Do Not Erase
Year: 2022 Authors: Jessica Wynne
Core claim
The chalkboard, with its erased traces and specialized formulas, reveals a shared territory between mathematical thought and visual art.
Topics
mathematical chalkboards, symbolic expression, visual language, erasure traces
Domains
knot theory, combinatorics, ergodic theory, photography, contemporary art, calligraphic composition, blackboard painting
Methods
photographic documentation, visual observation, artistic framing
Media
chalkboards, chalk, eraser dust, photographs
Paper text
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Wynne
Do Not Erase
Jessica Wynne
Fashion Institute of Technology, NY, USA; jessicawynne@gmail.com
Abstract
Jessica Wynne’s newest body of work, Do Not Erase, contemplates the meaning, emotion, and energy of symbols. Her photographs of mathematicians’ chalkboards, and the formulas scribbled and erased on them, illuminate the narrative, linguistic, and visionary elements of these representations, providing timeless meditation on the abstraction and intimacy of visual expression. She was first introduced to the beauty of chalkboards through her neighbors Amie Wilkinson and Benson Farb, mathematics professors from the University of Chicago. Intrigued by the imagery she saw on these boards, Wynne directed her focus on capturing-rather than deciphering-the meaning and beauty of these symbols. Reminiscent of Cy Twombly’s “blackboard” paintings and Brice Marden’s serpentine Letters canvases, Wynne’s blackboards illuminate the power of the whirling web of shapes, numbers, and calculations scribbled in the heat of discovery.
For Wynne, the poetic and the rational are not mutually exclusive. While the formulas on each board are communicated in highly specialized languages from abstruse subfields such as knot theory, combinatorics, and ergodic theory, Wynne’s work embraces the visual sensuality and intuitive impression of these complex calculations, linking them to the timeless lineage of artistry and writing: cave paintings, hieroglyphics, and graffiti.
Mathematicians “see images first, not words. They see pictures before meaning,” Wynne observes. This relationship between image and thought is one of the primary areas of investigation for her work. It is striking that mathematicians, unlike many scientists, continue to work on chalkboards rather than computers, and Wynne’s art explores the aspects of their communication that visual artists have shared throughout time: primal, intimate, and transcendent exchange.
Each mystery unravels itself through unique formal qualities. In some of the chalkboards Wynne represents, the black expanse is riddled with Greek letters, punctuation notations, and sinuous scrawls and loops, evocative of a patterned tapestry or calligraphic scroll. Others meditate on a single, pared down shape or orderly sequence of lines. Foggy mists left behind by an eraser provide a recurrent theme throughout the series, the puffs of opaque powder testifying to the rhythmic bursts of thought and explosions of clarity. Despite the formal and intellectual diversity Wynne’s work showcases, each of her chalkboards is united through an exploration of the relationship between form and expression.
Figure 1: Benson Farb