KASPRZYK et al., 1971 - Google Patents
Asymptotic properties of the solutions of a certain nonlinear system(Hartman-Olech theorem to prove asymptotic stability of mechanical system with nonlinear elastic …KASPRZYK et al., 1971
- Document ID
- 13102668915400966508
- Author
- KASPRZYK S
- GLUCH L
- Publication year
- Publication venue
- Zagadnienia Drgan Nieliniowych
External Links
Similar Documents
| Publication | Publication Date | Title |
|---|---|---|
| KASPRZYK et al. | Asymptotic properties of the solutions of a certain nonlinear system(Hartman-Olech theorem to prove asymptotic stability of mechanical system with nonlinear elastic characteristic, analyzing differential equations of motion) | |
| Nowacki | Coupled fields in mechanics of solids | |
| DUBROVSKA et al. | Development of exact solutions of nonlinear differential equations of plane theory of elasticity with the aid of group theory(Exact solutions of elasticity theory nonlinear differential equations by Lie group theory methods) | |
| BARTKOWSKI | Schwarz' differential invariant in problems involving the central motion of a mass point | |
| Babister | Non-linear differential equations having both cubic damping and stiffness | |
| CHAFEE | A stability analysis for a semilinear parabolic partial differential equation(Stability analysis for semilinear parabolic partial differential equations) | |
| KASPRZYK et al. | Global asymptotic stability of a certain nonlinear system(Mechanical system with inertial vibration sensor and nonlinear spring, obtaining global asymptotic stability of zero solution of differential equations describing natural vibration) | |
| ALENGRIN | Nonlinear discrete continuous filtering: Theory, application to the estimation of parameters of a linear system; extension to other problems(Nonlinear discrete filtering and application to parameter evaluation in nonlinear systems) | |
| GALUZZI | Properties of a-topologies on a commutative ring(Nonlinear partial differential system analysis) | |
| NAPOLITANO | Study of two new classes of functions related to the complementary error function and its repeated integrals, and appearing in parabolic equations | |
| Chernina | Natural vibrations of a thin closed spherical shell | |
| Salvadori | One-parameter families of Liapunov functions in studies of stability(Stability theorems reformulation with one-parameter families of Liapunov functions, discussing applications to Matrosov and Rouche asymptotic stability theorems) | |
| ALBERTONI et al. | Slip-coefficient expression is derived using an exact analytical solution of the slip flow problem | |
| KUDRIAVTSEV et al. | First fundamental problem of the theory of elasticity for a biperiodic system of cuts | |
| FORBRICH | The FOODES program description(computer program for solving differential equations with application to fluid mechanics)[Interim Report] | |
| KLIMOV et al. | Asymptotic method used to solve two nonlinear second-order differential equations, concerning the motion of an astatic gyro in a cardan suspension with dynamically unstable rotor | |
| BONDARENKO | A class of exact solutions to differential equations of the dynamics of elasticity theory(Class of homogeneous polynomial solutions to differential equations of motion of elastic body) | |
| BRUN | Explicit self-similar strong-shock solutions of the second type(Existence of motions of second type in explicit self similar strong shock solutions of Euler equations when velocity is linear function of coordinate) | |
| SALVADORI | On a total stability concept in continuous or discrete systems | |
| BONDARENKO | Use of Gq functions for the representation of solutions to equations of statics in the theory of elasticity | |
| IUREV | Chaplygin type equations for the solution of plane gas motion | |
| RUSHCHITSKII | Two-dimensional problem of the theory of a mixture of two solids(potential theory of interacting elastic continua) | |
| WEINSTEIN | Discussion of recent results obtained using singular partial differential equations and their applications | |
| AFONIN | Application of the averaging method in a study of a gyroscopic system(Vertical two axis gyrostabilizer equations of motion analysis by averaging method) | |
| VOROSHILOVA et al. | Errors of a compensated gyrocompass in maneuvering |