Glenn H. Fredrickson
University of California, Santa Barbara
440 Papers
2.8K Citations
Glenn H. Fredrickson is an academic researcher from University of California, Santa Barbara. The author has contributed to research in topics: Copolymer & Phase (matter). The author has an hindex of 81, co-authored 418 publications. Previous affiliations of Glenn H. Fredrickson include University of California, Berkeley & Stanford University.
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Papers
Triblock copolymer syntheses of mesoporous silica with periodic 50 to 300 angstrom pores
Dongyuan Zhao,Jianglin Feng,Qisheng Huo,Nicholas A. Melosh,Glenn H. Fredrickson,Bradley F. Chmelka,Galen D. Stucky +6 more
TL;DR: Use of amphiphilic triblock copolymers to direct the organization of polymerizing silica species has resulted in the preparation of well-ordered hexagonal mesoporous silica structures (SBA-15) with uniform pore sizes up to approximately 300 angstroms.
11.6K
Block Copolymer Thermodynamics: Theory and Experiment
TL;DR: Block copolymers are macromolecules composed of sequences, or blocks, of chemically distinct repeat units that make possible the sequential addition of monomers to various carbanion-ter minated ("living") linear polymer chains.
3.8K
The theory of polymer dynamics
TL;DR: In this article, molecular theories of flow and deformation may facilitate the design of branched polymers with tailored rheological properties and improved adhesives, and improved theories relating to associating polymers should aid in the development of thickening agents and coatings.
3.2K
Block Copolymers—Designer Soft Materials
TL;DR: The Knitting Pattern as mentioned in this paper is a block copolymer that was discovered by Reimund Stadler and his coworkers and reflects a delicate free-energy minimization that is common to all blockcopolymer materials.
3.1K
The equilibrium theory of inhomogeneous polymers
Glenn H. Fredrickson
- 01 Dec 2005
TL;DR: In this paper, the authors present a model of many-chain systems with Fourier series and transforms, which they call Fourier Series and Transforms (FST) and Gaussian Integrals and Probability Theory.
1.3K