AbstractEven lattices similar to their duals are discussed in connection with modular forms for Fricke groups. In particular, lattices of level 2 with large Hermite number are considered, and an analogy between the seven levels l such that 1 + l divides 24 is stressed
la version publiée est une traduction anglaise, et corrigée, de la première version déposéeInternati...
Let L be a finite geometric lattice of rank n with rank function r. (For definitions, see e.g., [3, ...
A lattice L is said to be dually semimodular if for all elements a and b in L, a ∨ b covers b implie...
AbstractEven lattices similar to their duals are discussed in connection with modular forms for Fric...
AbstractIt is shown that ann-dimensional unimodular lattice has minimal norm at most 2[n/24]+2, unle...
This thesis examines unimodular even lattices in Euclidean vector spaces, called theta lattices in t...
Extremal lattices are remarkable objects of number theory. They define many of the densest known sph...
We show that in the case of 2-dimensional lattices, Quebbemann's notion of modular and strongly modu...
AbstractWe show that in the case of 2-dimensional lattices, Quebbemann's notion of modular and stron...
With the help of modular forms, we compute some Jacobi forms associated to n-dimensional extremal la...
In lattice theory the two well known equational class of lattices are the distributive lattices and ...
This book includes a self-contained approach of the general theory of quadratic forms and integral E...
AbstractWe define a pair of constructions of d-dimensional Z-lattices for d = 0 mod 24 from particul...
We look at genera of even unimodular lattices of rank 12 over the ring of integers of Q(5) and of ra...
AbstractModular hermitian lattices over Z[i]and, in particular, unimodular lattices over Z[eπi4] giv...
la version publiée est une traduction anglaise, et corrigée, de la première version déposéeInternati...
Let L be a finite geometric lattice of rank n with rank function r. (For definitions, see e.g., [3, ...
A lattice L is said to be dually semimodular if for all elements a and b in L, a ∨ b covers b implie...
AbstractEven lattices similar to their duals are discussed in connection with modular forms for Fric...
AbstractIt is shown that ann-dimensional unimodular lattice has minimal norm at most 2[n/24]+2, unle...
This thesis examines unimodular even lattices in Euclidean vector spaces, called theta lattices in t...
Extremal lattices are remarkable objects of number theory. They define many of the densest known sph...
We show that in the case of 2-dimensional lattices, Quebbemann's notion of modular and strongly modu...
AbstractWe show that in the case of 2-dimensional lattices, Quebbemann's notion of modular and stron...
With the help of modular forms, we compute some Jacobi forms associated to n-dimensional extremal la...
In lattice theory the two well known equational class of lattices are the distributive lattices and ...
This book includes a self-contained approach of the general theory of quadratic forms and integral E...
AbstractWe define a pair of constructions of d-dimensional Z-lattices for d = 0 mod 24 from particul...
We look at genera of even unimodular lattices of rank 12 over the ring of integers of Q(5) and of ra...
AbstractModular hermitian lattices over Z[i]and, in particular, unimodular lattices over Z[eπi4] giv...
la version publiée est une traduction anglaise, et corrigée, de la première version déposéeInternati...
Let L be a finite geometric lattice of rank n with rank function r. (For definitions, see e.g., [3, ...
A lattice L is said to be dually semimodular if for all elements a and b in L, a ∨ b covers b implie...
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