On the Non-linear Generalization of the Gyarmati Principle and Theorem

On the basis of the variational principle proposed by GYARMATI we determine the canonical equations of non-equilibrium thermodynamics. It was demonstrated that the transport equations governing irreversible processes are similarly determined by GYARMATI'S principle, further on the canonical equation

## Abstract In this paper the GYARMATI's governing principle of dissipative processes is applied to a continuous material system with reversible polarization, magnetization and irreversible electric conduction phenomena due to finite electrical conductivity. After the general treatment of governing

A generalization of Blaschke's Rolling Theorem for not necessarily convex sets is proved that exhibits an intimate connection between a generalized notion of convexity, various concepts in mathematical morphology and image processing, and a certain smoothness condition. As a consequence a geometric

A b s t r a c t , A generalized Dirac equation is presented as a model theory of disturbed Lorentz invariance. The physical properties of this model and experimental consequences are discussed. A program its described how such Lorentz noninvariant equations may be produced by cosmologicel induction

For X a hypergraph on vertex set V and t : X+ R+, set We give a simple proof, based on an argument of Pippenger and Spencer [19] of the following rather general statement. Theorem 1.5. Fix k and 1. Let X be a k-bounded hypergraph and t a fractional matching of X. Let, furthermore, c , , . . . , c,

This paper focuses on the design of non-linear parametric controllers, around a nominal input/output trajectory of a discrete-time non-linear system. The main result provided herein is a relationship between the tracking performance of the closed-loop control system in the neighbourhood of a nominal