I am doing weird #math things right now. Not really knowing what I am after myself.😩
I am looking for a
Function to represent a direction dependent density or opacity
Details on: https://math.stackexchange.com/q/5101469/121890
#mathStackexchangeCom #mathematics #calculus #multivariateCalculus
Shall I add #tensor 😮
Function to represent a direction dependent density or opacity
Suppose a point $\vec{x}\in\mathbb{R}^3$. I would like to know how to model the following, which I try to explain with a light beam going through the point.
The light beam is dimmed or, similarly,...
GENERALIZED STOKES THEOREM:
The integral of a differential form \(\omega\) over the boundary \(\partial\Omega\) of some orientable manifold \(\Omega\) is equal to the integral of its exterior derivative \(d\omega\) over the whole of \(\Omega\).
\[\displaystyle\int_{\partial\Omega}\omega=\int_\Omega d\omega\]
#VectorCalculus #DifferentialGeometry #MultivariateCalculus #Calculus #StokesTheorem #GeneralizedStokesTheorem #Calculus #FundamentalTheorem #Manifold #Boundary #ExteriorDerivative #Stokes
Harald
Pustam | पुस्तम | পুস্তম🇳🇵