Combinatorics of the Lipschitz Polytope
Abstract Let %$\rho %$ be a metric on the set %$X=\{1,2,\dots ,n+1\}%$. Consider the n-dimensional polytope of functions %$f:X\rightarrow \mathbb {R}%$, which satisfy the conditions %$f(n+1)=0%$, %$|f(x)-f(y)|\leqslant \rho (x,y)%$. The question on classifying metrics depending on the combinatorics...
Ausführliche Beschreibung
Gespeichert in:
| Autor*in: |
Gordon, J. [verfasserIn] |
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| Format: |
E-Artikel |
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| Sprache: |
Englisch |
| Erschienen: |
2017 |
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| Schlagwörter: |
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| Anmerkung: |
© Institute for Mathematical Sciences (IMS), Stony Brook University, NY 2017 |
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| Übergeordnetes Werk: |
Enthalten in: Arnold mathematical journal - Berlin [u.a.] : Springer, 2015, 3(2017), 2 vom: 09. Feb., Seite 205-218 |
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| Übergeordnetes Werk: |
volume:3 ; year:2017 ; number:2 ; day:09 ; month:02 ; pages:205-218 |
| Links: |
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| DOI / URN: |
10.1007/s40598-017-0063-0 |
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| Katalog-ID: |
SPR036740594 |
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| 100 | 1 | |a Gordon, J. |e verfasserin |4 aut | |
| 245 | 1 | 0 | |a Combinatorics of the Lipschitz Polytope |
| 264 | 1 | |c 2017 | |
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| 520 | |a Abstract Let %$\rho %$ be a metric on the set %$X=\{1,2,\dots ,n+1\}%$. Consider the n-dimensional polytope of functions %$f:X\rightarrow \mathbb {R}%$, which satisfy the conditions %$f(n+1)=0%$, %$|f(x)-f(y)|\leqslant \rho (x,y)%$. The question on classifying metrics depending on the combinatorics of this polytope have been recently posed by (Vershik, Arnold Math J 1(1):75–81, 2015). We prove that for any “generic” metric the number of %$(n-m)%$-dimensional faces, %$0\leqslant m\leqslant n%$, equals %$\left( {\begin{array}{c}n+m\\ m,m,n-m\end{array}}\right) =(n+m)!/m!m!(n-m)!%$. This fact is intimately related to regular triangulations of the root polytope (convex hull of the roots of %$A_n%$ root system). Also we get two-sided estimates for the logarithm of the number of Vershik classes of metrics: %$n^3\log n%$ from above and %$n^2%$ from below. | ||
| 650 | 4 | |a Bipartite Graph |7 (dpeaa)DE-He213 | |
| 650 | 4 | |a Generic Metrics |7 (dpeaa)DE-He213 | |
| 650 | 4 | |a Regular Triangulation |7 (dpeaa)DE-He213 | |
| 650 | 4 | |a Lattice Polytope |7 (dpeaa)DE-He213 | |
| 650 | 4 | |a Admissible Graph |7 (dpeaa)DE-He213 | |
| 700 | 1 | |a Petrov, F. |4 aut | |
| 773 | 0 | 8 | |i Enthalten in |t Arnold mathematical journal |d Berlin [u.a.] : Springer, 2015 |g 3(2017), 2 vom: 09. Feb., Seite 205-218 |w (DE-627)815913737 |w (DE-600)2806570-0 |x 2199-6806 |7 nnns |
| 773 | 1 | 8 | |g volume:3 |g year:2017 |g number:2 |g day:09 |g month:02 |g pages:205-218 |
