Irreducible representations of free products of infinite groups
Wojciech Młotkowski (1996)
Colloquium Mathematicae
Similarity:
The search session has expired. Please query the service again.
The search session has expired. Please query the service again.
The search session has expired. Please query the service again.
The search session has expired. Please query the service again.
The search session has expired. Please query the service again.
The search session has expired. Please query the service again.
Displaying similar documents to “Macdonald representations of complex reflection groups.”
Irreducible representations of free products of infinite groups
Root systems for two dimensional complex reflection groups.
Hughes, Mervyn C., Morris, Alun O. (2001)
Séminaire Lotharingien de Combinatoire [electronic only]
Similarity:
Projective representations of generalized symmetric groups.
Morris, Alun O., Jones, Huw I. (2003)
Séminaire Lotharingien de Combinatoire [electronic only]
Similarity:
Groups with root-system of type .
Timmesfeld, Franz Georg (2003)
Beiträge zur Algebra und Geometrie
Similarity:
Ramanujan's class invariants and cubic continued fraction
Bruce C. Berndt, Heng Huat Chan, Liang-Cheng Zhang (1995)
Acta Arithmetica
Similarity:
Qualitative properties of separating flows in the Prandtl boundary layer.
Khusnutdinova, N.V. (2001)
Sibirskij Matematicheskij Zhurnal
Similarity:
Radicals and units in Ramanujan's work
Bruce C. Berndt, Heng Huat Chan, Liang-Cheng Zhang (1998)
Acta Arithmetica
Similarity:
Nonlinear stationary surface waves above an underwater ridge.
Kuznetsov, D.S. (2002)
Sibirskij Matematicheskij Zhurnal
Similarity:
On composition factors of finite groups having the same set of element orders as the group .
Aleeva, M.R. (2002)
Sibirskij Matematicheskij Zhurnal
Similarity:
On the number of abelian groups of a given order (supplement)
Hong-Quan Liu (1993)
Acta Arithmetica
Similarity:
1. Introduction. The aim of this paper is to supply a still better result for the problem considered in [2]. Let A(x) denote the number of distinct abelian groups (up to isomorphism) of orders not exceeding x. We shall prove Theorem 1. For any ε > 0, , where C₁, C₂ and C₃ are constants given on page 261 of [2]. Note that 50/199=0.25125..., thus improving our previous exponent 40/159=0.25157... obtained in [2]. To prove Theorem 1, we shall proceed along the line of approach presented...
Integro-local and integral limit theorems on the large deviations of sums of random vectors: Regular distributions.
Borovkov, A.A. (2002)
Sibirskij Matematicheskij Zhurnal
Similarity: