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|a Current Trends on Monomial and Binomial Ideals
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|b MDPI - Multidisciplinary Digital Publishing Institute
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|a Historically, the study of monomial ideals became fashionable after the pioneering work by Richard Stanley in 1975 on the upper bound conjecture for spheres. On the other hand, since the early 1990s, under the strong influence of Gröbner bases, binomial ideals became gradually fashionable in commutative algebra. The last ten years have seen a surge of research work in the study of monomial and binomial ideals. Remarkable developments in, for example, finite free resolutions, syzygies, Hilbert functions, toric rings, as well as cohomological invariants of ordinary powers, and symbolic powers of monomial and binomial ideals, have been brought forward. The theory of monomial and binomial ideals has many benefits from combinatorics and Göbner bases. Simultaneously, monomial and binomial ideals have created new and exciting aspects of combinatorics and Göbner bases. In the present Special Issue, particular attention was paid to monomial and binomial ideals arising from combinatorial objects including finite graphs, simplicial complexes, lattice polytopes, and finite partially ordered sets, because there is a rich and intimate relationship between algebraic properties and invariants of these classes of ideals and the combinatorial structures of their combinatorial counterparts. This volume gives a brief summary of recent achievements in this area of research. It will stimulate further research that encourages breakthroughs in the theory of monomial and binomial ideals. This volume provides graduate students with fundamental materials in this research area. Furthermore, it will help researchers find exciting activities and avenues for further exploration of monomial and binomial ideals. The editors express our thanks to the contributors to the Special Issue. Funds for APC (article processing charge) were partially supported by JSPS (Japan Society for the Promotion of Science) Grants-in-Aid for Scientific Research (S) entitled ""The Birth of Modern Trends on Commutative Algebra and Convex Polytopes with Statistical and Computational Strategies"" (JP 26220701). The publication of this volume is one of the main activities of the grant.
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| 336 |
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|b txt
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| 338 |
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|b nc
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| 650 |
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|a Edge Ideal
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| 650 |
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|a Flawless
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| 650 |
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|a Cohen Macaulay
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| 650 |
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|a Dstab
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| 650 |
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|a Partially Ordered Set
|
| 650 |
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|a Stanley Depth
|
| 650 |
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|a Associated Graded Rings
|
| 650 |
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|a Stable Set Polytope
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| 650 |
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|a Stanley-Reisner Ideal
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| 650 |
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|a Linear Part
|
| 650 |
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|a Stable Set Polytopes
|
| 650 |
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|a Order And Chain Polytopes
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| 650 |
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|a Gröbner Bases
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| 650 |
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|a Distribuive Lattice
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| 650 |
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|a Cohen-Macaulay
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| 650 |
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|a Depth Of Powers Of Bipartite Graphs
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| 650 |
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|a Directed Cycle
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| 650 |
|
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|a Rees Algebra
|
| 650 |
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|a Toric Ideals
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| 650 |
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|a Polymatroidal Ideal
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| 650 |
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|a Graph
|
| 650 |
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|a Toric Ring
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| 650 |
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|a Stanley-Reisner Ring
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| 650 |
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|a Castelnuovo-Mumford Regularity
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| 650 |
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|a Chain Polytope
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| 650 |
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|a Complete Intersection
