Tsurpal, I. A.
Overview
Works:  6 works in 9 publications in 2 languages and 44 library holdings 

Roles:  Author 
Classifications:  QA935, 531 
Publication Timeline
.
Most widely held works by
I. A Tsurpal
Stress concentration about curvilinear holes in physically nonlinear elastic plates by
Aleksandr Nikolaevich Guzʹ(
Book
)
4 editions published in 1966 in English and held by 34 WorldCat member libraries worldwide
An approximate solution method of plane physical nonlinear problems of stress concentration about curvilinear holes in thin plates made of a material subject to a nonlinear law of elasticity is given. The solutions are represented in the form of expansions in the small parameter mu and epsilon. The determination of the stress function F for a physically nonlinear elastic plate with a hole reduces for each approximation to the integration of nonlinear differential equations. Stress concentration about an elliptic hole is considered in zero, first, and second approximation. The coefficient of stress concentration kappa is found on the contour of the hole, depending nonlinearly on the tensile forces Rho, the ellipticity of the hole, and parameter lambda characterizing the mechanical properties of the material. Tables represent the values of the coefficient of stress concentration for various values of the parameters Rho, lambda and epsilon
4 editions published in 1966 in English and held by 34 WorldCat member libraries worldwide
An approximate solution method of plane physical nonlinear problems of stress concentration about curvilinear holes in thin plates made of a material subject to a nonlinear law of elasticity is given. The solutions are represented in the form of expansions in the small parameter mu and epsilon. The determination of the stress function F for a physically nonlinear elastic plate with a hole reduces for each approximation to the integration of nonlinear differential equations. Stress concentration about an elliptic hole is considered in zero, first, and second approximation. The coefficient of stress concentration kappa is found on the contour of the hole, depending nonlinearly on the tensile forces Rho, the ellipticity of the hole, and parameter lambda characterizing the mechanical properties of the material. Tables represent the values of the coefficient of stress concentration for various values of the parameters Rho, lambda and epsilon
Raschet ėlementov konstrukt︠s︡iĭ iz nelineĭouprugikh materialov by
I. A T︠S︡urpal(
Book
)
1 edition published in 1976 in Russian and held by 4 WorldCat member libraries worldwide
1 edition published in 1976 in Russian and held by 4 WorldCat member libraries worldwide
Vyrezy v nesushchikh konstrukt︠s︡ii︠a︡kh by
I. N Preobrazhenskiĭ(
Book
)
1 edition published in 1984 in Russian and held by 2 WorldCat member libraries worldwide
1 edition published in 1984 in Russian and held by 2 WorldCat member libraries worldwide
A study of the stress state near curvilinear holes in shells with a nonlinear elasticity law by
I. A T︠S︡urpal(
)
1 edition published in 1966 in English and held by 2 WorldCat member libraries worldwide
1 edition published in 1966 in English and held by 2 WorldCat member libraries worldwide
Mekhanikomatematicheskie issledovanii︠a︡ puteī povyshenii︠a︡ nadëzhnosti i dolgovechnosti mashin : sbornik nauchnykh trudov(
Book
)
1 edition published in 1984 in Russian and held by 1 WorldCat member library worldwide
1 edition published in 1984 in Russian and held by 1 WorldCat member library worldwide
On the Propagation of Waves in a Physically Nonlinear Medium Weakened by a Cylindrical or Spherical Cavity(
Book
)
1 edition published in 1974 in English and held by 1 WorldCat member library worldwide
Differential equations of the propagation of cylindrical waves are obtained taking into account the change of volume and form in a nonlinear elastic medium. The fundamental equations for compressible and incompressible materials are found, taking into account small physical nonlinearity. The fundamental equations of the propagation of spherical waves in a nonlinear elastic medium are determined for small physical nonlinearity, which is characterized by the square of deformation intensity
1 edition published in 1974 in English and held by 1 WorldCat member library worldwide
Differential equations of the propagation of cylindrical waves are obtained taking into account the change of volume and form in a nonlinear elastic medium. The fundamental equations for compressible and incompressible materials are found, taking into account small physical nonlinearity. The fundamental equations of the propagation of spherical waves in a nonlinear elastic medium are determined for small physical nonlinearity, which is characterized by the square of deformation intensity
Audience Level
0 

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Related Identities
 Guzʹ, Aleksandr Nikolaevich Author
 Savin, Guriĭ Nikolaevich
 Shul'ga, N. A.
 SpringerLink (Online service) Other
 Preobrazhenskiĭ, I. N. (Igorʹ Nikolaevich) Author
 NATIONAL AERONAUTICS AND SPACE ADMINISTRATION WASHINGTON DC
 Sulima, I. M.
 FOREIGN TECHNOLOGY DIV WRIGHTPATTERSON AFB OHIO
 Sabodash, P. F.
 Ukraïnsʹka silʹsʹkohospodarsʹka akademii︠a︡