| | using JSON3 |
| | using HDF5 |
| | using GaussianBasis |
| | using StaticArrays |
| | using Base |
| |
|
| | include("Shells.jl") |
| |
|
| | abstract type ArrayFields end |
| |
|
| | Base.iterate(data::F, state=1) where F <:ArrayFields = begin |
| | nF = fieldcount(F) |
| | state > nF ? |
| | nothing : |
| | ((fieldname(F, state), getfield(data, state)), state + 1) |
| | end |
| |
|
| | Base.length(data::F) where F <:ArrayFields = fieldcount(F) |
| |
|
| | """ |
| | Mono-electronic Integrals. |
| | |
| | Input wave functions (ψ1, ψ2) are primitive, spherical GTO-shells |
| | with unit coefficients, i.e. |
| | |
| | ψ(C + r) = rˡ ⋅ Yₗₘ(r/|r|) ⋅ exp(-α |r|²) |
| | |
| | where C is `ψ.center`, α is `ψ.exp`, and the magnetic quantum number m |
| | takes all possible values in {-l, ..., l} within each subshell. |
| | |
| | # Inputs |
| | - `xyz` : center of ψ2 (ψ1 is centered at 0) |
| | - `l` : pair of angular momenta (l₁, l₂) |
| | - `exp` : exponents (α₁, α₂) |
| | - `Z` : atomic charges used to compute the nuclear integral. |
| | |
| | # Targets |
| | - `overlap` integrals `S₁₂ = ∫ ψ1 ⋅ ψ2` |
| | - `kinetic` integrals `T₁₂ = 1/2 * ∫ ∇ψ1 ⋅ ∇ψ2` |
| | - `nuclear` attraction integrals |
| | |
| | `N₁₂ = ∫ ψ1 ⋅ [(Z₁ / |r|) + (Z₂ / |r - xyz|)] ⋅ ψ2` |
| | |
| | # Note |
| | |
| | Mono-electronic integrals are square matrices of shape `D × D` with |
| | |
| | D = (2 * l1 + 1) + (2 * l2 + 1) |
| | |
| | Indices correspond to increasing values of `m1 ∈ {-l1, …, l1}` first, |
| | then increasing values of `m2 ∈ {-l2, …, l2}`. |
| | """ |
| | struct MonoIntegral{T} <: ArrayFields |
| | l :: Vector{Int64} |
| | exp :: Union{SArray, Array{T}} |
| | xyz :: Union{SArray, Array{T}} |
| | overlap :: Array{T} |
| | kinetic :: Array{T} |
| | nuclear :: Array{T} |
| | Z :: Array{Int64} |
| | end |
| |
|
| | """ |
| | Object storing 2-electron 2-center integrals. |
| | |
| | Electronic interactions (ij|ij) and (ij|ji) are quadratic |
| | w.r.t. two input wave functions (ψi, ψj), characterized |
| | by the same entries as `MonoIntegral`. |
| | |
| | Targets: |
| | - `coulomb` integral J |
| | """ |
| | struct BiIntegral2c{T} <: ArrayFields |
| | l :: Tuple{Integer} |
| | exp :: Array{T} |
| | xyz :: Array{T} |
| | coulomb :: Array{T} |
| | end |
| |
|
| | """Object for storing bi-electronic integrals""" |
| | struct BiIntegral4c{T} <: ArrayFields |
| | l :: Vector{Int64} |
| | exp :: Array{T} |
| | xyz :: Array{T} |
| | ijkl :: Array{Int16} |
| | Bijkl :: Array{Float32} |
| | target_size :: Vector{Int32} |
| | end |
| | function BiIntegral4c( |
| | l :: Vector{Int64}, |
| | exp :: Array{T}, |
| | xyz :: Array{T}, |
| | ijkl :: Array{Int16}, |
| | Bijkl :: Array{Float32} |
| | ) where T<:Real |
| | target_size :: Array{Int32} = [length(Bijkl)] |
