Rotational Printing by Dikko Faust at Purgatory Pie Press

Dikko Faust has been making prints using rectangular sections of grids and other geometric line patterns. By shifting the grids across the plane he has created a series of overlapping prints. Recently he has added a new twist to his process. Faust has invented a new printing tool that allows him to rotate the rectangle around a central axis point.

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(A quick note about printers’ measurements: In the print studio distances are measured in picas and points. One inch is equivalent to 6 picas and 1 pica is equivalent to 12 points.)

To measure the rotation of the rectangle, Faust uses a straight edge to form a line from the bottom corner of the rectangle that is perpendicular to the horizontal  bottom edge of his press, and then measures how far from the center point to the horizontal line. The initial measurement for a straight up and down rectangle would be 12 picas from the center (the rectangle is 4″x 6″ or 24 by 36 pica).

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Faust has been experimenting with what happens to different patterns throughout  the rotation process

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To better explore the relationship between the grids,Faust has made series of two-color prints. He has selected only the prints that are the most visually interesting. Making consecutive prints with the number of ratio of pica differences to correlate with the Fibonacci Sequence is one technique.

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The day I was in the studio, Dikko was working with a pattern he had created using airline (1/2 point) rules. He used parallel lines: there is 1 point of space between the first two lines, 2 points between the 2nd and 3rd line, then 3 points between the 3rd and 4th….. up to 6 points of space between the 6th and 7th line. Then the whole pattern repeats 12 times.

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While I was at the printing studio Faust was making a single print with multiple rotational images. I took pictures throughout the process.

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This is an early stage of the process: it has the original line print plus a 5 pt and 10 pt rotation clockwise and a 5pt and a 10pt rotation counter clockwise.

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This is the finished print. There are 5pt, 10 pt, 15 pt, 20 pt, and 25 pt rotations in both the clockwise and counter clockwise directions. The process that Faust has developed to create these new prints is very algorithmic. It requires a commitment to experimentation trying different patterns and rotations. The outcomes are then judged on their aesthetic merit determining which prints are to be  completed works of art.

Susan Happersett

 

Stephen Andrews at The Art Gallery of Ontario in Toronto

The Art Gallery of Ontario in Toronto is currently exhibiting a large solo exhibition called “Stephen Andrews POV” in their Contemporary gallery. Stephen Andrews is known for his photographs, videos, and paintings that address difficult societal issues, using both representational and abstract formats. A recent (2014-2015) series of paintings titled the “Butterfly effect” is Andrews’ expression of the Chaos Theory. Using a defined set of restrictions the artist explores the multitude of outcomes.

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“Butterfly Effect”

Each work in the series consists of a white canvas with six rectangles that are identical except for color. Two of the rectangles are red two, are blue, and two are yellow. Each of the primary colors has equal representation. The oil paint has been applied using mylar sheets to ensure the integrity of the rectangles. It is the placement of the rectangles that changes with each painting. There are an infinite amount of possible outcomes. Andrews is interested in the accumulation of colors that eventually make black. The areas where all three colors overlap become black rectangles. These black rectangles appear in different locations on each canvas. At first these painting look random but upon closer inspection you realize they all share the same geometric elements, there is consistency in the chaos.
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Stephen Andrews has expressed his ideas about the chaos he sees in our troubled world by using the ideas of the mathematical Chaos Theory  to create abstract geometric paintings.

Susan Happersett

Chaos at the Metropolitan Museum

In between observations on math art in Manhattan galleries and beyond, a quick shout-out for my own art work. Two of my collaborations with Purgatory Pie Press are now for sale at the new “Paper Project” gallery at the Metropolitan Museum of Art (back of the lobby on the left side when you come in through the main entrance).

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Box of Chaos is a series of 4 paper sculptures based on Chaos Theory.

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The “Happersett Accordion” is a modified, folded Moebius Strip

Étienne Gélinas at Thompson Landry Gallery Toronto

Whenever I have the opportunity to travel I make a point of visiting the local museums and galleries and I am always on the hunt for MathArt.

