6.3 Generalizations and variations of Schur's Theorem
2 min read•july 25, 2024
Schur's Theorem gets a makeover with higher-dimensional and multicolor extensions. These generalizations expand the theorem's reach, exploring sum-free sets in various dimensions and introducing for broader color schemes.
take center stage, revealing intriguing properties and computational challenges. Variations like and connections to other math areas showcase the theorem's versatility, while real-world applications demonstrate its practical relevance in scheduling and network design.
Generalizations of Schur's Theorem
Higher-dimensional Schur's Theorem
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Top images from around the web for Higher-dimensional Schur's Theorem
real analysis - Using the Weierstrass Approximation Theorem, prove that $C([0,1], \mathbb{R ... View original
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Schur Convexity and the Dual Simpson’s Formula View original
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st.statistics - Bounding sum of multinomial coefficients by highest entropy one - MathOverflow View original
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real analysis - Using the Weierstrass Approximation Theorem, prove that $C([0,1], \mathbb{R ... View original
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Schur Convexity and the Dual Simpson’s Formula View original