| | BiIntegral4c{T}(l, exp, xyz, ijkl, Bijkl, target_size) |
| | end |
| |
|
| | "Stack array fields, excluding constant fields" |
| | function stack(rows::Vector{F}, exclude::Vector{Symbol}) where F<:ArrayFields |
| | out = [] |
| | for f in fieldnames(F) |
| | out_f = f ∈ exclude ? |
| | getfield(rows[1], f) : |
| | Base.stack([getfield(row, f) for row in rows]) |
| | push!(out, out_f) |
| | end |
| | F(out...) |
| | end |
| | function stack(rows::Vector{F}) where F<:ArrayFields |
| | stack(rows, Symbol[]) |
| | end |
| | function stack(rows::Vector{MonoIntegral}) :: MonoIntegral |
| | stack(rows, [:l]) |
| | end |
| | function stack(rows::Vector{BiIntegral4c}) :: BiIntegral4c |
| | out = map(rows[1]) do field |
| | k, fk = field |
| | if k ∈ (:ijkl, :Bijkl, :target_size) |
| | reduce(vcat, map(r -> getfield(r, k), rows)) |
| | elseif k == :l |
| | rows[1].l |
| | else |
| | Base.stack(map(r -> getfield(r, k), rows)) |
| | end |
| | end |
| | BiIntegral4c(out...) |
| | end |
| |
|
| | "Dump JSON output" |
| | function JSONdump(out::String, dset::Any) |
| | open(out, "w") do io |
| | JSON3.pretty(io, dset) |
| | end |
| | end |
| |
|
| | "Dump HDF5 output" |
| | function h5dump(out::String, dset::F) where F<:ArrayFields |
| | h5open(out, "w") do io |
| | foreach(dset) do (k, xk) |
| | T = eltype(xk) |
| | S = isa(xk, AbstractArray) ? size(xk) : (length(xk),) |
| | dset = create_dataset(io, String(k), datatype(T), S) |
| | write(dset, xk) |
| | end |
| | end |
| | end |
| |
|
| | """ |
| | mono_integral(basis::Basis) |
| | |
| | Compute a dense mono-electronic integral matrix. |
| | """ |
| | function mono_integral(basis::Basis) |
| | mol, shells = basis |
| | bset = BasisSet("A-B*", mol, shells) |
| | l = [shell.l for shell in shells] |
| | a1, a2 = bset[1].exp, bset[2].exp |
| | xyz = bset[2].atom.xyz |
| | S = overlap(bset) |
| | T = kinetic(bset) |
| | N = nuclear(bset) |
| | Z = [bset[1].atom.Z, bset[2].atom.Z] |
| | MonoIntegral(l, [a1; a2], xyz, S, T, N, Z) |
| | end |
| |
|
| | """ |
| | bi_integral(basis::Basis[, cutoff=.000_01]) |
| | |
| | Compute a sparse bi-electronic integral matrix. |
| | """ |
| | function bi_integral(basis::Basis, cutoff::Float64 = .000_01) |
| | |
| | mol, shells = basis |
| | bset = BasisSet("mol", mol, shells) |
| | l = [shell.l for shell in shells] |
| | |
| | B = sparseERI_2e4c(bset, .000_1) |
| | if length(B[1]) >= 1 |
| | ijkl, Bijkl = Base.stack(B[1], dims=1), Vector{Float32}(B[2]) |
| | else |
| | println("no ERI") |
| | ijkl, Bijkl = Array{Int16}([1, 1, 1, 1]'), Vector{Float32}([0.]) |
| | end |
| | exp = Base.stack(map(shell -> shell.exp, bset.basis)) |
| | xyz = Base.stack(map(shell -> shell.atom.xyz, bset.basis)) |
| | BiIntegral4c(l, exp, xyz, ijkl, Bijkl) |
| | end |
| |
|
