Independent MH

function mh_gamma(T = 100, alpha = 1.5)
    a = Int(floor(alpha))
    b = a/alpha
    x = ones(T+1) # initial value: 1
    for t = 1:T
        yt = rgamma_int(a, b)
        rt = (yt / x[t] * exp((x[t] - yt) / alpha))^(alpha-a)
        if rt >= 1
            x[t+1] = yt
        else
            u = rand()
            if u < rt
                x[t+1] = yt
            else
                x[t+1] = x[t]
            end
        end   
    end
    return(x)
end

# comparison with accept-reject
res = mh_gamma(5000, 2.43)[2:end]
est = cumsum(res.^2) ./ collect(1:5000)

res2 = ones(5000)
for i = 1:5000
    res2[i] = rgamma(2.43, 1)
end
est2 = cumsum(res2.^2) ./ collect(1:5000)

using Plots
plot(est, label="Independent MH")
plot!(est2, label="Accept-Reject")
hline!([8.33], label="True value")

using DataFrames, GLM, Plots

temp = [53, 57, 58, 63, 66, 67, 67, 67, 68, 69, 70, 70, 70, 70, 72, 73, 75, 75, 76, 76, 78, 79, 81]
failure = [1, 1, 1, 1, 0, 0, 0, 0, 0, 0, 0, 0, 1, 1, 0, 0, 0, 1, 0, 0, 0, 0, 0]
data = DataFrame(temp = temp, failure = failure)
logit_fit = glm(@formula(failure ~ temp), data, Binomial(), LogitLink())
plot(temp, predict(logit_fit), legend = false, xlabel = "Temperature", ylab = "Probability")
scatter!(temp, predict(logit_fit))

## metropolis-hastings
using Distributions
γ = 0.57721
function ll(α::Float64, β::Float64)
    a = exp.(α .+ β*temp)
    return prod( (a ./ (1 .+ a) ).^failure .* (1 ./ (1 .+ a)).^(1 .- failure) )
end
function mh_logit(T::Int, α_hat::Float64, β_hat::Float64, σ_hat::Float64)
    φ = Normal(β_hat, σ_hat)
    π = Exponential(exp(α_hat+γ))
    Α = ones(T)
    Β = ones(T)
    for t = 1:T-1
        α = log(rand(π))
        β = rand(φ)
        r = ( ll(α, β) / ll(Α[t], Β[t]) ) * ( pdf(φ, β) / pdf(φ, Β[t]) )
        if rand() < r
            Α[t+1] = α
            Β[t+1] = β
        else
            Α[t+1] = Α[t]
            Β[t+1] = Β[t]
        end
    end
    return Α, Β
end

Α, Β = mh_logit(10000, 15.04, -0.233, 0.108)

p1 = plot(Α, legend = false, xlab = "Intercept")
hline!([15.04])

p2 = plot(Β, legend = false, xlab = "Slope")
hline!([-0.233])

plot(p1, p2, layout = (1,2))

using Distributions

p = 6
λ = 9

function K(t)
    return 2λ*t / (1-2t) - p / 2 * log(1-2t)
end

function D1K(t)
    return ( 4λ*t ) / (1-2t)^2 + ( 2λ + p ) / ( 1 - 2t )
end

function D2K(t)
    return 2(p*(1-2t) + 4λ) / (1-2t)^3
end

function logf(n, t)
    return n * (K(t) - t*D1K(t)) + 0.5log(D2K(t))
end

function logg(n, t)
    return -1n * D2K(0) * t^2/2
end

function mh_saddle(T::Int = 10000; n::Int = 1)
    Z = zeros(T)
    g = Normal(0, 1 / sqrt(n*D2K(0)))
    for t = 1:T-1
        z = rand(g)
        logr = logf(n, z) - logf(n, Z[t]) + logg(n, Z[t]) - logg(n, z)
        if log(rand()) < logr 
            Z[t+1] = z
        else
            Z[t+1] = Z[t]
        end
    end
    return Z
end

Z = mh_saddle(n = 1)

function tau(x)
    return ( -1p + 2x - sqrt(p^2 + 8λ * x) ) / (4x)
end

println(sum(Z .> tau(36.225)) / 10000)
println(sum(Z .> tau(40.542)) / 10000)
println(sum(Z .> tau(49.333)) / 10000)

qchisq(0.90, 600, 1800)/100
qchisq(0.95, 600, 1800)/100
qchisq(0.99, 600, 1800)/100