The exponential ddecay is likely multi-exponential, since a single expoinential provides a decent although inexact fit:
D = load('Breather_Data.m');
x = D(:,1);
y = D(:,2);
y = detrend(y); % Remove Linear Trend
yu = max(y);
yl = min(y);
yr = (yu-yl); % Range of ‘y’
yz = y-yu+(yr/2);
zci = @(v) find(v(:).*circshift(v(:), [-1 0]) <= 0); % Returns Approximate Zero-Crossing Indices Of Argument Vector
zt = x(zci(y));
per = 2*mean(diff(zt)); % Estimate period
ym = mean(y); % Estimate offset
fit = @(b,x) b(1) .* exp(b(2).*x) .* (sin(2*pi*x.*b(3) + b(4))) + b(5); % Objective Function to fit
fcn = @(b) norm(fit(b,x) - y); % Least-Squares cost function
[s,nmrs] = fminsearch(fcn, [yr; -1E+11; 1/per; -1; ym]) % Minimise Least-Squares
xp = linspace(min(x),max(x), 500);
figure
plot(x,y,'b', 'LineWidth',1.5)
hold on
plot(xp,fit(s,xp), '--r')
hold off
grid
xlabel('Time')
ylabel('Amplitude')
legend('Original Data', 'Fitted Curve')
text(min(xlim)+0.05*diff(xlim), min(ylim)+0.8*diff(ylim), sprintf('$y = %.3E\\cdot e^{%.3E\\cdot x}\\cdot sin(2\\pi\\cdot x\\cdot %.3E + %.3f) %+.3f$', s), 'Interpreter','latex')
This is slightly revised from the previous code, since your data required some special considerations because of the magnitude of the independent variable.
