Geometric Enumeration Problems for Lattices and Embedded ℤ-Modules

Abstract: In this review, we count and classify certain sublattices of a given lattice, as motivated by crystallography. We use methods from algebra and algebraic number theory to find and enumerate the sublattices according to their index. In addition, we use tools from analytic number theory to determine the asymptotic behaviour of the corresponding counting functions. Our main focus lies on similar sublattices and coincidence site lattices, the latter playing an important role in crystallography. As many results are … Show more

“…Since any (positive) integer can be written as a sum of four squares, this implies that the spectrum σ is the set of all odd natural numbers. The CSLs can be calculated explicitly [11]. They read…”

“…Similarly, one can calculate the number f D4 (n) of different CSLs of a given index n. Clearly, f D4 (n) ≤ f rot D4 (n), and we do not have equality in general, since two CLSs that are not symmetrically equivalent may generate the same CSL. In fact, we have the following theorem which tells us when two CSLs are equal [11].…”

“…Along the same lines as for the hypercubic lattices one can calculate the number of coincidence rotations and the number of CSLs of a given index n. The expressions obtained are slightly more complicated, since one has to distinguish between the three cases p = 5, p = ±1 (mod 5) and p = ±2 (mod 5), as these primes behave differently and correspond to the ramifying, splitting and inert primes of Z[τ ]. If 120f rot A4 (n) is the number of coincidence rotations -recall that the point group of L contains 120 elements -its generating Dirichlet series is given by Similarly, we have for the number of CSLs Here, a criterion analogous to Theorem 2.1 exists, which will be published elsewhere [11].…”

“…If 7200f rot I (n) denotes the number of coincidence rotations and f I (n) the number of CSMs, we get again f rot I (n) ≥ f I (n). Again, equality fails to hold in general, and a complete analogue of Theorem 2.1 tells us which CSMs are equal [11].…”

Coincidences in four dimensions

“…Since any (positive) integer can be written as a sum of four squares, this implies that the spectrum σ is the set of all odd natural numbers. The CSLs can be calculated explicitly [11]. They read…”

“…Similarly, one can calculate the number f D4 (n) of different CSLs of a given index n. Clearly, f D4 (n) ≤ f rot D4 (n), and we do not have equality in general, since two CLSs that are not symmetrically equivalent may generate the same CSL. In fact, we have the following theorem which tells us when two CSLs are equal [11].…”

“…Along the same lines as for the hypercubic lattices one can calculate the number of coincidence rotations and the number of CSLs of a given index n. The expressions obtained are slightly more complicated, since one has to distinguish between the three cases p = 5, p = ±1 (mod 5) and p = ±2 (mod 5), as these primes behave differently and correspond to the ramifying, splitting and inert primes of Z[τ ]. If 120f rot A4 (n) is the number of coincidence rotations -recall that the point group of L contains 120 elements -its generating Dirichlet series is given by Similarly, we have for the number of CSLs Here, a criterion analogous to Theorem 2.1 exists, which will be published elsewhere [11].…”

“…If 7200f rot I (n) denotes the number of coincidence rotations and f I (n) the number of CSMs, we get again f rot I (n) ≥ f I (n). Again, equality fails to hold in general, and a complete analogue of Theorem 2.1 tells us which CSMs are equal [11].…”

Coincidences in four dimensions

“…Quaternions are certainly also helpful in 4-space, and further progress in this direction is in sight [7], at least for simple coincidences. More complicated, however, seems the situation in higher dimensions, even for the class of root lattices, and that might be a good problem to solve.…”

Coincidence Site Modules in 3-Space

Similar Sublattices and Submodules