The content discusses stable coorbit embeddings of orbifold quotients, focusing on constructing G-invariant real-valued functions called coorbit filter banks. It unifies previous notions of max filter banks and finite coorbit filter banks. The article establishes properties such as injectivity and local lower Lipschitzness in the quotient metric. It explores the construction of coorbit filter banks for all compact groups G ≤ O(d) and addresses theoretical questions regarding their bi-Lipschitz bounds. The paper delves into the geometric analysis of coorbit maps, emphasizing principal points, semialgebraicity, avoidance notions, and group components realization. Additionally, it covers preliminary concepts on max filtering and continuity of coorbit maps.
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by Yousef Qaddu... alle arxiv.org 03-22-2024
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