On a Lifting Theorem for the Structured Singular Value

The structured singular value (s.s.v) enables the study of robust stability and performance of a controller in the presence of real parametric uncertainties and complex uncertainties corresponding to neglected dynamics. In spite of the NP-hard characteristic of the problem, it is now possible to com

A state-space method for computing upper bounds for the peak of the structured singular value over frequency for both real and complex uncertainties is presented. These bounds are based on the positivity and Popov criteria for one-sided, sector-bounded and for norm-bounded, block-structured linear u

Let A be a normal Cohen᎐Macaulay local ring which is a homomorphic image of a Gorenstein local ring. Supposing that A is pseudo-rational in the punctured spectrum, and that there exists a proper birational morphism X ª Spec A such that X is pseudo-rational, we show how one can find an integer k ) 0

The singularity may appear at u s 0 and at t s 0 or t s 1 and the function f may be discontinuous. The authors prove that for any p ) 1 and for any positive, nonincreasing function f and nonnegative measurable function k with some integrability conditions, the abovementioned problem has a unique sol

We consider different types of singular boundary value problems for the Monge᎐Ampere operator. The approach is based on existing regularity theory and á subsolution᎐supersolution method. Nonexistence and uniqueness results are also given.