Loading…
Exotic Quantum Difference Equations and Integral Solutions
One of the fundamental objects in the \(K\)-theoretic enumerative geometry of Nakajima quiver varieties is known as the the capping operator. It is uniquely determined as the fundamental solution to a system of \(q\)-difference equations. Such difference equations involve shifts of two sets of varia...
Saved in:
| Published in: | arXiv.org 2022-05 |
|---|---|
| Main Author: | |
| Format: | Article |
| Language: | English |
| Subjects: | |
| Online Access: | Get full text |
| Tags: |
Add Tag
No Tags, Be the first to tag this record!
|
| cited_by | |
|---|---|
| cites | |
| container_end_page | |
| container_issue | |
| container_start_page | |
| container_title | arXiv.org |
| container_volume | |
| creator | Dinkins, Hunter |
| description | One of the fundamental objects in the \(K\)-theoretic enumerative geometry of Nakajima quiver varieties is known as the the capping operator. It is uniquely determined as the fundamental solution to a system of \(q\)-difference equations. Such difference equations involve shifts of two sets of variables, the variables arising as equivariant parameters for a torus that acts on the variety and an additional set of variables known as K\"ahler parameters. The difference equations in the former variables were identified with the qKZ equations in [28]. The difference equations in the latter variables were identified representation theoretically in [30] using an analog of the quantum dynamical Weyl group. Once this representation theoretic description is known, there is an obvious generalization of these equations, which we refer to as exotic quantum difference equations. They depend on a choice of alcove in a certain hyperplane arrangement in \(\mathrm{Pic}(X)\otimes \mathbb{R}\), with the usual difference equations corresponding to the alcove containing small anti-ample line bundles. As our main result, we relate the fundamental solution of these equations back to quasimap counts using the so-called vertex with descendants, with descendants given in terms of \(K\)-theoretic stable envelopes. In the case of the Hilbert scheme of points in \(\mathbb{C}^2\), we write our exotic quantum difference equations using the quantum toroidal algebra. We use the results of [6] to obtain formulas for the \(K\)-theoretic stable envelopes of arbitrary slope. Using this, we are able to write explicit formulas for the solutions of the exotic difference equations. These formulas can be written as contour integrals. As a partially conjectural application of our results, we apply the saddlepoint approximation to these integrals to diagonalize the Bethe subalgebras of the quantum toroidal algebra for arbitrary slope. |
| format | article |
| fullrecord | <record><control><sourceid>proquest</sourceid><recordid>TN_cdi_proquest_journals_2659399221</recordid><sourceformat>XML</sourceformat><sourcesystem>PC</sourcesystem><sourcerecordid>2659399221</sourcerecordid><originalsourceid>FETCH-proquest_journals_26593992213</originalsourceid><addsrcrecordid>eNqNiksKwjAUAIMgWLR3eOC6kL6YatxqRJei-xJqKikxsfmAx1fEA7gamJkJKZCxutqsEGekjHGglGKzRs5ZQbby5ZPp4JyVS_kBe9P3OmjXaZBjVsl4F0G5G5xc0vegLFy8zV-9INNe2ajLH-dkeZDX3bF6Bj9mHVM7-BzcJ7XYcMGEQKzZf9cb1M43Ew</addsrcrecordid><sourcetype>Aggregation Database</sourcetype><iscdi>true</iscdi><recordtype>article</recordtype><pqid>2659399221</pqid></control><display><type>article</type><title>Exotic Quantum Difference Equations and Integral Solutions</title><source>ProQuest - Publicly Available Content Database</source><creator>Dinkins, Hunter</creator><creatorcontrib>Dinkins, Hunter</creatorcontrib><description>One of the fundamental objects in the \(K\)-theoretic enumerative geometry of Nakajima quiver varieties is known as the the capping operator. It is uniquely determined as the fundamental solution to a system of \(q\)-difference equations. Such difference equations involve shifts of two sets of variables, the variables arising as equivariant parameters for a torus that acts on the variety and an additional set of variables known as K\"ahler parameters. The difference equations in the former variables were identified with the qKZ equations in [28]. The difference equations in the latter variables were identified representation theoretically in [30] using an analog of the quantum dynamical Weyl group. Once this representation theoretic description is known, there is an obvious generalization of these equations, which we refer to as exotic quantum difference equations. They depend on a choice of alcove in a certain hyperplane arrangement in \(\mathrm{Pic}(X)\otimes \mathbb{R}\), with the usual difference equations corresponding to the alcove containing small anti-ample line bundles. As our main result, we relate the fundamental solution of these equations back to quasimap counts using the so-called vertex with descendants, with descendants given in terms of \(K\)-theoretic stable envelopes. In the case of the Hilbert scheme of points in \(\mathbb{C}^2\), we write our exotic quantum difference equations using the quantum toroidal algebra. We use the results of [6] to obtain formulas for the \(K\)-theoretic stable envelopes of arbitrary slope. Using this, we are able to write explicit formulas for the solutions of the exotic difference equations. These formulas can be written as contour integrals. As a partially conjectural application of our results, we apply the saddlepoint approximation to these integrals to diagonalize the Bethe subalgebras of the quantum toroidal algebra for arbitrary slope.