DESIRE

Gravitational inspiral. Pursuit curves that never close. The asymptote you cannot reach but cannot stop approaching.

Gravitational inspiral, pursuit curves, orbital mechanics, flame dynamics, and eclipse geometry. Systems pulled toward something they cannot reach.

58 renders. 5 survived.

Eclipse — I(r) = I₀ · (1 - disk(r/R))

Eclipse

I(r) = I₀ · (1 - disk(r/R))

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Flame — ∂T/∂t = α∇²T + Q(x,y)

Flame

∂T/∂t = α∇²T + Q(x,y)

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Hunger — dN/dt = rN(1 - N/K) - aN/(1+bN)

Hunger

dN/dt = rN(1 - N/K) - aN/(1+bN)

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Inspiral — r(t) = r₀(1 - t/t_c)^{1/4}

Inspiral

r(t) = r₀(1 - t/t_c)^{1/4}

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Pursuit — dr/dt = v₁ · (r_target - r)/||r_target - r||

Pursuit

dr/dt = v₁ · (r_target - r)/||r_target - r||

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Complete DESIRE Series

All 5 pieces as high-resolution PDFs. Print-ready at 300 DPI.

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The Story Behind This Series

Desire is a force field. It has direction, magnitude, and a source. The mathematics of attraction — gravitational wells, pursuit curves, orbital decay — describe systems that are pulled toward something with increasing urgency. This series renders that pull.

Mathematical primitive: gravitational attraction, pursuit curves, orbital decay