A tangent method derivation of the arctic curve for $q$-weighted paths with arbitrary starting points

International audience We use a tangent method approach to obtain the arctic curve in a model of non-intersecting lattice paths within the first quadrant, including a $q$-dependent weight associated with the area delimited by the paths. Our model is characterized by an arbitrary sequence of starting...

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Published in:	Journal of Physics A: Mathematical and Theoretical
Main Authors:	Di Francesco, Philippe, Guitter, Emmanuel
Other Authors:	Department of Mathematics, Illinois State University, Illinois State University, Institut de Physique Théorique - UMR CNRS 3681 (IPHT), Commissariat à l'énergie atomique et aux énergies alternatives (CEA)-Université Paris-Saclay-Centre National de la Recherche Scientifique (CNRS), Université Paris-Saclay, ANR-14-CE25-0014,GRAAL,GRaphes et Arbres ALéatoires(2014)
Format:	Article in Journal/Newspaper
Language:	English
Published:	HAL CCSD 2019
Subjects:	non-intersecting lattice paths continuum limit arctic curve [PHYS]Physics [physics] Arctic
Online Access:	https://hal-cea.archives-ouvertes.fr/cea-02932285 https://hal-cea.archives-ouvertes.fr/cea-02932285/document https://hal-cea.archives-ouvertes.fr/cea-02932285/file/1810.07936v1.pdf https://doi.org/10.1088/1751-8121/ab03ff

