BEGIN:VCALENDAR VERSION:2.0 PRODID:Linklings LLC BEGIN:VTIMEZONE TZID:Asia/Tokyo X-LIC-LOCATION:Asia/Tokyo BEGIN:STANDARD TZOFFSETFROM:+0900 TZOFFSETTO:+0900 TZNAME:JST DTSTART:18871231T000000 END:STANDARD END:VTIMEZONE BEGIN:VEVENT DTSTAMP:20250110T023313Z LOCATION:Hall B5 (1)\, B Block\, Level 5 DTSTART;TZID=Asia/Tokyo:20241206T132800 DTEND;TZID=Asia/Tokyo:20241206T134200 UID:siggraphasia_SIGGRAPH Asia 2024_sess145_papers_1047@linklings.com SUMMARY:A class of new tuned primal subdivision schemes with high-quality limit surface in extraordinary regions DESCRIPTION:Technical Papers\n\nXu Wang and Weiyin Ma (City University of Hong Kong)\n\nWe propose a unified tuning framework for primal subdivision schemes that are generalizations of odd-degree uniform B-spline surfaces for unstructured quadrilateral meshes of arbitrary topology. The subdivisi on of the resulting tuned primal subdivision (TPS) schemes is performed th rough efficient repeated local refinement operations. One level of subdivi sion of TPS-schemes is decomposed into one step of simple topological spli tting plus an additional series of repeated local smoothing operations. Th e unified tuning framework optimizes subdivision rules for both topologica l splitting and smoothing operations near extraordinary vertices by minimi zing the curvature fluctuation of the second-order characteristic maps of the respective TPS-scheme. To validate the limit surface quality of TPS-sc hemes in extraordinary regions, a mesh-independent metric is also devised to estimate local curvature variation in addition to highlight lines and d irect curvature evaluation. With $(p-1)/2$ steps of smoothing operations i n each level of subdivision, the respective TPS-scheme is termed as a degr ee-$p$ scheme that produces global $C^{p-1}$ limit surfaces everywhere exc ept at a finite number of extraordinary positions where near-$G^2$ continu ity is achieved. The limit surface of TPS-schemes in extraordinary regions also exhibits appealing highlight lines, and the larger the number of smo othing operations applied in each level of subdivision, the better the fin al limit surface quality. One of the key advantages of the proposed tuning framework for TPS-schemes is that the optimization of relevant subdivisio n rules is performed by tuning structured operations of topological splitt ing and repeated smoothing that involve direct neighbors of an extraordina ry vertex only without the need of tuning large subdivision stencils. All subdivision operations of TPS-schemes are local, involving one-ring of nei ghboring vertices only, which is efficient for high-degree surface subdivi sion and convenient for practical implementation. Numerical examples also validate the superiority of TPS-schemes over other state-of-the-art subdiv ision methods in terms of both highlight lines and various curvature measu res.\n\nRegistration Category: Full Access, Full Access Supporter\n\nLangu age Format: English Language\n\nSession Chair: Hao (Richard) Zhang (Simon Fraser University, Amazon) URL:https://asia.siggraph.org/2024/program/?id=papers_1047&sess=sess145 END:VEVENT END:VCALENDAR