Hecke Operators and Γ(2) Subgroups

In this paper we describe the space of the cusp forms with the weight \(k\) for the congruence subgroup \(\Gamma_{1}(N), S_{k}\left(\Gamma_{1}(N)\right)\), using Eichler-Shimura isomorphism, Shapiro lemma and the theory of group cohomology. An algorithm computing an integral basis of \(S_{k}\left(\G

We define a new action of the symmetric group and its Hecke algebra on polynomial rings whose invariants are exactly the quasi-symmetric polynomials. We interpret this construction in terms of a Demazure character formula for the irreducible polynomial modules of a degenerate quantum group. We use t

Let A and G be finite groups with coprime orders, and suppose that A acts on G by automorphisms. Let π G A Irr A G → Irr C G A be the Glauberman-Isaacs correspondence. Let B ≤ A and let χ ∈ Irr A G . We examine the conjecture that χπ G A is an irreducible constituent of the restriction of χπ G B to

Normalizers of 1 0 (m)+w 2 and 1 0 (m)+w 3 in PSL 2 (R) are determined. The determination of such normalizers enables us to determine the normalizers (in PSL 2 (R)) of the congruence subgroups G 0 4 (A) and G 0 6 (A) of the Hecke groups G 4 and G 6 .

## 0. htroductio11 I i i 1967 R. 31. DIDLEY [4] introduced the notion of so-called CrC-set.s. These are sul)sets of a HILRERY space on which the canonical linear GAtrssian process on This HII~HERT space has a sample-coiitin~ious version. DVULEY fotiiicl a sufficient c.ondition for a set to l)e a GC