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spelling	ftunivnantes:oai:HAL:cea-02932285v1 2023-05-15T14:34:21+02:00 A tangent method derivation of the arctic curve for $q$-weighted paths with arbitrary starting points Di Francesco, Philippe Guitter, Emmanuel Department of Mathematics, Illinois State University Illinois State University Institut de Physique Théorique - UMR CNRS 3681 (IPHT) Commissariat à l'énergie atomique et aux énergies alternatives (CEA)-Université Paris-Saclay-Centre National de la Recherche Scientifique (CNRS) Université Paris-Saclay ANR-14-CE25-0014,GRAAL,GRaphes et Arbres ALéatoires(2014) 2019-03-15 https://hal-cea.archives-ouvertes.fr/cea-02932285 https://hal-cea.archives-ouvertes.fr/cea-02932285/document https://hal-cea.archives-ouvertes.fr/cea-02932285/file/1810.07936v1.pdf https://doi.org/10.1088/1751-8121/ab03ff en eng HAL CCSD IOP Publishing info:eu-repo/semantics/altIdentifier/doi/10.1088/1751-8121/ab03ff cea-02932285 https://hal-cea.archives-ouvertes.fr/cea-02932285 https://hal-cea.archives-ouvertes.fr/cea-02932285/document https://hal-cea.archives-ouvertes.fr/cea-02932285/file/1810.07936v1.pdf doi:10.1088/1751-8121/ab03ff info:eu-repo/semantics/OpenAccess ISSN: 1751-8113 EISSN: 1751-8121 Journal of Physics A: Mathematical and Theoretical https://hal-cea.archives-ouvertes.fr/cea-02932285 Journal of Physics A: Mathematical and Theoretical, IOP Publishing, 2019, 52 (11), pp.115205. ⟨10.1088/1751-8121/ab03ff⟩ non-intersecting lattice paths continuum limit arctic curve [PHYS]Physics [physics] info:eu-repo/semantics/article Journal articles 2019 ftunivnantes https://doi.org/10.1088/1751-8121/ab03ff 2022-06-29T03:41:46Z International audience We use a tangent method approach to obtain the arctic curve in a model of non-intersecting lattice paths within the first quadrant, including a $q$-dependent weight associated with the area delimited by the paths. Our model is characterized by an arbitrary sequence of starting points along the positive horizontal axis, whose distribution involves an arbitrary piecewise differentiable function. We give an explicit expression for the arctic curve in terms of this arbitrary function and of the parameter $q$. A particular emphasis is put on the deformation of the arctic curve upon varying $q$, and on its limiting shapes when $q$ tends to $0$ or infinity. Our analytic results are illustrated by a number of detailed examples. Article in Journal/Newspaper Arctic Université de Nantes: HAL-UNIV-NANTES Arctic Journal of Physics A: Mathematical and Theoretical 52 11 115205
institution	Open Polar
collection	Université de Nantes: HAL-UNIV-NANTES
op_collection_id	ftunivnantes
language	English
topic	non-intersecting lattice paths continuum limit arctic curve [PHYS]Physics [physics]
spellingShingle	non-intersecting lattice paths continuum limit arctic curve [PHYS]Physics [physics] Di Francesco, Philippe Guitter, Emmanuel A tangent method derivation of the arctic curve for $q$-weighted paths with arbitrary starting points
topic_facet	non-intersecting lattice paths continuum limit arctic curve [PHYS]Physics [physics]
description	International audience We use a tangent method approach to obtain the arctic curve in a model of non-intersecting lattice paths within the first quadrant, including a $q$-dependent weight associated with the area delimited by the paths. Our model is characterized by an arbitrary sequence of starting points along the positive horizontal axis, whose distribution involves an arbitrary piecewise differentiable function. We give an explicit expression for the arctic curve in terms of this arbitrary function and of the parameter $q$. A particular emphasis is put on the deformation of the arctic curve upon varying $q$, and on its limiting shapes when $q$ tends to $0$ or infinity. Our analytic results are illustrated by a number of detailed examples.
author2	Department of Mathematics, Illinois State University Illinois State University Institut de Physique Théorique - UMR CNRS 3681 (IPHT) Commissariat à l'énergie atomique et aux énergies alternatives (CEA)-Université Paris-Saclay-Centre National de la Recherche Scientifique (CNRS) Université Paris-Saclay ANR-14-CE25-0014,GRAAL,GRaphes et Arbres ALéatoires(2014)
format	Article in Journal/Newspaper
author	Di Francesco, Philippe Guitter, Emmanuel
author_facet	Di Francesco, Philippe Guitter, Emmanuel
author_sort	Di Francesco, Philippe
title	A tangent method derivation of the arctic curve for $q$-weighted paths with arbitrary starting points
title_short	A tangent method derivation of the arctic curve for $q$-weighted paths with arbitrary starting points
title_full	A tangent method derivation of the arctic curve for $q$-weighted paths with arbitrary starting points
title_fullStr	A tangent method derivation of the arctic curve for $q$-weighted paths with arbitrary starting points
title_full_unstemmed	A tangent method derivation of the arctic curve for $q$-weighted paths with arbitrary starting points
title_sort	tangent method derivation of the arctic curve for $q$-weighted paths with arbitrary starting points
publisher	HAL CCSD
publishDate	2019
url	https://hal-cea.archives-ouvertes.fr/cea-02932285 https://hal-cea.archives-ouvertes.fr/cea-02932285/document https://hal-cea.archives-ouvertes.fr/cea-02932285/file/1810.07936v1.pdf https://doi.org/10.1088/1751-8121/ab03ff
geographic	Arctic
geographic_facet	Arctic
genre	Arctic
genre_facet	Arctic
op_source	ISSN: 1751-8113 EISSN: 1751-8121 Journal of Physics A: Mathematical and Theoretical https://hal-cea.archives-ouvertes.fr/cea-02932285 Journal of Physics A: Mathematical and Theoretical, IOP Publishing, 2019, 52 (11), pp.115205. ⟨10.1088/1751-8121/ab03ff⟩
op_relation	info:eu-repo/semantics/altIdentifier/doi/10.1088/1751-8121/ab03ff cea-02932285 https://hal-cea.archives-ouvertes.fr/cea-02932285 https://hal-cea.archives-ouvertes.fr/cea-02932285/document https://hal-cea.archives-ouvertes.fr/cea-02932285/file/1810.07936v1.pdf doi:10.1088/1751-8121/ab03ff
op_rights	info:eu-repo/semantics/OpenAccess
op_doi	https://doi.org/10.1088/1751-8121/ab03ff
container_title	Journal of Physics A: Mathematical and Theoretical
container_volume	52
container_issue	11
container_start_page	115205
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A tangent method derivation of the arctic curve for $q$-weighted paths with arbitrary starting points

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