10/22/2020: Recently I've taken a liking to bracketing methods for root-finding and have even written my own code. It would seem most of the well-known bracketing methods suffer from myriad problems, including very suboptimal orders of convergence and insufficiently intelligent conditions for using bisection.
8/24/2019: I defined a neat ordinal collapsing function:
S(A) ⇔ ∀ f : sup A ↦ sup A, ∃ α ∈ A, ∀ η ∈ α (f(η) ∈ α)
B(α, κ, 0) = κ ∪ {0, K}
B(α, κ, n+1) = {γ + δ | γ, δ ∈ B(α, κ, n)}
∪ {Ψ_η(μ) | μ ∈ B(α, κ, n) ∧ η ∈ α ∩ B(α, κ, n)}
B(α, κ) = ⋃ {B(α, κ, n) | n ∈ N}
Ξ(α) = {κ, K ∈ K′ | κ ∉ B(α, κ) ∧ α ∈ cl(B(α, κ)) ∧ S(⋂ {Ξ(η) ∩ κ | η ∈ B(α, κ) ∩ α})}
Ψ_α = enum(Ξ(α))
C(α, κ, 0) = κ ∪ {0, K}
C(α, κ, n+1) = {γ + δ | γ, δ ∈ C(α, κ, n)}
∪ {ψ^η_ξ(μ) | μ, ξ, η ∈ C(α, κ, n) ∧ η ∈ α}
C(α, κ) = ⋃ {C(α, κ, n) | n ∈ N}
ψ^α_π = enum{κ, K ∈ Ξ(π) | κ ∉ C(α, κ) ∧ α ∈ cl(C(α, κ))}
where K
is a weakly compact cardinal and K'
is the (K+1)
th hyper-Mahlo or alternatively, the smallest ordinal larger than K
closed under γ ↦ M(γ)
, where M(γ)
is the first γ
-Mahlo. On its own this doesn't make a notation for large countable ordinals, but it can be used with another ordinal collapsing function for such purpose.
If you need me, you can find me here:
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My favorite topics include numerical-methods, sequences-and-series, calculus, big-numbers, divergent-series, summation, and special-functions on math.SE.
Some of my favorite posts:
Golf a number bigger than TREE(3)
Methods to compute $\sum_{k=1}^nk^p$ without Faulhaber's formula
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