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| 650 |
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|a Symbolic Power
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| 650 |
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|a Circuit
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| 650 |
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|a H-Vector
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| 650 |
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|a Multipartite Graph
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| 650 |
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|a Monomial Ideal
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| 650 |
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|a Regular Elements On Powers Of Bipartite Graphs
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| 650 |
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|a Syzygy
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| 650 |
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|a Projective Dimension
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| 650 |
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|a Regularity
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| 650 |
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|a Betti Number
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| 650 |
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|a (S2) Condition
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| 650 |
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|a Graphs
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| 650 |
|
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|a Integral Closure
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| 650 |
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|a Edge Ring
|
| 650 |
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|a Edge Polytope
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| 650 |
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|a Stanley’S Inequality
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| 650 |
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|a O-Sequence
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| 650 |
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|a Algebras With Straightening Laws
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| 650 |
|
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|a Order Polytope
|
| 650 |
|
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|a Circulant Graphs
|
| 650 |
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|a Bipartite Graph
|
| 650 |
|
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|a Cover Ideal
|
| 650 |
|
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|a Edge Ideals
|
| 650 |
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|a Even Cycle
|
| 650 |
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|a Castelnuovo–Mumford Regularity
|
| 650 |
|
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|a Depth
|
| 650 |
|
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|a Colon Ideals
|
| 650 |
|
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|a Matching Number
|
| 650 |
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|a Bipartite Graphs
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| 980 |
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Hibi, Takayuki |
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Historically, the study of monomial ideals became fashionable after the pioneering work by Richard Stanley in 1975 on the upper bound conjecture for spheres. On the other hand, since the early 1990s, under the strong influence of Gröbner bases, binomial ideals became gradually fashionable in commutative algebra. The last ten years have seen a surge of research work in the study of monomial and binomial ideals. Remarkable developments in, for example, finite free resolutions, syzygies, Hilbert functions, toric rings, as well as cohomological invariants of ordinary powers, and symbolic powers of monomial and binomial ideals, have been brought forward. The theory of monomial and binomial ideals has many benefits from combinatorics and Göbner bases. Simultaneously, monomial and binomial ideals have created new and exciting aspects of combinatorics and Göbner bases. In the present Special Issue, particular attention was paid to monomial and binomial ideals arising from combinatorial objects including finite graphs, simplicial complexes, lattice polytopes, and finite partially ordered sets, because there is a rich and intimate relationship between algebraic properties and invariants of these classes of ideals and the combinatorial structures of their combinatorial counterparts. This volume gives a brief summary of recent achievements in this area of research. It will stimulate further research that encourages breakthroughs in the theory of monomial and binomial ideals. This volume provides graduate students with fundamental materials in this research area. Furthermore, it will help researchers find exciting activities and avenues for further exploration of monomial and binomial ideals. The editors express our thanks to the contributors to the Special Issue. Funds for APC (article processing charge) were partially supported by JSPS (Japan Society for the Promotion of Science) Grants-in-Aid for Scientific Research (S) entitled ""The Birth of Modern Trends on Commutative Algebra and Convex Polytopes with Statistical and Computational Strategies"" (JP 26220701). The publication of this volume is one of the main activities of the grant. |
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Online, Free |
