{"product_id":"conformal-map-cm007","title":"Conformal Map CM007","description":"\u003cp class=\"font-claude-response-body break-words whitespace-normal leading-[1.7]\"\u003eA conformal map is a function on the complex plane that distorts shapes while preserving angles. Take a regular square grid, apply the function point by point, and the grid emerges curved, stretched, sometimes folded - but every intersection still crosses at 90°. Riemann's mapping theorem, proved in 1851, showed that any simply connected region in the plane can be conformally mapped to any other. The set of possible transformations is effectively unlimited.\u003c\/p\u003e\n\u003cp class=\"font-claude-response-body break-words whitespace-normal leading-[1.7]\"\u003e\u003cmeta charset=\"utf-8\"\u003e\u003cmeta charset=\"utf-8\"\u003eCM007 sits inside a soft square envelope with four small protrusions at the diagonals. The interior carries a ripple pattern of concentric rings — more numerous and more closely spaced than the related CM008 — radiating from a central node. Each ring marks a circular zone where the function changes its rate of compression. The overall texture is smooth, with the rings themselves providing the only sharp edges in the composition.\u003cbr\u003e\u003c\/p\u003e","brand":"Axisophy","offers":[{"title":"Large (70 × 70 cm | 28 × 28 in)","offer_id":46164901298337,"sku":"AXS-CM007-S-700x700-AM-WHT","price":70.0,"currency_code":"GBP","in_stock":true},{"title":"XLarge (100 × 100 cm | 40 × 40 in)","offer_id":46164901331105,"sku":"AXS-CM007-S-1000x1000-AM-WHT","price":120.0,"currency_code":"GBP","in_stock":true}],"thumbnail_url":"\/\/cdn.shopify.com\/s\/files\/1\/0483\/1546\/5889\/files\/Axisophy-ConformalMap-CM007-crop-mockup.jpg?v=1777642148","url":"https:\/\/axisophy.com\/products\/conformal-map-cm007","provider":"Axisophy","version":"1.0","type":"link"}