Nihon Bijutsuin is a non-governmental artistic organization in Japan dedicated to Nihonga. The academy promotes the art of Nihonga through a biennial exhibition, the Inten Exhibition.
History
The Nihon Bijutsuin was founded by Okakura Tenshin at the Tokyo National University of Fine Arts and Music in 1898, together with a group of artists, who included Hashimoto Gahō, Yokoyama Taikan, Shimomura Kanzan, Hishida Shunsō and several others, as a reaction against stylistic restrictions of the government-sponsored Bunten exhibitions. Nihon Bijutsuin moved with Okakura Tenshin to Izura, Ibaraki in 1906. However, Okakura was soon recruited by Ernest Fenollosa to assist in his efforts to introduce Chinese and Japanese arts to the western world via the Museum of Fine Arts, Boston, and soon lost interest in guiding the new organization. When Okakura died in 1913, the group dissolved. Nihon Bijutsuin was resurrected a year later in 1914 under Yokoyama Taikan, who relocated it back to Yanaka, Tokyo. In 1920, separate sections were established for Japanese sculpture and for western-style, These separate sections were abolished in 1960, and currently the Institute is currently devoted exclusively to Nihonga painting. Nihon Bijutsuin should not be confused with the Japan Art Academy or the Japan Academy of Arts, which are completely different organizations.
Inten Exhibitions
The most important function of Nihon Bijutsuin is the organization and promotion of the inten biennial fine arts exhibitions. The Spring Exhibition is held in early April, for two weeks at the MitsukoshiDepartment Store in Tokyo, followed by a tour around Japan for four months, at ten different locations. The sizes of the works which can be displayed is fixed at under 150 x 75 cm for rectangular works and under 106 x 106 cm for square works. The Fall Exhibition is held in September for two weeks at the Tokyo Metropolitan Art Museum, followed by a year-long tour to 10 different locations around Japan. The Fall Exhibition contains larger works, with 225 x 180 cm as the upper limit.