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eBook |
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text-online-monograph-independent |
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e-Book |
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ElectronicBook |
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Book, E-Book |
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E-Book |
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not assigned |
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26-44454 |
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Not Illustrated |
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MDPI - Multidisciplinary Digital Publishing Institute, 2020 |
| imprint_str_mv |
MDPI - Multidisciplinary Digital Publishing Institute, 2020 |
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DE-D117, DE-L242, DE-Zwi2, DE-Ch1, DE-15, DE-540 |
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books978-3-03928-361-3, 9783039283613, 9783039283606 |
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English |
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2024-04-18T20:18:29.786Z |
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10.3390/books978-3-03928-361-3 |
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hibi2020currenttrendsonmonomialandbinomialideals |
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DOAB Directory of Open Access Books |
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1 electronic resource (140 p.) |
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2020 |
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2020 |
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MDPI - Multidisciplinary Digital Publishing Institute |
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Hibi, Takayuki auth, H auth, Current Trends on Monomial and Binomial Ideals, MDPI - Multidisciplinary Digital Publishing Institute 2020, 1 electronic resource (140 p.), text txt rdacontent, computer c rdamedia, online resource cr rdacarrier, Open Access star Unrestricted online access, Historically, the study of monomial ideals became fashionable after the pioneering work by Richard Stanley in 1975 on the upper bound conjecture for spheres. On the other hand, since the early 1990s, under the strong influence of Gröbner bases, binomial ideals became gradually fashionable in commutative algebra. The last ten years have seen a surge of research work in the study of monomial and binomial ideals. Remarkable developments in, for example, finite free resolutions, syzygies, Hilbert functions, toric rings, as well as cohomological invariants of ordinary powers, and symbolic powers of monomial and binomial ideals, have been brought forward. The theory of monomial and binomial ideals has many benefits from combinatorics and Göbner bases. Simultaneously, monomial and binomial ideals have created new and exciting aspects of combinatorics and Göbner bases. In the present Special Issue, particular attention was paid to monomial and binomial ideals arising from combinatorial objects including finite graphs, simplicial complexes, lattice polytopes, and finite partially ordered sets, because there is a rich and intimate relationship between algebraic properties and invariants of these classes of ideals and the combinatorial structures of their combinatorial counterparts. This volume gives a brief summary of recent achievements in this area of research. It will stimulate further research that encourages breakthroughs in the theory of monomial and binomial ideals. This volume provides graduate students with fundamental materials in this research area. Furthermore, it will help researchers find exciting activities and avenues for further exploration of monomial and binomial ideals. The editors express our thanks to the contributors to the Special Issue. Funds for APC (article processing charge) were partially supported by JSPS (Japan Society for the Promotion of Science) Grants-in-Aid for Scientific Research (S) entitled ""The Birth of Modern Trends on Commutative Algebra and Convex Polytopes with Statistical and Computational Strategies"" (JP 26220701). The publication of this volume is one of the main activities of the grant., Creative Commons https://creativecommons.org/licenses/by-nc-nd/4.0/ cc https://creativecommons.org/licenses/by-nc-nd/4.0/, English, www.oapen.org https://mdpi.com/books/pdfview/book/2106 0 DOAB: download the publication, www.oapen.org https://directory.doabooks.org/handle/20.500.12854/44454 0 DOAB: description of the publication, txt, nc, Edge Ideal, Flawless, Cohen Macaulay, Dstab, Partially Ordered Set, Stanley Depth, Associated Graded Rings, Stable Set Polytope, Stanley-Reisner Ideal, Linear Part, Stable Set Polytopes, Order And Chain Polytopes, Gröbner Bases, Distribuive Lattice, Cohen-Macaulay, Depth Of Powers Of Bipartite Graphs, Directed Cycle, Rees Algebra, Toric Ideals, Polymatroidal Ideal, Graph, Toric Ring, Stanley-Reisner Ring, Castelnuovo-Mumford Regularity, Chain Polytope, Complete Intersection, Symbolic Power, Circuit, H-Vector, Multipartite Graph, Monomial Ideal, Regular Elements On Powers Of Bipartite Graphs, Syzygy, Projective Dimension, Regularity, Betti Number, (S2) Condition, Graphs, Integral Closure, Edge Ring, Edge Polytope, Stanley’S Inequality, O-Sequence, Algebras With Straightening Laws, Order Polytope, Circulant Graphs, Bipartite Graph, Cover Ideal, Edge Ideals, Even Cycle, Castelnuovo–Mumford Regularity, Depth, Colon Ideals, Matching Number, Bipartite Graphs |
| spellingShingle |
