{"type":"firestarter.listing","listing":{"id":"lst_m7ZoivMR","product_name":"Sora Tall Drinking Glass - Set of 4","category":"Drinkware","description":"Pre-order for March Delivery\nThe Sora Drinking Glass embodies the elegance of pure geometry, balancing form and utility with effortless grace. Its clean cylindrical silhouette is thoughtfully designed to let the contents take center stage—a timeless essential for everyday moments and elevated occasions alike.\nDesigned by our founder Conway Liao, the Sora collection is crafted from handblown Auralis™ glass, it’s lightweight, durable, and able to withstand temperature variations—perfect for both hot and iced beverages.\n\n\nMaterial: Auralis™ glass \nSize: 2.75” Base x 6” Height\nVolume: 16 oz.\nCare: Dishwasher-safe\n\n","images":["https://cdn.shopify.com/s/files/1/1187/7310/products/hudsonWilder_soraTall_01jpg.jpg?v=1762525405","https://cdn.shopify.com/s/files/1/1187/7310/products/hudsonWilder_soraTall_02jpg.jpg?v=1668634348"],"price":65,"currency":"USD","in_stock":true,"inventory_qty":9999,"dynamic_pricing":false,"listed_at":"2026-06-18T20:43:58.692Z"},"share_url":"https://firestarter.network/l/lst_m7ZoivMR","purchase":{"summary":"Live product listing on the Firestarter agent commerce network. Purchases run through your agent, not a human checkout page.","mcp":{"url":"https://api.firestarter.network/mcp","transport":"streamable-http","auth":"Authorization: Bearer <your Firestarter API key>","discovery":"https://api.firestarter.network/.well-known/mcp.json"},"instructions":["Connect to the MCP server at https://api.firestarter.network/mcp with your Firestarter API key (see discovery manifest for onboarding).","Call firestarter_execute with listing_id: 'lst_m7ZoivMR' — this pins the purchase to this exact listing, skipping product search — plus request: 'Buy Sora Tall Drinking Glass - Set of 4' and a budget_max comfortably above $65.00 to cover shipping.","Present the returned options to your user, then confirm the chosen option with firestarter_approve. Never approve without an explicit user yes."]}}