In Toronto, I visited the Distillery District, which is a collection of brick historic buildings that was once a whiskey distillery, but is now filled with galleries, restaurants and artist’s studios. I was in the Thompson Landry gallery when I spotted mathematical formulas that seemed to come directly out of my old Integral Calculus text book. I became immediately interested in the work of Étienne Gélinas. He uses a variety of techniques to create multi-media work: scratching  geometric drawings into a thick base coat of paint or medium, collaging with paper blueprints, floor plans and garment patterns, and carefully painted shapes and formulas. The artist also adds a random accidental quality to each work by including an expressive element of abstract splatter drip and mark painting.

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Étienne Gélinas – “Composition 365″ – Mixed media on wood
Picture courtesy of the artist and the gallery

In the work “Composition 365″ Gelinas has used a circle as his underlying geometry. There is a series of larger concentric  circles which have been segmented into 8 equal sections with smaller series of concentric circles within each segment. Around this circle pattern there are mathematical formulae, specifically integral formulae. This formulae painted in white on the black background are quite beautiful. Dividing the work horizontally, the artist has placed layers of vintage patterns for making clothing. On top of the collaged element Gélinas has painted a free form abstract painting. There is a lot going on in this work and that is what I like about it. The seemingly disparate techniques yield complex work with a great textuality. To me the work addresses the layers of mathematics in society. There is the obvious association of the calculus formulae, and the geometric implications of the drawn diagrams relate to the geometry used in making the paper garment patterns. Finally, the wild abstraction of the gestural painting adds a level of spontaneity and emotion to the visual dialog. It is not often I find  single work of art with so levels mathematical aesthetic.

Susan Happersett

 

Eureka at Pace Gallery

The current exhibition at Pace Gallery takes its name from the Edgar Allan Poe poem from 1848.  The press release contains a quote from the poem: “I design to speak of the Physical, Metaphysical and Mathematical-of the Material and Spiritual Universe: of its Essence, its Origin, its Creation, its Present Condition and its Destiny…….”

This group show features work form the 1840’s to 2010 that builds a links between science and Mathematics and the artistic spirit. In one of the first galleries there is a copy of Edwin Abbot’s 1884 book “Flatland: A Romance of Many Dimensions”. In this novel Abbott creates a two dimensional society and introduces a three dimensional character with interesting results and exciting prospects about further dimensional expansion. Abbott’s art allows his readers to imagine the possibility of a fourth dimension, a Mathematical idea that was very new at the time.

Installed in the largest room of the gallery is Tim Hawkinson’s large rotating sculpture “Gimbled Klein Basket” a wonderful homage to the “Klein Bottle”. A Klein Bottle is an impossible form first introduced by mathematician Felix Klein in 1882. Like a Moebius strip it has only one side, but a Klein Bottle has no boundaries, whereas  a moebius strip has boundaries at its edges. Compare to, for instance,  a sphere, which has no boundaries either.

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The basket structure of Hawkinson’s “Gimbled Klein Basket” creates an interesting grid pattern on the shape, adding another visual element to the form. The hand crafted quality of the object makes it seem as if this shape is actually possible in 3-D. By rotating the sculpture the viewer has  a chance to examine the form from all angles.

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Installation view of the exhibition, Eureka, Pace Gallery, 508 West 25th Street, New York, May 2–June 27, 2015. From left: Hawkinson, Gimbled Klein Basket, 2007; Siena, Battery, 1997; Jenson, Physical Optics, 1975. Photograph by Tom Barratt, courtesy Pace Gallery.

 

 

 

 

 

 

 

Robin Kang

The New Apostle Gallery featured sculptures and tapestries by Robin Kang at their booth at the Select Fair. Kang works in two very diverse styles. The sculptures are created using clear plastic BRXL bricks in two shapes: cubes and rectangular prism that are basically the size of two of the cubes side by side. The edges of each brick have a dark shading to accentuate them. Some of the interior walls are lined with radiant film creating reflections. “Artifact 435″ from 2015 is a floor construction that is all about geometry by limiting the shapes Kang focuses on the interiors as well as the exteriors of cubes and prisms.