Hibi, Takayuki, Current Trends on Monomial and Binomial Ideals, Historically, the study of monomial ideals became fashionable after the pioneering work by Richard Stanley in 1975 on the upper bound conjecture for spheres. On the other hand, since the early 1990s, under the strong influence of Gröbner bases, binomial ideals became gradually fashionable in commutative algebra. The last ten years have seen a surge of research work in the study of monomial and binomial ideals. Remarkable developments in, for example, finite free resolutions, syzygies, Hilbert functions, toric rings, as well as cohomological invariants of ordinary powers, and symbolic powers of monomial and binomial ideals, have been brought forward. The theory of monomial and binomial ideals has many benefits from combinatorics and Göbner bases. Simultaneously, monomial and binomial ideals have created new and exciting aspects of combinatorics and Göbner bases. In the present Special Issue, particular attention was paid to monomial and binomial ideals arising from combinatorial objects including finite graphs, simplicial complexes, lattice polytopes, and finite partially ordered sets, because there is a rich and intimate relationship between algebraic properties and invariants of these classes of ideals and the combinatorial structures of their combinatorial counterparts. This volume gives a brief summary of recent achievements in this area of research. It will stimulate further research that encourages breakthroughs in the theory of monomial and binomial ideals. This volume provides graduate students with fundamental materials in this research area. Furthermore, it will help researchers find exciting activities and avenues for further exploration of monomial and binomial ideals. The editors express our thanks to the contributors to the Special Issue. Funds for APC (article processing charge) were partially supported by JSPS (Japan Society for the Promotion of Science) Grants-in-Aid for Scientific Research (S) entitled ""The Birth of Modern Trends on Commutative Algebra and Convex Polytopes with Statistical and Computational Strategies"" (JP 26220701). The publication of this volume is one of the main activities of the grant., Edge Ideal, Flawless, Cohen Macaulay, Dstab, Partially Ordered Set, Stanley Depth, Associated Graded Rings, Stable Set Polytope, Stanley-Reisner Ideal, Linear Part, Stable Set Polytopes, Order And Chain Polytopes, Gröbner Bases, Distribuive Lattice, Cohen-Macaulay, Depth Of Powers Of Bipartite Graphs, Directed Cycle, Rees Algebra, Toric Ideals, Polymatroidal Ideal, Graph, Toric Ring, Stanley-Reisner Ring, Castelnuovo-Mumford Regularity, Chain Polytope, Complete Intersection, Symbolic Power, Circuit, H-Vector, Multipartite Graph, Monomial Ideal, Regular Elements On Powers Of Bipartite Graphs, Syzygy, Projective Dimension, Regularity, Betti Number, (S2) Condition, Graphs, Integral Closure, Edge Ring, Edge Polytope, Stanley’S Inequality, O-Sequence, Algebras With Straightening Laws, Order Polytope, Circulant Graphs, Bipartite Graph, Cover Ideal, Edge Ideals, Even Cycle, Castelnuovo–Mumford Regularity, Depth, Colon Ideals, Matching Number, Bipartite Graphs |
| title |
Current Trends on Monomial and Binomial Ideals |
| title_auth |
Current Trends on Monomial and Binomial Ideals |
| title_full |
Current Trends on Monomial and Binomial Ideals |
| title_fullStr |
Current Trends on Monomial and Binomial Ideals |
| title_full_unstemmed |
Current Trends on Monomial and Binomial Ideals |
| title_short |
Current Trends on Monomial and Binomial Ideals |
| title_sort |
current trends on monomial and binomial ideals |
| title_unstemmed |
Current Trends on Monomial and Binomial Ideals |
| topic |
Edge Ideal, Flawless, Cohen Macaulay, Dstab, Partially Ordered Set, Stanley Depth, Associated Graded Rings, Stable Set Polytope, Stanley-Reisner Ideal, Linear Part, Stable Set Polytopes, Order And Chain Polytopes, Gröbner Bases, Distribuive Lattice, Cohen-Macaulay, Depth Of Powers Of Bipartite Graphs, Directed Cycle, Rees Algebra, Toric Ideals, Polymatroidal Ideal, Graph, Toric Ring, Stanley-Reisner Ring, Castelnuovo-Mumford Regularity, Chain Polytope, Complete Intersection, Symbolic Power, Circuit, H-Vector, Multipartite Graph, Monomial Ideal, Regular Elements On Powers Of Bipartite Graphs, Syzygy, Projective Dimension, Regularity, Betti Number, (S2) Condition, Graphs, Integral Closure, Edge Ring, Edge Polytope, Stanley’S Inequality, O-Sequence, Algebras With Straightening Laws, Order Polytope, Circulant Graphs, Bipartite Graph, Cover Ideal, Edge Ideals, Even Cycle, Castelnuovo–Mumford Regularity, Depth, Colon Ideals, Matching Number, Bipartite Graphs |
| topic_facet |
Edge Ideal, Flawless, Cohen Macaulay, Dstab, Partially Ordered Set, Stanley Depth, Associated Graded Rings, Stable Set Polytope, Stanley-Reisner Ideal, Linear Part, Stable Set Polytopes, Order And Chain Polytopes, Gröbner Bases, Distribuive Lattice, Cohen-Macaulay, Depth Of Powers Of Bipartite Graphs, Directed Cycle, Rees Algebra, Toric Ideals, Polymatroidal Ideal, Graph, Toric Ring, Stanley-Reisner Ring, Castelnuovo-Mumford Regularity, Chain Polytope, Complete Intersection, Symbolic Power, Circuit, H-Vector, Multipartite Graph, Monomial Ideal, Regular Elements On Powers Of Bipartite Graphs, Syzygy, Projective Dimension, Regularity, Betti Number, (S2) Condition, Graphs, Integral Closure, Edge Ring, Edge Polytope, Stanley’S Inequality, O-Sequence, Algebras With Straightening Laws, Order Polytope, Circulant Graphs, Bipartite Graph, Cover Ideal, Edge Ideals, Even Cycle, Castelnuovo–Mumford Regularity, Depth, Colon Ideals, Matching Number, Bipartite Graphs |
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https://mdpi.com/books/pdfview/book/2106, https://directory.doabooks.org/handle/20.500.12854/44454 |
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AT hibitakayuki currenttrendsonmonomialandbinomialideals, AT h currenttrendsonmonomialandbinomialideals |
