Sophie Raynor scite author profile

Sophie Raynor

5Publications

11Citation Statements Received

107Citation Statements Given

How they've been cited

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104

106

Affiliations

Evelina London Children's Healthcare, Macquarie University, St George's Hospital

Publications

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Evaluation of SHINE — Make Every Child Count: a school‐based community intervention programme

Akrimi¹,

Raynor²,

Johnson³

et al. 2008

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Many barriers to health and emotional well‐being for children are prevalent within inner‐city communities, and often result in negative consequences for education. Health promotion strategies have previously cited mentoring schemes as interventions through which targeted pastoral support can be effectively provided to children. This paper draws on detailed focus group interviews in order to evaluate SHINE ‐ Make Every Child Count, a student‐led charity operating five mentoring programmes across the London boroughs of Southwark and Lambeth. Following content analysis, this paper identifies six themes associated with mentor support: rapport; emotional well‐being and development; social behaviour; enabling; emerging ambition; and attitudinal development. Results show participant children have gained considerable enjoyment from mentor support. Successful friendships are built and emotional well‐being supported, with children actively including mentors as part of their support network. Children recognise the impact of a mentor on relationships with peers, behaviour within the classroom and social responsibility, in addition to direct educational support. Children also show an increased interest in learning, and evidence of considering ‐ often for the first time ‐ their own future aspirations. Findings demonstrate the impact of the mentoring programmes, as perceived by participant children. Evaluation can be used to inform future development of the programmes, as well as expansion to further schools, with the organisation working towards achieving long‐term sustainability.

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Brauer diagrams, modular operads, and a graphical nerve theorem for circuit algebras

Raynor¹

2021

Preprint

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Circuit algebras, used in the study of finite-type knot invariants, are a symmetric analogue of Jones's planar algebras. They are very closely related to circuit operads, which are a variation of modular operads admitting an extra monoidal product. This paper gives a description of circuit algebras in terms categories of Brauer diagrams. An abstract nerve theorem for circuit operads -and hence circuit algebras -is proved using an iterated distributive law, and an existing nerve theorem for modular operads.

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Graphical combinatorics and a distributive law for modular operads

Raynor¹

2019

Preprint

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An infinity operad of normalized cacti

Bonatto

Chettih

Linton

et al. 2022

Topology and its Applications

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Graphical combinatorics and a distributive law for modular operads

Raynor¹

2021

Advances in Mathematics

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Sophie Raynor

Evaluation of SHINE — Make Every Child Count: a school‐based community intervention programme

Brauer diagrams, modular operads, and a graphical nerve theorem for circuit algebras

Graphical combinatorics and a distributive law for modular operads

An infinity operad of normalized cacti

Graphical combinatorics and a distributive law for modular operads

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