Algebraic Structure in Graphical Models

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(New page: Algebraic and geometric properties such as sparsity, low rank, and convexity have played a prominent role in the development of new methodology for inference in graphical models. These id...)
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Algebraic and geometric properties such as sparsity, low rank, and Algebraic and geometric properties such as sparsity, low rank, and
convexity have played a prominent role in the development of new convexity have played a prominent role in the development of new
-methodology for inference in graphical models. These ideas have also+methodology for inference in graphical models. These ideas have also
broadened the range of problem domains to which graphical modeling broadened the range of problem domains to which graphical modeling
techniques have been fruitfully applied (e.g., phylogeny, gene techniques have been fruitfully applied (e.g., phylogeny, gene
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developments spanning the spectrum from theoretical advances to new developments spanning the spectrum from theoretical advances to new
applications. applications.
 +
 +* Gautam Desarathy
 +* Robin Evans
 +* Rina Foygal
 +* Shaowei Lin
 +* Poh-Ling Loh
 +* James Saunderson
 +* Seth Sullivant
 +* Jinfang Wang
 +* Yaokun Wu
 +* Piotr Zwiernik
 +* Venkat Chandrasekaran
 +* Sung-Ho Kim
 +* Caroline Uhler

Current revision

Algebraic and geometric properties such as sparsity, low rank, and convexity have played a prominent role in the development of new methodology for inference in graphical models. These ideas have also broadened the range of problem domains to which graphical modeling techniques have been fruitfully applied (e.g., phylogeny, gene expression analysis). This session will highlight exciting recent developments spanning the spectrum from theoretical advances to new applications.

  • Gautam Desarathy
  • Robin Evans
  • Rina Foygal
  • Shaowei Lin
  • Poh-Ling Loh
  • James Saunderson
  • Seth Sullivant
  • Jinfang Wang
  • Yaokun Wu
  • Piotr Zwiernik
  • Venkat Chandrasekaran
  • Sung-Ho Kim
  • Caroline Uhler
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