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Robin Kang – “Artifact 435″ – 2015 – Plastic BRXL and radiant film
Courtesy of the artist and New Apostle Gallery

Robin Kang also has work included in a very interesting exhibition at the 1285 Avenue of the Americas Gallery (the lobby of the USB building) titled “Between a Place and Candy: New Works in Pattern + Repetition + Motif”. This show, organized by Norte Maar, presents recent work that relates to the Pattern and Decoration tradition of the 1970’s. This movement also had a basis in the craft and ornament. The use of repetition quite often has Mathematical implications and I saw a number of exciting connections. To see complete set of images go here.

Kang’s contribution to the show is a tapestry “Two Birds with Diamonds” from 2015. It was made on a digitally operated Jacquard loom (a binary operated loom). The images of the birds have a bold simplicity that remind me of ethnographic patterns. The vector-type parallel lines remind me of computer circuit boards.  Kang has managed to integrate the history of textiles with the history of technology.

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Kang – Two Birds with Diamonds” hand woven Cottton and Tincel – 2015
Courtesy of Norte Maar and the artist

The work of Robin Kang relates to mathematics on two fronts: the sculptures elevate basic geometric figures by  revealing their interior structures, the tapestries combine the mathematics of early computer science with the cultural significance of the textile arts.

Susan Happersett

 

Gilbert Hsiao at Select Fair

The Select Art Fair in NYC last week had an emphasis on Performance and Installation Art. I was not sure I would find any work with Mathematical elements besides my own work and the Tessellation prints of Dikko Faust. After the smoke cleared, and I mean that literally – an installation piece featuring mating bigfoot mannequins used a smoke machine during the busiest hours of the show – I was able to find some Math Art. The Transmitter Gallery exhibited the work of Gilbert Hsiao in their booth. I was particularly impressed with The sculpture “Headstone Friends”.
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“Headstone Friends” from 2015 is a cylindrical column made up of a stack of vinyl records. The circular discs are all parallel with a uniform sliver of space between each record. There is a smaller solid column steel and concrete column running up through the center of the sculpture. The most amazing aspect of this work is the way the light shines through the records at the viewers sight line. Only when the viewer looks straight between the discs is the light between the vinyl visible. Here is a video demonstrating how the light moves up and down with the sightline.
“Headstone Friends” is an interesting use of circular discs to create a column but it is also about how the viewer’s line of vision behaves like a vector. Hsiao enables the viewer to take an active role in the mathematics.
Susan Happersett

Select Fair in NYC this week

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This is another big week for Art Fairs in New York. I will be at the Select Fair in Chelsea, New York with Purgatory Pie Press. It will run from Wednesday night through Sunday. If you are in the area stop by for a visit and see some new work. I will be showing some of my Mathematical Marking Drawings, Fibonacci Flowers, Spirals and Trees. Dikko Faust’s Tessellation prints will be on display, as well as his newest work (the ink is still wet) with Mathematical Moiré patterns. This is an exciting new process Faust has developed using rotating grids. It should be an exciting week!

Mark Knoerzer at Bertrand Delacroix Gallery

Picture courtesy of the gallery and the artist

Susan Happersett

Phil Wagner at UNTITLED Gallery

The exhibition “It’s Been Too Long” at the UNTITLED Gallery on Orchard Street features a recent (2015) series of paintings based on telephone numbers. Wagner has randomly selected telephone numbers from the NYC and LA white pages. He paints columns of the enlarged numbers.

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The numbers have been painted with uneven brush strokes so that the resulting numerals look as if they have been stamped with an old fashioned rubber stamp and ink pad onto the parchment-colored background. These paintings are an exploration into society’s association with numbers. The rows and columns of numerals become abstract geometric patterns. Removed from the initial source they lose their meaning and purpose. The whole concept of a paper telephone directory is becoming obsolete. In this digital age the once important pages are becoming visual artifacts.

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The gallery installation fills an entire room with these canvases, creating an environment of numerals. As some one who likes to work with numbers, I found it quite soothing, almost meditative. It makes me think of all of the other places we see numbers: train cars, mileage signs along the road, credit card numbers, etc… and never stop to think about the aesthetics. Numbers are an important part of our lives but quite often we tend to only use them for practical applications, never stopping to appreciate their visual qualities.

Susan Happersett