Congruence relations of multialgebras

In this paper, we exhibit a noncongruence subgroup whose space of weight 3 cusp forms S 3 ( ) admits a basis satisfying the Atkin-Swinnerton-Dyer congruence relations with two weight 3 newforms for certain congruence subgroups. This gives a modularity interpretation of the motive attached to S 3 ( )

on groups and rings are defined, and their properties are discussed in detail, where L denotes any given complete Brouwerian lattice and T any given infinitely v-distributive t-norm on L .

Given any distinct prime numbers p, q, and r satisfying certain simple congruence conditions, we display a congruence relation between the fundamental units for the biquadratic field K = Q( √ pr, √ q ), modulo a certain prime ideal of O K . This congruence in particular implies the validity of the e

Multivarieties are classes of algebras presented by exclusive-or's of equations. A full characterization of categories which are equivalent to multivarieties is presented, close to Lawvere's characterization of varieties. A comparison with Diers' concept of multialgebraic category is presented: this