I'll start with a mind boggler. It may not be directly vortex math, but it has to do with Φ (PHI):

**Φ**^{2} = α * (B-(e+π), *where*

Φ = 1,6180339887498948482045868343656 = golden ratio - **important in vortex math**

α = 1/137 fine structure constant

B = 364.50682 nm = Balmers constant

e=2,7182818284590452353602874713527 = base of natural logarithm

π = 3,1415926535897932384626433832795

*Note that:*

∇E = ρ / e_{0}, where E= electric field, e_{0}=permittivity of space, ρ = charge density (C/m^{3})

∇xH = e_{0}, H = magnetic field

*Note that:*

α = 1/(4*π*e_{0}) * e^{2}/(ħc),* where*

e_{0}= permittivity of space = 8.854187817620x10^{−12} F⋅m^{−1}

e=elementary charge = 1.6021766208*10^{-19} Coloumb

ħ = h/(2π)=plancks constant divided by 2π = 1.054571800*10^{-34},

c=speed of light in vaccum = 299792458m/s

*Note that:*

e_{0} = 1/ (u_{0}*c^{2}), *where*

u_{0}=magnetic permeability of space = 4π×10^{−7} H/m

*Note that:*

λ = hm^{2} / (m^{2} - n^{2}), *where*

n, m are the electron orbital numbers of hydrogen

λ = wavelength [m] of emitted (jump from m to n) or absorbed (jump from n to m) photons

To be updated later..