properties of 
They result in many nontrivial properties of quantum immanants.


Some basic properties of the compactness propertiesCn are shown.


Symmetry properties and cocycle properties of the Maslov index are then easily obtained.


The theory of PBW properties of quadratic algebras, to which this


In the process we study the properties of different homogeneous models for ${\mathbb H}H(n).$


The main theme of this paper is that many of the remarkable properties of invariant theory pertaining to semisimple Lie algebras carry over to parabolic subalgebras even though the latter have less structure.


We show that several properties of the semisimple algebras carry over to a certain family of parabolic subalgebras of maximal index in sln.


In this paper we introduce, and study some basic properties of, the algebra of reciprocal polynomials A(V).


Mapping properties of certain Hankel operators are studied.


The mathematical concept of frames is utilized in the analysis of the properties of the sequence of sampling functions.


Some special properties of the analogous space for Fourier transforms on the real axis are presented.


Some special properties of the analogous space for Fourier transforms on the real axis are presented.


The study of multiwavelets involves the consideration of the properties of several (simultaneously) refinable functions.


Flatness of domains and doubling properties of measures supported on their boundary, with applications to harmonic measure


Similar transforms may be defined on homogeneous spaces; in that case we show how special function properties of spherical functions lead to more efficient algorithms.


The projectively adapted properties of theSL(2, ?)harmonic analysis, as applied to the problems, in image processing, are confirmed by computational tests.


and study some properties of the harmonic measure.


The characterization of low pass filters and some basic properties of wavelets, scaling functions and related concepts


Analytic and asymptotic properties of nonsymmetric Linnik's probability densities


In 1994, Kotz, Ostrovskii and Hayfavi [10] carried out a detailed investigation of analytic and asymptotic properties of the density of the distribution for the symmetric case θ=0.

