Mercurial > repos > public > sbplib
changeset 718:71aa5828cbbf feature/utux2D
Add Schrödinger scheme for 2d single block. Will develop to multiblock with interpolation.
| author | Martin Almquist <malmquist@stanford.edu> |
|---|---|
| date | Sat, 03 Mar 2018 16:18:33 -0800 |
| parents | 8e4274ee6dd8 |
| children | b3f8fb9cefd2 |
| files | +scheme/Schrodinger2d.m |
| diffstat | 1 files changed, 250 insertions(+), 0 deletions(-) [+] |
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--- /dev/null Thu Jan 01 00:00:00 1970 +0000 +++ b/+scheme/Schrodinger2d.m Sat Mar 03 16:18:33 2018 -0800 @@ -0,0 +1,250 @@ +classdef Schrodinger2d < scheme.Scheme + +% Discretizes the Laplacian with constant coefficent, +% in the Schrödinger equation way (i.e., the discretization matrix is not necessarily +% definite) +% u_t = a*i*Laplace u +% opSet should be cell array of opSets, one per dimension. This +% is useful if we have periodic BC in one direction. + + properties + m % Number of points in each direction, possibly a vector + h % Grid spacing + + grid + dim + + order % Order of accuracy for the approximation + + % Diagonal matrix for variable coefficients + a % Constant coefficient + + D % Total operator + D1 % First derivatives + + % Second derivatives + D2 + + H, Hi % Inner products + e_l, e_r + d1_l, d1_r % Normal derivatives at the boundary + + H_boundary % Boundary inner products + + end + + methods + + function obj = Schrodinger2d(g ,order, a, opSet) + default_arg('opSet',{@sbp.D2Variable, @sbp.D2Variable}); + default_arg('a',1); + dim = 2; + + assert(isa(g, 'grid.Cartesian')) + + m = g.size(); + m_tot = g.N(); + + h = g.scaling(); + xlim = {g.x{1}(1), g.x{1}(end)}; + ylim = {g.x{2}(1), g.x{2}(end)}; + lim = {xlim, ylim}; + + % 1D operators + ops = cell(dim,1); + for i = 1:dim + ops{i} = opSet{i}(m(i), lim{i}, order); + end + + I = cell(dim,1); + D1 = cell(dim,1); + D2 = cell(dim,1); + H = cell(dim,1); + Hi = cell(dim,1); + e_l = cell(dim,1); + e_r = cell(dim,1); + d1_l = cell(dim,1); + d1_r = cell(dim,1); + + for i = 1:dim + I{i} = speye(m(i)); + D1{i} = ops{i}.D1; + D2{i} = ops{i}.D2; + H{i} = ops{i}.H; + Hi{i} = ops{i}.HI; + e_l{i} = ops{i}.e_l; + e_r{i} = ops{i}.e_r; + d1_l{i} = ops{i}.d1_l; + d1_r{i} = ops{i}.d1_r; + end + + % Constant coeff D2 + for i = 1:dim + D2{i} = D2{i}(ones(m(i),1)); + end + + %====== Assemble full operators ======== + obj.D1 = cell(dim,1); + obj.D2 = cell(dim,1); + obj.e_l = cell(dim,1); + obj.e_r = cell(dim,1); + obj.d1_l = cell(dim,1); + obj.d1_r = cell(dim,1); + + % D1 + obj.D1{1} = kron(D1{1},I{2}); + obj.D1{2} = kron(I{1},D1{2}); + + % Boundary operators + obj.e_l{1} = kron(e_l{1},I{2}); + obj.e_l{2} = kron(I{1},e_l{2}); + obj.e_r{1} = kron(e_r{1},I{2}); + obj.e_r{2} = kron(I{1},e_r{2}); + + obj.d1_l{1} = kron(d1_l{1},I{2}); + obj.d1_l{2} = kron(I{1},d1_l{2}); + obj.d1_r{1} = kron(d1_r{1},I{2}); + obj.d1_r{2} = kron(I{1},d1_r{2}); + + % D2 + obj.D2{1} = kron(D2{1},I{2}); + obj.D2{2} = kron(I{1},D2{2}); + + % Quadratures + obj.H = kron(H{1},H{2}); + obj.Hi = inv(obj.H); + obj.H_boundary = cell(dim,1); + obj.H_boundary{1} = H{2}; + obj.H_boundary{2} = H{1}; + + % Differentiation matrix D (without SAT) + D2 = obj.D2; + D = sparse(m_tot,m_tot); + for j = 1:dim + D = D + a*1i*D2{j}; + end + obj.D = D; + %=========================================% + + % Misc. + obj.m = m; + obj.h = h; + obj.order = order; + obj.grid = g; + obj.dim = dim; + obj.a = a; + + end + + + % Closure functions return the operators applied to the own domain to close the boundary + % Penalty functions return the operators to force the solution. In the case of an interface it returns the operator applied to the other doamin. + % boundary is a string specifying the boundary e.g. 