| 856 | 4 | 0 | |u https://dx.doi.org/10.1007/s40598-017-0063-0 |z lizenzpflichtig |3 Volltext |
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10.1007/s40598-017-0063-0 doi (DE-627)SPR036740594 (SPR)s40598-017-0063-0-e DE-627 ger DE-627 rakwb eng Gordon, J. verfasserin aut Combinatorics of the Lipschitz Polytope 2017 Text txt rdacontent Computermedien c rdamedia Online-Ressource cr rdacarrier © Institute for Mathematical Sciences (IMS), Stony Brook University, NY 2017 Abstract Let %$\rho %$ be a metric on the set %$X=\{1,2,\dots ,n+1\}%$. Consider the n-dimensional polytope of functions %$f:X\rightarrow \mathbb {R}%$, which satisfy the conditions %$f(n+1)=0%$, %$|f(x)-f(y)|\leqslant \rho (x,y)%$. The question on classifying metrics depending on the combinatorics of this polytope have been recently posed by (Vershik, Arnold Math J 1(1):75–81, 2015). We prove that for any “generic” metric the number of %$(n-m)%$-dimensional faces, %$0\leqslant m\leqslant n%$, equals %$\left( {\begin{array}{c}n+m\\ m,m,n-m\end{array}}\right) =(n+m)!/m!m!(n-m)!%$. This fact is intimately related to regular triangulations of the root polytope (convex hull of the roots of %$A_n%$ root system). Also we get two-sided estimates for the logarithm of the number of Vershik classes of metrics: %$n^3\log n%$ from above and %$n^2%$ from below. Bipartite Graph (dpeaa)DE-He213 Generic Metrics (dpeaa)DE-He213 Regular Triangulation (dpeaa)DE-He213 Lattice Polytope (dpeaa)DE-He213 Admissible Graph (dpeaa)DE-He213 Petrov, F. aut Enthalten in Arnold mathematical journal Berlin [u.a.] : Springer, 2015 3(2017), 2 vom: 09. Feb., Seite 205-218 (DE-627)815913737 (DE-600)2806570-0 2199-6806 nnns volume:3 year:2017 number:2 day:09 month:02 pages:205-218 https://dx.doi.org/10.1007/s40598-017-0063-0 lizenzpflichtig Volltext GBV_USEFLAG_A SYSFLAG_A GBV_SPRINGER GBV_ILN_11 GBV_ILN_20 GBV_ILN_22 GBV_ILN_23 GBV_ILN_24 GBV_ILN_31 GBV_ILN_32 GBV_ILN_39 GBV_ILN_40 GBV_ILN_60 GBV_ILN_62 GBV_ILN_63 GBV_ILN_65 GBV_ILN_69 GBV_ILN_70 GBV_ILN_73 GBV_ILN_74 GBV_ILN_90 GBV_ILN_95 GBV_ILN_100 GBV_ILN_105 GBV_ILN_110 GBV_ILN_120 GBV_ILN_138 GBV_ILN_150 GBV_ILN_151 GBV_ILN_161 GBV_ILN_170 GBV_ILN_171 GBV_ILN_187 GBV_ILN_213 GBV_ILN_224 GBV_ILN_230 GBV_ILN_250 GBV_ILN_281 GBV_ILN_285 GBV_ILN_293 GBV_ILN_370 GBV_ILN_602 GBV_ILN_636 GBV_ILN_702 GBV_ILN_2001 GBV_ILN_2003 GBV_ILN_2004 GBV_ILN_2005 GBV_ILN_2006 GBV_ILN_2007 GBV_ILN_2008 GBV_ILN_2009 GBV_ILN_2010 GBV_ILN_2011 GBV_ILN_2014 GBV_ILN_2015 GBV_ILN_2020 GBV_ILN_2021 GBV_ILN_2025 GBV_ILN_2026 GBV_ILN_2027 GBV_ILN_2031 GBV_ILN_2034 GBV_ILN_2037 GBV_ILN_2038 GBV_ILN_2039 GBV_ILN_2044 GBV_ILN_2048 GBV_ILN_2049 GBV_ILN_2050 GBV_ILN_2055 GBV_ILN_2057 GBV_ILN_2059 GBV_ILN_2061 GBV_ILN_2064 GBV_ILN_2065 GBV_ILN_2068 GBV_ILN_2070 GBV_ILN_2086 GBV_ILN_2088 GBV_ILN_2093 GBV_ILN_2106 GBV_ILN_2107 GBV_ILN_2108 GBV_ILN_2110 GBV_ILN_2111 GBV_ILN_2112 GBV_ILN_2113 GBV_ILN_2116 GBV_ILN_2118 GBV_ILN_2119 GBV_ILN_2122 GBV_ILN_2129 GBV_ILN_2143 GBV_ILN_2144 GBV_ILN_2147 GBV_ILN_2148 GBV_ILN_2152 GBV_ILN_2153 GBV_ILN_2188 GBV_ILN_2190 GBV_ILN_2232 GBV_ILN_2336 GBV_ILN_2446 GBV_ILN_2470 GBV_ILN_2472 GBV_ILN_2507 GBV_ILN_2522 GBV_ILN_2548 GBV_ILN_4035 GBV_ILN_4037 GBV_ILN_4046 GBV_ILN_4112 GBV_ILN_4125 GBV_ILN_4242 GBV_ILN_4246 GBV_ILN_4249 GBV_ILN_4251 GBV_ILN_4305 GBV_ILN_4306 GBV_ILN_4307 GBV_ILN_4313 GBV_ILN_4322 GBV_ILN_4323 GBV_ILN_4324 GBV_ILN_4325 GBV_ILN_4326 GBV_ILN_4333 GBV_ILN_4334 GBV_ILN_4335 GBV_ILN_4336 GBV_ILN_4338 GBV_ILN_4393 GBV_ILN_4700 AR 3 2017 2 09 02 205-218 |
