A visually realistic depiction of a wormhole suspended in deep interstellar space, using authentic flow field mathematics to guide the distortion and light-bending around the core. The wormhole appears as a luminous torus with inner gravitational lensing, subtly bending background starlight into warped arcs. The field around it ripples with coherent wavefronts, gently spiraling like fluidic magnetic turbulence. Use the Navier-Stokes flowfield equations as the basis for the curvature: ∇·u = 0 ∂u/∂t + (u·∇)u = −∇p/ρ + ν∇²u —Where u is the velocity field around the wormhole's event horizon, ν is the viscosity representing the quantum vacuum resistance, and ρ the density gradient of spacetime stress near the throat. Simulate frame-dragging effects using Kerr metric derivatives: ds² = −(1 − 2GMr/Σ)dt² − (4GMar sin²θ/Σ)dt dφ + (Σ/Δ)dr² + Σ dθ² + (r² + a² + 2GMa²r sin²θ/Σ) sin²θ dφ² —Use this to distort starfields near the wormhole edge. Color gradient should evolve from violet-blues near the singular axis to infrared-reds further out, indicating relativistic redshift. Outer edges emit weak Cherenkov-like pulses, hinting at matter streams entering or exiting at impossible angles. Background: Distant galaxy clusters seen through the lensing effect, warped into crescents and loops. No nearby ships, no humans. This is a raw cosmological formation, ancient and active.
