Dielectric Relaxation in High Polymers, II. : Vinylic High Polymers
スポンサーリンク
概要
- 論文の詳細を見る
In vinylic high polymers, there are two absorption mechanisms, one is at high temperatures and the other at low temperatures. From a general consideration, it is possible to separate the motion of high polymer molecule into two distinct modes, rotation and vibration. The high temperature absorption is attributed to the rotational relaxation and the low temperature absorption to the vibrational relaxation. A formal relation is obtained which connects the low temperature absorption curve to the vibrational frequency spectrum.
- 社団法人日本物理学会の論文
- 1960-02-05
著者
-
TANAKA Tomoyasu
Department of Physics, Faculty of Science, Kyushu University
-
Ishida Yoichi
Department Of Applied Chemistry Faculty Of Engineering Kyusyu University
-
Tanaka Tomoyasu
Department Of Engineering Physics Chubu University
関連論文
- Crystal Structure of the Metastable State of Ferroelectric Lead Germanate
- Discussion on the Mechanical Behavior of Carbon Nanotube/C60 Composite Based on Observation of Interfacial Structure
- Processing of Ductile Carbon Nanotube/C60 Composite
- A-47. Morphological Studies on the Methylnitrosourea Induced Tumors of the Nerve Roots and Peripheral Nerve
- Clinicopathological Study of Brain Tumor Radiotherapy
- On the Theory of Cooperative Phenomena
- Structure modelling of Σ3 and Σ9 coincident boundaries in CVD diamond thin films
- Transmission Electron Microscopic Observation of Grain Boundaries in CVD Diamond Thin Films
- Exoerimental induction of gliogenous tumors
- Dielectric Relaxation in High Polymers, II. : Vinylic High Polymers
- Dielectric Relaxation in High Polymers
- Preferred Orientations in Compression Deformed and Annealed Polycrystalline C60
- Disorder Entropy at the Phase Transition of AgI and Ag_2S
- Simulation for Growth of Snowflake
- Note on the Partition Function of a Free Rotator
- Two-Dimensional Model of Ice-VII to Ice-VIII Phase Transition : Progress Letters
- Structure of the Density Matrices in the Cluster Variation Method : Choices between Local Fields and Correlation Functions