Detail publikace

Non-linear affinity in Mohr s plane

Originální název

Non-linear affinity in Mohr s plane

Anglický název

Non-linear affinity in Mohr s plane

Jazyk

en

Originální abstrakt

Mechanical properties of particular materials (also granular and powdery materials, dispersions, suspensions, liquids with high viscosity,) are usually described by boundary functional dependences of shear stresses and direct stresses - so called material characteristics. These material characteristics are envelope curves of all limiting Mohr s circles. If the material characteristic is a linear function - all limiting Mohr s circles are linear affine, if the material characteristic is a non-linear function - all limiting Mohr s circles and respective stress tensors are non-linear affine. This non-linear affinity can be mathematically described.

Anglický abstrakt

Mechanical properties of particular materials (also granular and powdery materials, dispersions, suspensions, liquids with high viscosity,) are usually described by boundary functional dependences of shear stresses and direct stresses - so called material characteristics. These material characteristics are envelope curves of all limiting Mohr s circles. If the material characteristic is a linear function - all limiting Mohr s circles are linear affine, if the material characteristic is a non-linear function - all limiting Mohr s circles and respective stress tensors are non-linear affine. This non-linear affinity can be mathematically described.

Dokumenty

BibTex


@inproceedings{BUT24037,
  author="Jiří {Malášek}",
  title="Non-linear affinity in Mohr s plane",
  annote="Mechanical properties of particular materials (also granular and powdery materials, dispersions, suspensions, liquids with high viscosity,) are usually described by boundary functional dependences of shear stresses and direct stresses - so called material characteristics. These material characteristics are envelope curves of all limiting Mohr s circles. If the material characteristic is a linear function - all limiting Mohr s circles are linear affine, if the material characteristic is a non-linear function - all limiting Mohr s circles and respective stress tensors are non-linear affine. This non-linear affinity can be mathematically described.",
  address="Institute of Thermomechanics   Academy of Sciences of the Czech Republic, v.v.i., Prague",
  booktitle="Engineering Mechanics 2007",
  chapter="24037",
  edition="1",
  institution="Institute of Thermomechanics   Academy of Sciences of the Czech Republic, v.v.i., Prague",
  year="2007",
  month="may",
  pages="171--172",
  publisher="Institute of Thermomechanics   Academy of Sciences of the Czech Republic, v.v.i., Prague",
  type="conference paper"
}