| spelling |
10.1007/s40598-017-0063-0 doi (DE-627)SPR036740594 (SPR)s40598-017-0063-0-e DE-627 ger DE-627 rakwb eng Gordon, J. verfasserin aut Combinatorics of the Lipschitz Polytope 2017 Text txt rdacontent Computermedien c rdamedia Online-Ressource cr rdacarrier © Institute for Mathematical Sciences (IMS), Stony Brook University, NY 2017 Abstract Let %$\rho %$ be a metric on the set %$X=\{1,2,\dots ,n+1\}%$. Consider the n-dimensional polytope of functions %$f:X\rightarrow \mathbb {R}%$, which satisfy the conditions %$f(n+1)=0%$, %$|f(x)-f(y)|\leqslant \rho (x,y)%$. The question on classifying metrics depending on the combinatorics of this polytope have been recently posed by (Vershik, Arnold Math J 1(1):75–81, 2015). We prove that for any “generic” metric the number of %$(n-m)%$-dimensional faces, %$0\leqslant m\leqslant n%$, equals %$\left( {\begin{array}{c}n+m\\ m,m,n-m\end{array}}\right) =(n+m)!/m!m!(n-m)!%$. This fact is intimately related to regular triangulations of the root polytope (convex hull of the roots of %$A_n%$ root system). Also we get two-sided estimates for the logarithm of the number of Vershik classes of metrics: %$n^3\log n%$ from above and %$n^2%$ from below. Bipartite Graph (dpeaa)DE-He213 Generic Metrics (dpeaa)DE-He213 Regular Triangulation (dpeaa)DE-He213 Lattice Polytope (dpeaa)DE-He213 Admissible Graph (dpeaa)DE-He213 Petrov, F. aut Enthalten in Arnold mathematical journal Berlin [u.a.] : Springer, 2015 3(2017), 2 vom: 09. Feb., Seite 205-218 (DE-627)815913737 (DE-600)2806570-0 2199-6806 nnns volume:3 year:2017 number:2 day:09 month:02 pages:205-218 https://dx.doi.org/10.1007/s40598-017-0063-0 lizenzpflichtig Volltext GBV_USEFLAG_A SYSFLAG_A GBV_SPRINGER GBV_ILN_11 GBV_ILN_20 GBV_ILN_22 GBV_ILN_23 GBV_ILN_24 GBV_ILN_31 GBV_ILN_32 GBV_ILN_39 GBV_ILN_40 GBV_ILN_60 GBV_ILN_62 GBV_ILN_63 GBV_ILN_65 GBV_ILN_69 GBV_ILN_70 GBV_ILN_73 GBV_ILN_74 GBV_ILN_90 GBV_ILN_95 GBV_ILN_100 GBV_ILN_105 GBV_ILN_110 GBV_ILN_120 GBV_ILN_138 GBV_ILN_150 GBV_ILN_151 GBV_ILN_161 GBV_ILN_170 GBV_ILN_171 GBV_ILN_187 GBV_ILN_213 GBV_ILN_224 GBV_ILN_230 GBV_ILN_250 GBV_ILN_281 GBV_ILN_285 GBV_ILN_293 GBV_ILN_370 GBV_ILN_602 GBV_ILN_636 GBV_ILN_702 GBV_ILN_2001 GBV_ILN_2003 GBV_ILN_2004 GBV_ILN_2005 GBV_ILN_2006 GBV_ILN_2007 GBV_ILN_2008 GBV_ILN_2009 GBV_ILN_2010 GBV_ILN_2011 GBV_ILN_2014 GBV_ILN_2015 GBV_ILN_2020 GBV_ILN_2021 GBV_ILN_2025 GBV_ILN_2026 GBV_ILN_2027 GBV_ILN_2031 GBV_ILN_2034 GBV_ILN_2037 GBV_ILN_2038 GBV_ILN_2039 GBV_ILN_2044 GBV_ILN_2048 GBV_ILN_2049 GBV_ILN_2050 GBV_ILN_2055 GBV_ILN_2057 GBV_ILN_2059 GBV_ILN_2061 GBV_ILN_2064 GBV_ILN_2065 GBV_ILN_2068 GBV_ILN_2070 GBV_ILN_2086 GBV_ILN_2088 GBV_ILN_2093 GBV_ILN_2106 GBV_ILN_2107 