, with supervision, tools such as Facebook hold potential for developing and increasing social interaction for individuals with High Functioning Autism /Asperger Syndrome

The Stigmatization of Individuals Convicted of Sex Offenses: Labeling Theory and The Sex Offense Registry

The sex offender registry currently lists over half a million U.S. citizens as sex offenders. Modern day legislation directed toward sex offenders was born in an era of public fear and rash decision-making. Terrible consequences have since been identified as resulting from the labeling of sex offenders via the registry. These unintended consequences socially, economically, and psychologically influence the lives of sex offenders. Labeling theory states that individuals who are given a label eventually subscribe to that label; in other words, it becomes a self-fulfilling prophecy. In the case of sex offenders, this can only mean more damage to society. This paper examines how the registry reproduces labeling and how sex offenders are consequently damaged by their given label. GPS tracking and treatment through the Good Lives Model are offered as contemporary solutions to the ever-growing problem

The equivariant topology of stable Kneser graphs

The stable Kneser graph $SG_{n,k}$, $n\ge1$, $k\ge0$, introduced by Schrijver \cite{schrijver}, is a vertex critical graph with chromatic number $k+2$, its vertices are certain subsets of a set of cardinality $m=2n+k$. Bj\"orner and de Longueville \cite{anders-mark} have shown that its box complex is homotopy equivalent to a sphere, \Hom(K_2,SG_{n,k})\homot\Sphere^k. The dihedral group $D_{2m}$ acts canonically on $SG_{n,k}$, the group $C_2$ with 2 elements acts on $K_2$. We almost determine the $(C_2\times D_{2m})$-homotopy type of \Hom(K_2,SG_{n,k}) and use this to prove the following results. The graphs $SG_{2s,4}$ are homotopy test graphs, i.e. for every graph $H$ and $r\ge0$ such that \Hom(SG_{2s,4},H) is $(r-1)$-connected, the chromatic number $\chi(H)$ is at least $r+6$. If $k\notin\set{0,1,2,4,8}$ and $n\ge N(k)$ then $SG_{n,k}$ is not a homotopy test graph, i.e.\ there are a graph $G$ and an $r\ge1$ such that \Hom(SG_{n,k}, G) is $(r-1)$-connected and $\chi(G)<r+k+2$.Comment: 34 pp