'l','r' or 'e','w','n','s'. + % type is a string specifying the type of boundary condition. + % data is a function returning the data that should be applied at the boundary. + % neighbour_scheme is an instance of Scheme that should be interfaced to. + % neighbour_boundary is a string specifying which boundary to interface to. + function [closure, penalty] = boundary_condition(obj, boundary, type, parameter) + default_arg('type','Neumann'); + default_arg('parameter', []); + + % j is the coordinate direction of the boundary + % nj: outward unit normal component. + % nj = -1 for west, south, bottom boundaries + % nj = 1 for east, north, top boundaries + [j, nj] = obj.get_boundary_number(boundary); + switch nj + case 1 + e = obj.e_r; + d = obj.d1_r; + case -1 + e = obj.e_l; + d = obj.d1_l; + end + + Hi = obj.Hi; + H_gamma = obj.H_boundary{j}; + a = obj.a; + + switch type + + % Dirichlet boundary condition + case {'D','d','dirichlet','Dirichlet'} + closure = nj*Hi*d{j}*a*1i*H_gamma*(e{j}' ); + penalty = -nj*Hi*d{j}*a*1i*H_gamma; + + % Free boundary condition + case {'N','n','neumann','Neumann'} + closure = -nj*Hi*e{j}*a*1i*H_gamma*(d{j}' ); + penalty = nj*Hi*e{j}*a*1i*H_gamma; + + % Unknown boundary condition + otherwise + error('No such boundary condition: type = %s',type); + end + end + + function [closure, penalty] = interface(obj,boundary,neighbour_scheme,neighbour_boundary) + % u denotes the solution in the own domain + % v denotes the solution in the neighbour domain + error('Interface not implemented'); + end + + % Returns the coordinate number and outward normal component for the boundary specified by the string boundary. + function [j, nj] = get_boundary_number(obj, boundary) + + switch boundary + case {'w','W','west','West', 'e', 'E', 'east', 'East'} + j = 1; + case {'s','S','south','South', 'n', 'N', 'north', 'North'} + j = 2; + otherwise + error('No such boundary: boundary = %s',boundary); + end + + switch boundary + case {'w','W','west','West','s','S','south','South'} + nj = -1; + case {'e', 'E', 'east', 'East','n', 'N', 'north', 'North'} + nj = 1; + end + end + + % Returns the coordinate number and outward normal component for the boundary specified by the string boundary. + function [return_op] = get_boundary_operator(obj, op, boundary) + + switch boundary + case {'w','W','west','West', 'e', 'E', 'east', 'East'} + j = 1; + case {'s','S','south','South', 'n', 'N', 'north', 'North'} + j = 2; + otherwise + error('No such boundary: boundary = %s',boundary); + end + + switch op + case 'e' + switch boundary + case {'w','W','west','West','s','S','south','South'} + return_op = obj.e_l{j}; + case {'e', 'E', 'east', 'East','n', 'N', 'north', 'North'} + return_op = obj.e_r{j}; + end + case 'd' + switch boundary + case {'w','W','west','West','s','S','south','South'} + return_op = obj.d1_l{j}; + case {'e', 'E', 'east', 'East','n', 'N', 'north', 'North'} + return_op = obj.d1_r{j}; + end + otherwise + error(['No such operator: operator = ' op]); + end + + end + + function N = size(obj) + N = prod(obj.m); + end + end +end