GBV_ILN_2108 GBV_ILN_2110 GBV_ILN_2111 GBV_ILN_2112 GBV_ILN_2113 GBV_ILN_2116 GBV_ILN_2118 GBV_ILN_2119 GBV_ILN_2122 GBV_ILN_2129 GBV_ILN_2143 GBV_ILN_2144 GBV_ILN_2147 GBV_ILN_2148 GBV_ILN_2152 GBV_ILN_2153 GBV_ILN_2188 GBV_ILN_2190 GBV_ILN_2232 GBV_ILN_2336 GBV_ILN_2446 GBV_ILN_2470 GBV_ILN_2472 GBV_ILN_2507 GBV_ILN_2522 GBV_ILN_2548 GBV_ILN_4035 GBV_ILN_4037 GBV_ILN_4046 GBV_ILN_4112 GBV_ILN_4125 GBV_ILN_4242 GBV_ILN_4246 GBV_ILN_4249 GBV_ILN_4251 GBV_ILN_4305 GBV_ILN_4306 GBV_ILN_4307 GBV_ILN_4313 GBV_ILN_4322 GBV_ILN_4323 GBV_ILN_4324 GBV_ILN_4325 GBV_ILN_4326 GBV_ILN_4333 GBV_ILN_4334 GBV_ILN_4335 GBV_ILN_4336 GBV_ILN_4338 GBV_ILN_4393 GBV_ILN_4700 AR 3 2017 2 09 02 205-218 |
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10.1007/s40598-017-0063-0 doi (DE-627)SPR036740594 (SPR)s40598-017-0063-0-e DE-627 ger DE-627 rakwb eng Gordon, J. verfasserin aut Combinatorics of the Lipschitz Polytope 2017 Text txt rdacontent Computermedien c rdamedia Online-Ressource cr rdacarrier © Institute for Mathematical Sciences (IMS), Stony Brook University, NY 2017 Abstract Let %$\rho %$ be a metric on the set %$X=\{1,2,\dots ,n+1\}%$. Consider the n-dimensional polytope of functions %$f:X\rightarrow \mathbb {R}%$, which satisfy the conditions %$f(n+1)=0%$, %$|f(x)-f(y)|\leqslant \rho (x,y)%$. The question on classifying metrics depending on the combinatorics of this polytope have been recently posed by (Vershik, Arnold Math J 1(1):75–81, 2015). We prove that for any “generic” metric the number of %$(n-m)%$-dimensional faces, %$0\leqslant m\leqslant n%$, equals %$\left( {\begin{array}{c}n+m\\ m,m,n-m\end{array}}\right) =(n+m)!/m!m!(n-m)!%$. This fact is intimately related to regular triangulations of the root polytope (convex hull of the roots of %$A_n%$ root system). Also we get two-sided estimates for the logarithm of the number of Vershik classes of metrics: %$n^3\log n%$ from above and %$n^2%$ from below. Bipartite Graph (dpeaa)DE-He213 Generic Metrics (dpeaa)DE-He213 Regular Triangulation (dpeaa)DE-He213 Lattice Polytope (dpeaa)DE-He213 Admissible Graph (dpeaa)DE-He213 Petrov, F. aut Enthalten in Arnold mathematical journal Berlin [u.a.] : Springer, 2015 3(2017), 2 vom: 09. Feb., Seite 205-218 (DE-627)815913737 (DE-600)2806570-0 2199-6806 nnns volume:3 year:2017 number:2 day:09 month:02 pages:205-218 https://dx.doi.org/10.1007/s40598-017-0063-0 lizenzpflichtig Volltext GBV_USEFLAG_A SYSFLAG_A GBV_SPRINGER GBV_ILN_11 GBV_ILN_20 GBV_ILN_22 GBV_ILN_23 GBV_ILN_24 GBV_ILN_31 GBV_ILN_32 GBV_ILN_39 GBV_ILN_40 GBV_ILN_60 GBV_ILN_62 GBV_ILN_63 GBV_ILN_65 GBV_ILN_69 GBV_ILN_70 GBV_ILN_73 GBV_ILN_74 GBV_ILN_90 GBV_ILN_95 GBV_ILN_100 GBV_ILN_105 GBV_ILN_110 GBV_ILN_120 GBV_ILN_138 GBV_ILN_150 GBV_ILN_151 GBV_ILN_161 GBV_ILN_170 GBV_ILN_171 GBV_ILN_187 GBV_ILN_213 GBV_ILN_224 GBV_ILN_230 GBV_ILN_250 GBV_ILN_281 GBV_ILN_285 GBV_ILN_293 GBV_ILN_370 GBV_ILN_602 GBV_ILN_636 GBV_ILN_702 GBV_ILN_2001 GBV_ILN_2003 GBV_ILN_2004 GBV_ILN_2005 GBV_ILN_2006 GBV_ILN_2007 GBV_ILN_2008 GBV_ILN_2009 GBV_ILN_2010 GBV_ILN_2011 GBV_ILN_2014 GBV_ILN_2015 GBV_ILN_2020 GBV_ILN_2021 