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QCaml/Utils/Davidson.ml

166 lines
3.8 KiB
OCaml

open Lacaml.D
type t
let make
?guess
?(n_states=1)
?(n_iter=8)
?(threshold=1.e-7)
diagonal
matrix_prod
=
(* Size of the matrix to diagonalize *)
let n = Vec.dim diagonal in
let m = n_states in
(* Create guess vectors u, with unknown vectors initialized to unity. *)
let init_vectors m =
let init_vector k =
Vector.sparse_of_assoc_list n [ (k,1.0) ]
in
Array.init m (fun i -> init_vector (i+1))
|> Matrix.sparse_of_vector_array
|> Matrix.to_mat
in
let guess =
match guess with
| Some vectors -> vectors
| None -> init_vectors m
in
let guess =
if Mat.dim2 guess = n_states then guess
else
(Mat.to_col_vecs_list guess) @
(Mat.to_col_vecs_list (init_vectors (m-(Mat.dim2 guess))) )
|> Mat.of_col_vecs_list
in
let pick_new u =
Mat.to_col_vecs_list u
|> Util.list_pack m
|> List.rev
|> List.hd
in
let u_new = Mat.to_col_vecs_list guess in
let rec iteration u u_new w iter macro =
(* u is a list of orthonormal vectors, on which the operator has
been applied : w = op.u
u_new is a list of vectors which will increase the size of the
space.
*)
(* Orthonormalize input vectors u_new *)
let u_new_ortho =
List.concat [u ; u_new]
|> Mat.of_col_vecs_list
|> Util.qr_ortho
|> pick_new
in
(* Apply the operator to the m last vectors *)
let w_new =
matrix_prod (
u_new_ortho
|> Mat.of_col_vecs_list
|> Matrix.dense_of_mat )
|> Matrix.to_mat
|> Mat.to_col_vecs_list
in
(* Data for the next iteration *)
let u_next =
List.concat [ u ; u_new_ortho ]
and w_next =
List.concat [ w ; w_new ]
in
(* Build the small matrix h = <U_k | W_l> *)
let m_U =
Mat.of_col_vecs_list u_next
and m_W =
Mat.of_col_vecs_list w_next
in
let m_h =
gemm ~transa:`T m_U m_W
in
(* Diagonalize h *)
let y, lambda =
Util.diagonalize_symm m_h
in
(* Express m lowest eigenvectors of h in the large basis *)
let m_new_U =
gemm ~n:m m_U y
and m_new_W =
gemm ~n:m m_W y
in
(* Compute the residual as proposed new vectors *)
let u_proposed =
Mat.init_cols n m (fun i k ->
let delta = lambda.{k} -. diagonal.{i} in
let delta =
if abs_float delta > 1.e-2 then delta
else if delta > 0. then 1.e-2
else (-1.e-2)
in
(lambda.{k} *. m_new_U.{i,k} -. m_new_W.{i,k}) /. delta
)
|> Mat.to_col_vecs_list
in
let residual_norms = List.rev @@ List.rev_map nrm2 u_proposed in
let residual_norm =
List.fold_left (fun accu i -> accu +. i *. i) 0. residual_norms
|> sqrt
in
if Parallel.master then
begin
Printf.printf "%3d " iter;
Vec.iteri (fun i x -> if (i<=m) then Printf.printf "%16.10f " x) lambda;
Printf.printf "%16.8e%!\n" residual_norm
end;
(* Make new vectors sparse *)
let u_proposed =
Mat.of_col_vecs_list u_proposed
in
let maxu = lange u_proposed ~norm:`M in
let thr = maxu *. 0.00001 in
let u_proposed =
Mat.map (fun x -> if abs_float x < thr then 0. else x) u_proposed
|> Mat.to_col_vecs_list
in
(*
Format.printf "%a@." Matrix.pp_matrix @@ Matrix.dense_of_mat m_new_U;
*)
if residual_norm > threshold && macro > 0 then
let u_next, w_next, iter, macro =
if iter = n_iter then
m_new_U |> pick_new,
m_new_W |> pick_new,
0, (macro-1)
else
u_next, w_next, (iter+1), macro
in
(iteration [@tailcall]) u_next u_proposed w_next iter macro
else
(m_new_U |> pick_new |> Mat.of_col_vecs_list), lambda
in
iteration [] u_new [] 1 30