Item# RCUTF92A
$34.95
When you pop open the Frank Lloyd Wright Coonley Playhouse Collapsible Umbrella, rainy days will never feel quite so gloomy. The design for the umbrella is adapted from a window detail of the Frank Lloyd Wright Avery Coonley Playhouse in Riverside, Illinois (1912). Opens automatically. At the push of a button, the bright colors put you in a better mood. And when the shower is over? Quickly press the button again, push the umbrella together, and in no time at all it's back in its matching protective cover. Windproof fiberglass frame. Dimensions: Closed length: 11.5” long. Diameter: 44”.
$67.95 $78.00
Featuring lush, radiant colors, the scarf is based on the Louis Comfort Tiffany (American, 1848 - 1933) Magnolias and Irises Favrile glass window depicting a picturesque landscape. The window features an embankment of irises beneath flowering magnolia trees. Magnificent purple hills with a central meandering stream, emblematic of the River of Life theme, are set in the background. 100% silk...
$86.95 $96.00
The shimmering design of the Metropolitan Museum Tiffany Peacock Feather Shawl was inspired by the Louis Comfort Tiffany (American, 1848–1933) iridescent glass vase produced by Tiffany Glass and Decorating Company in 1900. The piece stylizes the "eye" of the peacock feather with rich iridescent hues gradating to a light blue surrounding the eyes. Louis Comfort Tiffany was often compelled by the...
$90.95 $103.00
The Antoni Gaudi Mosaic Silk Chiffon Scarf is inspired by the work of Barcelona's most famous designer and architect, with a pattern based on one of Gaudi's iconic mosaics. Gaudi’s works are highly individualized, with most located in Barcelona, including his masterpiece, the church of the Sagrada Familia. Silk Chiffon. Hand rolled hems. : 70” x 21” (180cm x 55cm)....
$90.95 $103.00
The Alhambra Tiles Silk Chiffon Scarf is inspired by the tile mosaics in the Alhambra palace and fortress complex located in Granada, Andalusia, Spain. The Alhambra tiles are remarkable in that they contain nearly all of the seventeen possible wallpaper groups (mathematical classification of a two-dimensional repetitive pattern, based on the symmetries in the pattern). M. C. Escher's visit to...