GBV_ILN_2025 GBV_ILN_2026 GBV_ILN_2027 GBV_ILN_2031 GBV_ILN_2034 GBV_ILN_2037 GBV_ILN_2038 GBV_ILN_2039 GBV_ILN_2044 GBV_ILN_2048 GBV_ILN_2049 GBV_ILN_2050 GBV_ILN_2055 GBV_ILN_2057 GBV_ILN_2059 GBV_ILN_2061 GBV_ILN_2064 GBV_ILN_2065 GBV_ILN_2068 GBV_ILN_2070 GBV_ILN_2086 GBV_ILN_2088 GBV_ILN_2093 GBV_ILN_2106 GBV_ILN_2107 GBV_ILN_2108 GBV_ILN_2110 GBV_ILN_2111 GBV_ILN_2112 GBV_ILN_2113 GBV_ILN_2116 GBV_ILN_2118 GBV_ILN_2119 GBV_ILN_2122 GBV_ILN_2129 GBV_ILN_2143 GBV_ILN_2144 GBV_ILN_2147 GBV_ILN_2148 GBV_ILN_2152 GBV_ILN_2153 GBV_ILN_2188 GBV_ILN_2190 GBV_ILN_2232 GBV_ILN_2336 GBV_ILN_2446 GBV_ILN_2470 GBV_ILN_2472 GBV_ILN_2507 GBV_ILN_2522 GBV_ILN_2548 GBV_ILN_4035 GBV_ILN_4037 GBV_ILN_4046 GBV_ILN_4112 GBV_ILN_4125 GBV_ILN_4242 GBV_ILN_4246 GBV_ILN_4249 GBV_ILN_4251 GBV_ILN_4305 GBV_ILN_4306 GBV_ILN_4307 GBV_ILN_4313 GBV_ILN_4322 GBV_ILN_4323 GBV_ILN_4324 GBV_ILN_4325 GBV_ILN_4326 GBV_ILN_4333 GBV_ILN_4334 GBV_ILN_4335 GBV_ILN_4336 GBV_ILN_4338 GBV_ILN_4393 GBV_ILN_4700 AR 3 2017 2 09 02 205-218 |
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10.1007/s40598-017-0063-0 doi (DE-627)SPR036740594 (SPR)s40598-017-0063-0-e DE-627 ger DE-627 rakwb eng Gordon, J. verfasserin aut Combinatorics of the Lipschitz Polytope 2017 Text txt rdacontent Computermedien c rdamedia Online-Ressource cr rdacarrier © Institute for Mathematical Sciences (IMS), Stony Brook University, NY 2017 Abstract Let %$\rho %$ be a metric on the set %$X=\{1,2,\dots ,n+1\}%$. Consider the n-dimensional polytope of functions %$f:X\rightarrow \mathbb {R}%$, which satisfy the conditions %$f(n+1)=0%$, %$|f(x)-f(y)|\leqslant \rho (x,y)%$. The question on classifying metrics depending on the combinatorics of this polytope have been recently posed by (Vershik, Arnold Math J 1(1):75–81, 2015). We prove that for any “generic” metric the number of %$(n-m)%$-dimensional faces, %$0\leqslant m\leqslant n%$, equals %$\left( {\begin{array}{c}n+m\\ m,m,n-m\end{array}}\right) =(n+m)!/m!m!(n-m)!%$. This fact is intimately related to regular triangulations of the root polytope (convex hull of the roots of %$A_n%$ root system). Also we get two-sided estimates for the logarithm of the number of Vershik classes of metrics: %$n^3\log n%$ from above and %$n^2%$ from below. Bipartite Graph (dpeaa)DE-He213 Generic Metrics (dpeaa)DE-He213 Regular Triangulation (dpeaa)DE-He213 Lattice Polytope (dpeaa)DE-He213 Admissible Graph (dpeaa)DE-He213 Petrov, F. aut Enthalten in Arnold mathematical journal Berlin [u.a.] : Springer, 2015 3(2017), 2 vom: 09. Feb., Seite 205-218 (DE-627)815913737 (DE-600)2806570-0 2199-6806 nnns volume:3 year:2017 number:2 day:09 month:02 pages:205-218 https://dx.doi.org/10.1007/s40598-017-0063-0 lizenzpflichtig Volltext GBV_USEFLAG_A SYSFLAG_A GBV_SPRINGER GBV_ILN_11 GBV_ILN_20 GBV_ILN_22 GBV_ILN_23 GBV_ILN_24 GBV_ILN_31 GBV_ILN_32 GBV_ILN_39 GBV_ILN_40 GBV_ILN_60 GBV_ILN_62 GBV_ILN_63 GBV_ILN_65 GBV_ILN_69 GBV_ILN_70 GBV_ILN_73 GBV_ILN_74 GBV_ILN_90 GBV_ILN_95 GBV_ILN_100 GBV_ILN_105 GBV_ILN_110 GBV_ILN_120 GBV_ILN_138 GBV_ILN_150 GBV_ILN_151 GBV_ILN_161 GBV_ILN_170 GBV_ILN_171 