</description><identifier>EISSN: 2331-8422</identifier><language>eng</language><publisher>Ithaca: Cornell University Library, arXiv.org</publisher><subject>Difference equations ; Envelopes ; Hyperplanes ; Integrals ; Mathematical analysis ; Operators (mathematics) ; Parameter identification ; Representations ; Toruses</subject><ispartof>arXiv.org, 2022-05</ispartof><rights>2022. This work is published under http://arxiv.org/licenses/nonexclusive-distrib/1.0/ (the “License”). Notwithstanding the ProQuest Terms and Conditions, you may use this content in accordance with the terms of the License.</rights><oa>free_for_read</oa><woscitedreferencessubscribed>false</woscitedreferencessubscribed></display><links><openurl>$$Topenurl_article</openurl><openurlfulltext>$$Topenurlfull_article</openurlfulltext><thumbnail>$$Tsyndetics_thumb_exl</thumbnail><linktohtml>$$Uhttps://www.proquest.com/docview/2659399221?pq-origsite=primo$$EHTML$$P50$$Gproquest$$Hfree_for_read</linktohtml><link.rule.ids>780,784,25753,37012,44590</link.rule.ids></links><search><creatorcontrib>Dinkins, Hunter</creatorcontrib><title>Exotic Quantum Difference Equations and Integral Solutions</title><title>arXiv.org</title><description>One of the fundamental objects in the \(K\)-theoretic enumerative geometry of Nakajima quiver varieties is known as the the capping operator. It is uniquely determined as the fundamental solution to a system of \(q\)-difference equations. Such difference equations involve shifts of two sets of variables, the variables arising as equivariant parameters for a torus that acts on the variety and an additional set of variables known as K\"ahler parameters. The difference equations in the former variables were identified with the qKZ equations in [28]. The difference equations in the latter variables were identified representation theoretically in [30] using an analog of the quantum dynamical Weyl group. Once this representation theoretic description is known, there is an obvious generalization of these equations, which we refer to as exotic quantum difference equations. They depend on a choice of alcove in a certain hyperplane arrangement in \(\mathrm{Pic}(X)\otimes \mathbb{R}\), with the usual difference equations corresponding to the alcove containing small anti-ample line bundles. As our main result, we relate the fundamental solution of these equations back to quasimap counts using the so-called vertex with descendants, with descendants given in terms of \(K\)-theoretic stable envelopes. In the case of the Hilbert scheme of points in \(\mathbb{C}^2\), we write our exotic quantum difference equations using the quantum toroidal algebra. We use the results of [6] to obtain formulas for the \(K\)-theoretic stable envelopes of arbitrary slope. Using this, we are able to write explicit formulas for the solutions of the exotic difference equations. These formulas can be written as contour integrals. As a partially conjectural application of our results, we apply the saddlepoint approximation to these integrals to diagonalize the Bethe subalgebras of the quantum toroidal algebra for arbitrary slope.</description><subject>Difference equations</subject><subject>Envelopes</subject><subject>Hyperplanes</subject><subject>Integrals</subject><subject>Mathematical analysis</subject><subject>Operators (mathematics)</subject><subject>Parameter identification</subject><subject>Representations</subject><subject>Toruses</subject><issn>2331-8422</issn><fulltext>true</fulltext><rsrctype>article</rsrctype><creationdate>2022</creationdate><recordtype>article</recordtype><sourceid>PIMPY</sourceid><recordid>eNqNiksKwjAUAIMgWLR3eOC6kL6YatxqRJei-xJqKikxsfmAx1fEA7gamJkJKZCxutqsEGekjHGglGKzRs5ZQbby5ZPp4JyVS_kBe9P3OmjXaZBjVsl4F0G5G5xc0vegLFy8zV-9INNe2ajLH-dkeZDX3bF6Bj9mHVM7-BzcJ7XYcMGEQKzZf9cb1M43Ew</recordid><startdate>20220503</startdate><enddate>20220503</enddate><creator>Dinkins, Hunter</creator><general>Cornell University Library, arXiv.org</general><scope>8FE</scope><scope>8FG</scope><scope>ABJCF</scope><scope>ABUWG</scope><scope>AFKRA</scope><scope>AZQEC</scope><scope>BENPR</scope><scope>BGLVJ</scope><scope>CCPQU</scope><scope>DWQXO</scope><scope>HCIFZ</scope><scope>L6V</scope><scope>M7S</scope><scope>PIMPY</scope><scope>PQEST</scope><scope>PQQKQ</scope><scope>PQUKI</scope><scope>PRINS</scope><scope>PTHSS</scope></search><sort><creationdate>20220503</creationdate><title>Exotic Quantum Difference Equations and Integral Solutions</title><author>Dinkins, Hunter</author></sort><facets><frbrtype>5</frbrtype><frbrgroupid>cdi_FETCH-proquest_journals_26593992213</frbrgroupid><rsrctype>articles</rsrctype><prefilter>articles</prefilter><language>eng</language><creationdate>2022</creationdate><topic>Difference