AbstractLet ƒ be an homogeneous polynomial on Rn. First an analog of the Borel theorem is proved for the distributions which appear at the poles of the distribution |ƒ|s (s ∈ C). If ƒ is the relative invariant of an irreducible regular prehomogeneous vector space, the preceding result is used to characterize the functions which are obtained by integration on the fibers of ƒ
In this paper, we gather the various known constructions of prehomogeneous vector spaces and give so...
For a number field K with ring of integers O-K, we prove an analogue over finite rings of the form O...
ABSTRACT. We explicitly construct the irreducible relative invari-ant of the prehomogeneous vector s...
AbstractLet ƒ be an homogeneous polynomial on Rn. First an analog of the Borel theorem is proved for...
We investigate homogeneity in the special Colombeau algebra on Rd as well as on the pierced space Rd...
We investigate homogeneity in the special Colombeau algebra on Rd as well as on the pierced space Rd...
We study the distribution of Mahler’s measures of reciprocal polynomials with complex co-efficients ...
AbstractWe explicitly construct the irreducible relative invariant of the prehomogeneous vector spac...
AbstractAn analytic distribution on K⊆C is an element, ν, of the dual of the space of analytic funct...
AbstractConnections between the shape of the unit ball of a Banach space and analytic properties of ...
The paper raises two problems on the homogeneous polynomial invariants for the cubic-homogeneous f...
proved about the tail distribution of homogeneous polynomials of Rademacher functions with an optima...
In this paper we consider the uniform distribution of points in compact metric spaces. We assume tha...
In this paper, we gather the various known constructions of prehomogeneous vector spaces and give so...
In this paper, we gather the various known constructions of prehomogeneous vector spaces and give so...
In this paper, we gather the various known constructions of prehomogeneous vector spaces and give so...
For a number field K with ring of integers O-K, we prove an analogue over finite rings of the form O...
ABSTRACT. We explicitly construct the irreducible relative invari-ant of the prehomogeneous vector s...
AbstractLet ƒ be an homogeneous polynomial on Rn. First an analog of the Borel theorem is proved for...
We investigate homogeneity in the special Colombeau algebra on Rd as well as on the pierced space Rd...
We investigate homogeneity in the special Colombeau algebra on Rd as well as on the pierced space Rd...
We study the distribution of Mahler’s measures of reciprocal polynomials with complex co-efficients ...
AbstractWe explicitly construct the irreducible relative invariant of the prehomogeneous vector spac...
AbstractAn analytic distribution on K⊆C is an element, ν, of the dual of the space of analytic funct...
AbstractConnections between the shape of the unit ball of a Banach space and analytic properties of ...
The paper raises two problems on the homogeneous polynomial invariants for the cubic-homogeneous f...
proved about the tail distribution of homogeneous polynomials of Rademacher functions with an optima...
In this paper we consider the uniform distribution of points in compact metric spaces. We assume tha...
In this paper, we gather the various known constructions of prehomogeneous vector spaces and give so...
In this paper, we gather the various known constructions of prehomogeneous vector spaces and give so...
In this paper, we gather the various known constructions of prehomogeneous vector spaces and give so...
For a number field K with ring of integers O-K, we prove an analogue over finite rings of the form O...
ABSTRACT. We explicitly construct the irreducible relative invari-ant of the prehomogeneous vector s...
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