GBV_ILN_187 GBV_ILN_213 GBV_ILN_224 GBV_ILN_230 GBV_ILN_250 GBV_ILN_281 GBV_ILN_285 GBV_ILN_293 GBV_ILN_370 GBV_ILN_602 GBV_ILN_636 GBV_ILN_702 GBV_ILN_2001 GBV_ILN_2003 GBV_ILN_2004 GBV_ILN_2005 GBV_ILN_2006 GBV_ILN_2007 GBV_ILN_2008 GBV_ILN_2009 GBV_ILN_2010 GBV_ILN_2011 GBV_ILN_2014 GBV_ILN_2015 GBV_ILN_2020 GBV_ILN_2021 GBV_ILN_2025 GBV_ILN_2026 GBV_ILN_2027 GBV_ILN_2031 GBV_ILN_2034 GBV_ILN_2037 GBV_ILN_2038 GBV_ILN_2039 GBV_ILN_2044 GBV_ILN_2048 GBV_ILN_2049 GBV_ILN_2050 GBV_ILN_2055 GBV_ILN_2057 GBV_ILN_2059 GBV_ILN_2061 GBV_ILN_2064 GBV_ILN_2065 GBV_ILN_2068 GBV_ILN_2070 GBV_ILN_2086 GBV_ILN_2088 GBV_ILN_2093 GBV_ILN_2106 GBV_ILN_2107 GBV_ILN_2108 GBV_ILN_2110 GBV_ILN_2111 GBV_ILN_2112 GBV_ILN_2113 GBV_ILN_2116 GBV_ILN_2118 GBV_ILN_2119 GBV_ILN_2122 GBV_ILN_2129 GBV_ILN_2143 GBV_ILN_2144 GBV_ILN_2147 GBV_ILN_2148 GBV_ILN_2152 GBV_ILN_2153 GBV_ILN_2188 GBV_ILN_2190 GBV_ILN_2232 GBV_ILN_2336 GBV_ILN_2446 GBV_ILN_2470 GBV_ILN_2472 GBV_ILN_2507 GBV_ILN_2522 GBV_ILN_2548 GBV_ILN_4035 GBV_ILN_4037 GBV_ILN_4046 GBV_ILN_4112 GBV_ILN_4125 GBV_ILN_4242 GBV_ILN_4246 GBV_ILN_4249 GBV_ILN_4251 GBV_ILN_4305 GBV_ILN_4306 GBV_ILN_4307 GBV_ILN_4313 GBV_ILN_4322 GBV_ILN_4323 GBV_ILN_4324 GBV_ILN_4325 GBV_ILN_4326 GBV_ILN_4333 GBV_ILN_4334 GBV_ILN_4335 GBV_ILN_4336 GBV_ILN_4338 GBV_ILN_4393 GBV_ILN_4700 AR 3 2017 2 09 02 205-218 |
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10.1007/s40598-017-0063-0 doi (DE-627)SPR036740594 (SPR)s40598-017-0063-0-e DE-627 ger DE-627 rakwb eng Gordon, J. verfasserin aut Combinatorics of the Lipschitz Polytope 2017 Text txt rdacontent Computermedien c rdamedia Online-Ressource cr rdacarrier © Institute for Mathematical Sciences (IMS), Stony Brook University, NY 2017 Abstract Let %$\rho %$ be a metric on the set %$X=\{1,2,\dots ,n+1\}%$. Consider the n-dimensional polytope of functions %$f:X\rightarrow \mathbb {R}%$, which satisfy the conditions %$f(n+1)=0%$, %$|f(x)-f(y)|\leqslant \rho (x,y)%$. The question on classifying metrics depending on the combinatorics of this polytope have been recently posed by (Vershik, Arnold Math J 1(1):75–81, 2015). We prove that for any “generic” metric the number of %$(n-m)%$-dimensional faces, %$0\leqslant m\leqslant n%$, equals %$\left( {\begin{array}{c}n+m\\ m,m,n-m\end{array}}\right) =(n+m)!/m!m!(n-m)!%$. This fact is intimately related to regular triangulations of the root polytope (convex hull of the roots of %$A_n%$ root system). Also we get two-sided estimates for the logarithm of the number of Vershik classes of metrics: %$n^3\log n%$ from above and %$n^2%$ from below. Bipartite Graph (dpeaa)DE-He213 Generic Metrics (dpeaa)DE-He213 Regular Triangulation (dpeaa)DE-He213 Lattice Polytope (dpeaa)DE-He213 Admissible Graph (dpeaa)DE-He213 Petrov, F. aut Enthalten in Arnold mathematical journal Berlin [u.a.] : Springer, 2015 3(2017), 2 vom: 09. Feb., Seite 205-218 (DE-627)815913737 (DE-600)2806570-0 2199-6806 nnns volume:3 year:2017 number:2 day:09 month:02 pages:205-218 https://dx.doi.org/10.1007/s40598-017-0063-0 lizenzpflichtig Volltext GBV_USEFLAG_A SYSFLAG_A GBV_SPRINGER GBV_ILN_11 