QCaml/Basis/KinInt.ml

open Util
open Constants
open Lacaml.D

module Am  = AngularMomentum
module Bs  = Basis
module Co  = Coordinate
module Cs  = ContractedShell
module Csp = ContractedShellPair
module Po  = Powers
module Ps  = PrimitiveShell
module Psp = PrimitiveShellPair

type t = Mat.t
external matrix : t -> Mat.t = "%identity"
external of_matrix : Mat.t -> t = "%identity"

let cutoff = integrals_cutoff

let to_powers x = 
  let open Zkey in
  match to_powers x with
  | Six x -> x
  | _ -> assert false

(** Computes all the kinetic integrals of the contracted shell pair *)
let contracted_class shell_a shell_b : float Zmap.t = 

  match Csp.make shell_a shell_b with
  | Some shell_p ->
    begin
      (* Pre-computation of integral class indices *)
      let class_indices =  Csp.zkey_array shell_p in

      let contracted_class = 
        Array.make (Array.length class_indices) 0.
      in

      (* Compute all integrals in the shell for each pair of significant shell pairs *)

      let sp = Csp.shell_pairs shell_p in
      let a_minus_b = 
        Csp.a_minus_b shell_p
      in
      let norm_coef_scales =
        Csp.norm_scales shell_p
      in

      for ab=0 to (Array.length sp - 1)
      do
        let coef_prod =
          (Csp.coefficients shell_p).(ab) 
        in
        (** Screening on thr product of coefficients *)
        if (abs_float coef_prod) > 1.e-4*.cutoff then
          begin
            let center_pa = 
              Psp.center_minus_a sp.(ab)
            in
            let expo_inv = 
              (Csp.exponents_inv shell_p).(ab)
            in
            let expo_a = 
              Ps.exponent (Psp.shell_a sp.(ab))
            and expo_b = 
              Ps.exponent (Psp.shell_b sp.(ab))
            in

            let xyz_of_int k =
              match k with
              | 0 -> Co.X
              | 1 -> Co.Y
              | _ -> Co.Z
            in
            Array.iteri (fun i key ->
                let (angMomA,angMomB) = to_powers key in
                let ov a b k = 
                  let xyz = xyz_of_int k in
                  Overlap_primitives.hvrr (a, b)
                    expo_inv
                    (Co.get xyz a_minus_b,
                    Co.get xyz center_pa) 
                in
                let f k = 
                  let xyz = xyz_of_int k in 
                  ov (Po.get xyz angMomA) (Po.get xyz angMomB) k
                and g k =
                  let xyz = xyz_of_int k in 
                  let s1 = ov (Po.get xyz angMomA - 1) (Po.get xyz angMomB - 1) k
                  and s2 = ov (Po.get xyz angMomA + 1) (Po.get xyz angMomB - 1) k
                  and s3 = ov (Po.get xyz angMomA - 1) (Po.get xyz angMomB + 1) k
                  and s4 = ov (Po.get xyz angMomA + 1) (Po.get xyz angMomB + 1) k
                  and a = float_of_int_fast (Po.get xyz angMomA)
                  and b = float_of_int_fast (Po.get xyz angMomB) 
                  in
                  0.5 *. a *. b *. s1 -. expo_a *. b *. s2 -. expo_b *. a *. s3 +. 
                    2.0 *. expo_a *. expo_b *. s4
                in
                let s = Array.init 3 f
                and k = Array.init 3 g
                in
                let norm =  norm_coef_scales.(i) in
                let integral = chop norm (fun () ->
                    k.(0)*.s.(1)*.s.(2) +.
                    s.(0)*.k.(1)*.s.(2) +.
                    s.(0)*.s.(1)*.k.(2) 
                  ) in 
                contracted_class.(i) <- contracted_class.(i) +. coef_prod *. integral
              ) class_indices
          end
      done;
      let result = 
        Zmap.create (Array.length contracted_class)
      in
      Array.iteri (fun i key -> Zmap.add result key contracted_class.(i)) class_indices;
      result
    end
  | None -> Zmap.create 0


(** Create kinetic energy matrix *)
let of_basis basis =
  let to_powers x =
    let open Zkey in
    match to_powers x with
    | Three x -> x
    | _ -> assert false
  in

  let n     = Bs.size basis
  and shell = Bs.contracted_shells basis
  in

  let result = Mat.create n n in
  for j=0 to (Array.length shell) - 1 do
    for i=0 to j do
      (* Compute all the integrals of the class *)
      let cls =
        contracted_class shell.(i) shell.(j)
      in

      Array.iteri (fun j_c powers_j ->
          let j_c = Cs.index shell.(j) + j_c + 1 in
          let xj = to_powers powers_j in
          Array.iteri (fun i_c powers_i ->
              let i_c = Cs.index shell.(i) + i_c + 1 in
              let xi = to_powers powers_i in
              let key =
                Zkey.of_powers_six xi xj
              in
              let value =
                try Zmap.find cls key
                with Not_found -> 0.
              in
              result.{i_c,j_c} <- value;
              result.{j_c,i_c} <- value;
            ) (Am.zkey_array (Singlet (Cs.ang_mom shell.(i))))
        ) (Am.zkey_array (Singlet (Cs.ang_mom shell.(j)))) 
    done;
  done;
  Mat.detri result;
  result

let of_basis_pair first_basis second_basis =
  failwith "Not implemented"

(** Write all kinetic integrals to a file *)
let to_file ~filename kinetic =

  let oc = open_out filename in
  let n =
    Mat.dim1 kinetic
  in

  for j=1 to n  do
    for i=1 to j do
      if (abs_float kinetic.{i,j} > cutoff) then
        Printf.fprintf oc "%4d %4d %20.12e\n" i j kinetic.{i,j}
    done;
  done;
  close_out oc