equations</topic><topic>Envelopes</topic><topic>Hyperplanes</topic><topic>Integrals</topic><topic>Mathematical analysis</topic><topic>Operators (mathematics)</topic><topic>Parameter identification</topic><topic>Representations</topic><topic>Toruses</topic><toplevel>online_resources</toplevel><creatorcontrib>Dinkins, Hunter</creatorcontrib><collection>ProQuest SciTech Collection</collection><collection>ProQuest Technology Collection</collection><collection>Materials Science & Engineering Collection</collection><collection>ProQuest Central (Alumni)</collection><collection>ProQuest Central</collection><collection>ProQuest Central Essentials</collection><collection>ProQuest Central</collection><collection>Technology Collection</collection><collection>ProQuest One Community College</collection><collection>ProQuest Central</collection><collection>SciTech Premium Collection</collection><collection>ProQuest Engineering Collection</collection><collection>Engineering Database</collection><collection>ProQuest - Publicly Available Content Database</collection><collection>ProQuest One Academic Eastern Edition (DO NOT USE)</collection><collection>ProQuest One Academic</collection><collection>ProQuest One Academic UKI Edition</collection><collection>ProQuest Central China</collection><collection>Engineering collection</collection></facets><delivery><delcategory>Remote Search Resource</delcategory><fulltext>fulltext</fulltext></delivery><addata><au>Dinkins, Hunter</au><format>book</format><genre>document</genre><ristype>GEN</ristype><atitle>Exotic Quantum Difference Equations and Integral Solutions</atitle><jtitle>arXiv.org</jtitle><date>2022-05-03</date><risdate>2022</risdate><eissn>2331-8422</eissn><abstract>One of the fundamental objects in the \(K\)-theoretic enumerative geometry of Nakajima quiver varieties is known as the the capping operator. It is uniquely determined as the fundamental solution to a system of \(q\)-difference equations. Such difference equations involve shifts of two sets of variables, the variables arising as equivariant parameters for a torus that acts on the variety and an additional set of variables known as K\"ahler parameters. The difference equations in the former variables were identified with the qKZ equations in [28]. The difference equations in the latter variables were identified representation theoretically in [30] using an analog of the quantum dynamical Weyl group. Once this representation theoretic description is known, there is an obvious generalization of these equations, which we refer to as exotic quantum difference equations. They depend on a choice of alcove in a certain hyperplane arrangement in \(\mathrm{Pic}(X)\otimes \mathbb{R}\), with the usual difference equations corresponding to the alcove containing small anti-ample line bundles. As our main result, we relate the fundamental solution of these equations back to quasimap counts using the so-called vertex with descendants, with descendants given in terms of \(K\)-theoretic stable envelopes. In the case of the Hilbert scheme of points in \(\mathbb{C}^2\), we write our exotic quantum difference equations using the quantum toroidal algebra. We use the results of [6] to obtain formulas for the \(K\)-theoretic stable envelopes of arbitrary slope. Using this, we are able to write explicit formulas for the solutions of the exotic difference equations. These formulas can be written as contour integrals. As a partially conjectural application of our results, we apply the saddlepoint approximation to these integrals to diagonalize the Bethe subalgebras of the quantum toroidal algebra for arbitrary slope.</abstract><cop>Ithaca</cop><pub>Cornell University Library, arXiv.org</pub><oa>free_for_read</oa></addata></record> |
| fulltext | fulltext |
| identifier | EISSN: 2331-8422 |
| ispartof | arXiv.org, 2022-05 |
| issn | 2331-8422 |
| language | eng |
| recordid | cdi_proquest_journals_2659399221 |
| source | ProQuest - Publicly Available Content Database |
| subjects | Difference equations Envelopes Hyperplanes Integrals Mathematical analysis Operators (mathematics) Parameter identification Representations Toruses |
| title | Exotic Quantum Difference Equations and Integral Solutions |
| url | http://sfxeu10.hosted.exlibrisgroup.com/loughborough?ctx_ver=Z39.88-2004&ctx_enc=info:ofi/enc:UTF-8&ctx_tim=2024-12-29T13%3A55%3A17IST&url_ver=Z39.88-2004&url_ctx_fmt=infofi/fmt:kev:mtx:ctx&rfr_id=info:sid/primo.exlibrisgroup.com:primo3-Article-proquest&rft_val_fmt=info:ofi/fmt:kev:mtx:book&rft.genre=document&rft.atitle=Exotic%20Quantum%20Difference%20Equations%20and%20Integral%20Solutions&rft.jtitle=arXiv.org&rft.au=Dinkins,%20Hunter&rft.date=2022-05-03&rft.eissn=2331-8422&rft_id=info:doi/&rft_dat=%3Cproquest%3E2659399221%3C/proquest%3E%3Cgrp_id%3Ecdi_FETCH-proquest_journals_26593992213%3C/grp_id%3E%3Coa%3E%3C/oa%3E%3Curl%3E%3C/url%3E&rft_id=info:oai/&rft_pqid=2659399221&rft_id=info:pmid/&rfr_iscdi=true |