GBV_ILN_20 GBV_ILN_22 GBV_ILN_23 GBV_ILN_24 GBV_ILN_31 GBV_ILN_32 GBV_ILN_39 GBV_ILN_40 GBV_ILN_60 GBV_ILN_62 GBV_ILN_63 GBV_ILN_65 GBV_ILN_69 GBV_ILN_70 GBV_ILN_73 GBV_ILN_74 GBV_ILN_90 GBV_ILN_95 GBV_ILN_100 GBV_ILN_105 GBV_ILN_110 GBV_ILN_120 GBV_ILN_138 GBV_ILN_150 GBV_ILN_151 GBV_ILN_161 GBV_ILN_170 GBV_ILN_171 GBV_ILN_187 GBV_ILN_213 GBV_ILN_224 GBV_ILN_230 GBV_ILN_250 GBV_ILN_281 GBV_ILN_285 GBV_ILN_293 GBV_ILN_370 GBV_ILN_602 GBV_ILN_636 GBV_ILN_702 GBV_ILN_2001 GBV_ILN_2003 GBV_ILN_2004 GBV_ILN_2005 GBV_ILN_2006 GBV_ILN_2007 GBV_ILN_2008 GBV_ILN_2009 GBV_ILN_2010 GBV_ILN_2011 GBV_ILN_2014 GBV_ILN_2015 GBV_ILN_2020 GBV_ILN_2021 GBV_ILN_2025 GBV_ILN_2026 GBV_ILN_2027 GBV_ILN_2031 GBV_ILN_2034 GBV_ILN_2037 GBV_ILN_2038 GBV_ILN_2039 GBV_ILN_2044 GBV_ILN_2048 GBV_ILN_2049 GBV_ILN_2050 GBV_ILN_2055 GBV_ILN_2057 GBV_ILN_2059 GBV_ILN_2061 GBV_ILN_2064 GBV_ILN_2065 GBV_ILN_2068 GBV_ILN_2070 GBV_ILN_2086 GBV_ILN_2088 GBV_ILN_2093 GBV_ILN_2106 GBV_ILN_2107 GBV_ILN_2108 GBV_ILN_2110 GBV_ILN_2111 GBV_ILN_2112 GBV_ILN_2113 GBV_ILN_2116 GBV_ILN_2118 GBV_ILN_2119 GBV_ILN_2122 GBV_ILN_2129 GBV_ILN_2143 GBV_ILN_2144 GBV_ILN_2147 GBV_ILN_2148 GBV_ILN_2152 GBV_ILN_2153 GBV_ILN_2188 GBV_ILN_2190 GBV_ILN_2232 GBV_ILN_2336 GBV_ILN_2446 GBV_ILN_2470 GBV_ILN_2472 GBV_ILN_2507 GBV_ILN_2522 GBV_ILN_2548 GBV_ILN_4035 GBV_ILN_4037 GBV_ILN_4046 GBV_ILN_4112 GBV_ILN_4125 GBV_ILN_4242 GBV_ILN_4246 GBV_ILN_4249 GBV_ILN_4251 GBV_ILN_4305 GBV_ILN_4306 GBV_ILN_4307 GBV_ILN_4313 GBV_ILN_4322 GBV_ILN_4323 GBV_ILN_4324 GBV_ILN_4325 GBV_ILN_4326 GBV_ILN_4333 GBV_ILN_4334 GBV_ILN_4335 GBV_ILN_4336 GBV_ILN_4338 GBV_ILN_4393 GBV_ILN_4700 AR 3 2017 2 09 02 205-218 |
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Gordon, J. |
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Gordon, J. misc Bipartite Graph misc Generic Metrics misc Regular Triangulation misc Lattice Polytope misc Admissible Graph Combinatorics of the Lipschitz Polytope |
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Combinatorics of the Lipschitz Polytope Bipartite Graph (dpeaa)DE-He213 Generic Metrics (dpeaa)DE-He213 Regular Triangulation (dpeaa)DE-He213 Lattice Polytope (dpeaa)DE-He213 Admissible Graph (dpeaa)DE-He213 |
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misc Bipartite Graph misc Generic Metrics misc Regular Triangulation misc Lattice Polytope misc Admissible Graph |
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Elektronische Aufsätze Aufsätze Elektronische Ressource |
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Combinatorics of the Lipschitz Polytope |
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Combinatorics of the Lipschitz Polytope |
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Gordon, J. |
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combinatorics of the lipschitz polytope |
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Combinatorics of the Lipschitz Polytope |
| abstract |
