PROMENADE by Philippe Nigro. PROMENADE by Philippe Nigro. PROMENADE by Philippe Nigro. CHAIR N-0 by Front. CHAIR N-0 by Front. CHIGNON by LucidiPevere. CHIGNON by LucidiPevere. ANN by Oscar & Gabriele Buratti. DUET by Cristian Mohaded. DUET by Cristian Mohaded. MALIT by Gordon Guillaumier. PINCE by LucidiPevere. PINCE by LucidiPevere. SUU by Oscar & Gabriele Buratti. WAGASA by Servomuto. The updated catalogue of Gebrüder Thonet Vienna (GTV) is an expression of the company’s constant commitment to research and identifying new ways to design, presenting the brand’s original expressions created by prestigious names from the international design panorama. Designers’ varying approaches help enrich the Wiener GTV Design collection with new stylistic visions indissolubly linked to curved wood, representative of the company’s passion and soul.The catalogue highlights the latest GTV lines and shapes, such as the PROMENADE sofas by Philippe Nigro, his first collaboration with the brand. CHIGNON by LucidiPevere communicates absolute softness in a deliberately feminine armchair, while their PINCE chair captures an essential, elegant appeal.The delicate and amusing inspiration of CHAIR N.0 by Front expresses a new idea of elegance via the use of curved wood and Vienna straw. The new MALIT chair by Gordon Guillaumier combines tradition with innovation, juxtaposing the use of wood with upholstery. The DUET low-tables by Christian Mohaded are the fruit of new collaborations and play an elegant game of geometry inspired by the brand’s traditional curved lines. WAGASA lamps produced by Servomuto are an exclusive design for GTV, which match precious materials such as marble with delicate and soft fabrics and Vienna straw details. Gebrüder Thonet Vienna is available in Australia exclusively through Space Furniture. [Images courtesy of Gebrüder Thonet Vienna. Photography by Gionata Xerra.] Share the love:FacebookTwitterLinkedInEmailPinterest Leave a Reply Cancel ReplyYour email address will not be published.CommentName* Email* Website Δ