Angular Spectrum is a striking exploration of recursive geometry and mathematical precision, utilizing the Sierpinski triangle fractal as its foundational blueprint. This series of sculptures represents a departure into pure geometric abstraction, where the complexity arises not from botanical or architectural motifs, but from the infinite regression of the triangle itself.

The work is presented in two distinct iterations:

• Monochromatic Study: One version utilizes a minimalist palette of black and white, relying entirely on the precision of the paper cuts and the resulting shadows to define the fractal's internal divisions. This iteration highlights the "angular" purity of the form, turning a mathematical concept into a tactile, architectural relief.

• Chromatic Depth: The colored iteration introduces a vibrant "spectrum" of color, contrasting a matte black exterior with rich gold and deep indigo layers. The interplay between these bold hues and the sharp, descending angles creates a sense of prismatic energy, as if the light is being refracted through the very layers of the paper.

By layering these precise geometric progressions, Angular Spectrum invites the viewer to contemplate the concept of infinity within a contained space. It serves as a visual meditation on how simple rules can generate immense complexity, mirroring the fundamental patterns found throughout the universe.