Structure and bases of modular space sequences (M2k(0(N)))k∈ N* and (S2k(0(N)))k∈ N*. Part I : Strong modular units

Abstract

The modular discriminant is known to structure the sequence of modular forms (M2k(SL2(Z)))k∈ \; N* at level 1.\\ For all positive integer N, we define a strong modular unit N at level N which enables one to structure the sequence (M2k(0(N)))k∈ \; N* in an identical way. We will apply this result to the bases search for each of the spaces (M2k(0(N)))k∈ \; N*.\\ This article is the first in a series of three. In the second part we will propose explicit bases of (M2k(0(N)))k∈ \; N* for 1≤ N ≤ 10. Finally, in a third part, we will apply the results obtained in the first two parts to (S2k(0(N)))k∈ \; N*.