Abstract Let %$\rho %$ be a metric on the set %$X=\{1,2,\dots ,n+1\}%$. Consider the n-dimensional polytope of functions %$f:X\rightarrow \mathbb {R}%$, which satisfy the conditions %$f(n+1)=0%$, %$|f(x)-f(y)|\leqslant \rho (x,y)%$. The question on classifying metrics depending on the combinatorics of this polytope have been recently posed by (Vershik, Arnold Math J 1(1):75–81, 2015). We prove that for any “generic” metric the number of %$(n-m)%$-dimensional faces, %$0\leqslant m\leqslant n%$, equals %$\left( {\begin{array}{c}n+m\\ m,m,n-m\end{array}}\right) =(n+m)!/m!m!(n-m)!%$. This fact is intimately related to regular triangulations of the root polytope (convex hull of the roots of %$A_n%$ root system). Also we get two-sided estimates for the logarithm of the number of Vershik classes of metrics: %$n^3\log n%$ from above and %$n^2%$ from below. © Institute for Mathematical Sciences (IMS), Stony Brook University, NY 2017 |
| abstractGer |
Abstract Let %$\rho %$ be a metric on the set %$X=\{1,2,\dots ,n+1\}%$. Consider the n-dimensional polytope of functions %$f:X\rightarrow \mathbb {R}%$, which satisfy the conditions %$f(n+1)=0%$, %$|f(x)-f(y)|\leqslant \rho (x,y)%$. The question on classifying metrics depending on the combinatorics of this polytope have been recently posed by (Vershik, Arnold Math J 1(1):75–81, 2015). We prove that for any “generic” metric the number of %$(n-m)%$-dimensional faces, %$0\leqslant m\leqslant n%$, equals %$\left( {\begin{array}{c}n+m\\ m,m,n-m\end{array}}\right) =(n+m)!/m!m!(n-m)!%$. This fact is intimately related to regular triangulations of the root polytope (convex hull of the roots of %$A_n%$ root system). Also we get two-sided estimates for the logarithm of the number of Vershik classes of metrics: %$n^3\log n%$ from above and %$n^2%$ from below. © Institute for Mathematical Sciences (IMS), Stony Brook University, NY 2017 |
| abstract_unstemmed |
Abstract Let %$\rho %$ be a metric on the set %$X=\{1,2,\dots ,n+1\}%$. Consider the n-dimensional polytope of functions %$f:X\rightarrow \mathbb {R}%$, which satisfy the conditions %$f(n+1)=0%$, %$|f(x)-f(y)|\leqslant \rho (x,y)%$. The question on classifying metrics depending on the combinatorics of this polytope have been recently posed by (Vershik, Arnold Math J 1(1):75–81, 2015). We prove that for any “generic” metric the number of %$(n-m)%$-dimensional faces, %$0\leqslant m\leqslant n%$, equals %$\left( {\begin{array}{c}n+m\\ m,m,n-m\end{array}}\right) =(n+m)!/m!m!(n-m)!%$. This fact is intimately related to regular triangulations of the root polytope (convex hull of the roots of %$A_n%$ root system). Also we get two-sided estimates for the logarithm of the number of Vershik classes of metrics: %$n^3\log n%$ from above and %$n^2%$ from below. © Institute for Mathematical Sciences (IMS), Stony Brook University, NY 2017 |
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Combinatorics of the Lipschitz Polytope |
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https://dx.doi.org/10.1007/s40598-017-0063-0 |
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Petrov, F. |
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10.1007/s40598-017-0063-0 |
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