Invariant Quantum Algorithms for Insertion into an Ordered List
We consider the problem of inserting one item into a list of N-1 ordered items. We previously showed that no quantum algorithm could solve this problem in fewer than log N/(2 log log N) queries, for N large. We transform the problem into a "translationally invariant" problem and restrict a...
Saved in:
| Main Authors | , , , |
|---|---|
| Format | Journal Article |
| Language | English |
| Published |
19.01.1999
|
| Subjects | |
| Online Access | Get full text |
Cover
Loading…
| Abstract | We consider the problem of inserting one item into a list of N-1 ordered
items. We previously showed that no quantum algorithm could solve this problem
in fewer than log N/(2 log log N) queries, for N large. We transform the
problem into a "translationally invariant" problem and restrict attention to
invariant algorithms. We construct the "greedy" invariant algorithm and show
numerically that it outperforms the best classical algorithm for various N. We
also find invariant algorithms that succeed exactly in fewer queries than is
classically possible, and iterating one of them shows that the insertion
problem can be solved in fewer than 0.53 log N quantum queries for large N
(where log N is the classical lower bound). We don't know whether a o(log N)
algorithm exists. |
|---|---|
| AbstractList | We consider the problem of inserting one item into a list of N-1 ordered
items. We previously showed that no quantum algorithm could solve this problem
in fewer than log N/(2 log log N) queries, for N large. We transform the
problem into a "translationally invariant" problem and restrict attention to
invariant algorithms. We construct the "greedy" invariant algorithm and show
numerically that it outperforms the best classical algorithm for various N. We
also find invariant algorithms that succeed exactly in fewer queries than is
classically possible, and iterating one of them shows that the insertion
problem can be solved in fewer than 0.53 log N quantum queries for large N
(where log N is the classical lower bound). We don't know whether a o(log N)
algorithm exists. |
| Author | Farhi, Edward Gutmann, Sam Goldstone, Jeffrey Sipser, Michael |
| Author_xml | – sequence: 1 givenname: Edward surname: Farhi fullname: Farhi, Edward – sequence: 2 givenname: Jeffrey surname: Goldstone fullname: Goldstone, Jeffrey – sequence: 3 givenname: Sam surname: Gutmann fullname: Gutmann, Sam – sequence: 4 givenname: Michael surname: Sipser fullname: Sipser, Michael |
| BackLink | https://doi.org/10.48550/arXiv.quant-ph/9901059$$DView paper in arXiv |
| BookMark | eNotz19LwzAUBfA86INOP4N58bFbsjRp75OM4Z9CYQh7L7e5qQ2saU2zod9enXs6cA4c-N2yqzAGx9iDFMu81FqsMH750_LziCFlU78CEFJouGFPVThh9L81f_8bjwPfHD7G6FM_zLwbI6_C7GLyY-A-pJFj4LtILjritZ_THbvu8DC7-0su2P7leb99y-rda7Xd1BkWAFlBQgCpddmZgpS2RiJS24EuJVoEonVupQGyWKCkFowyojQ2JyjIUivUgj3-354dzRT9gPG7OXuaqW8uHvUD8JhLyw |
| ContentType | Journal Article |
| DBID | GOX |
| DOI | 10.48550/arxiv.quant-ph/9901059 |
| DatabaseName | arXiv.org |
| DatabaseTitleList | |
| Database_xml | – sequence: 1 dbid: GOX name: arXiv.org url: http://arxiv.org/find sourceTypes: Open Access Repository |
| DeliveryMethod | fulltext_linktorsrc |
| ExternalDocumentID | quant_ph_9901059 |
| GroupedDBID | GOX |
| ID | FETCH-LOGICAL-a799-7d009d328f67d35c61aadbf9581aca9dd24c169dca7a1db9636086c4d97dcdb03 |
| IEDL.DBID | GOX |
| IngestDate | Mon Jan 08 05:47:17 EST 2024 |
| IsDoiOpenAccess | true |
| IsOpenAccess | true |
| IsPeerReviewed | false |
| IsScholarly | false |
| Language | English |
| LinkModel | DirectLink |
| MergedId | FETCHMERGED-LOGICAL-a799-7d009d328f67d35c61aadbf9581aca9dd24c169dca7a1db9636086c4d97dcdb03 |
| Notes | MIT-CTP-2815 |
| OpenAccessLink | https://arxiv.org/abs/quant-ph/9901059 |
| ParticipantIDs | arxiv_primary_quant_ph_9901059 |
| PublicationCentury | 1900 |
| PublicationDate | 1999-01-19 |
| PublicationDateYYYYMMDD | 1999-01-19 |
| PublicationDate_xml | – month: 01 year: 1999 text: 1999-01-19 day: 19 |
| PublicationDecade | 1990 |
| PublicationYear | 1999 |
| Score | 1.284251 |
| SecondaryResourceType | preprint |
| Snippet | We consider the problem of inserting one item into a list of N-1 ordered
items. We previously showed that no quantum algorithm could solve this problem
in... |
| SourceID | arxiv |
| SourceType | Open Access Repository |
| SubjectTerms | Physics - Quantum Physics |
| Title | Invariant Quantum Algorithms for Insertion into an Ordered List |
| URI | https://arxiv.org/abs/quant-ph/9901059 |
| hasFullText | 1 |
| inHoldings | 1 |
| isFullTextHit | |
| isPrint | |
| link | http://utb.summon.serialssolutions.com/2.0.0/link/0/eLvHCXMwhV1NSwMxEA22Jy-iqPhZcvAabLLZzeZUilhbUYtQobclyezagk1Lv_DnO8nuQbx4zmQgL5B5w0zeEHKXV0GEJNEMSpsxmRrHbFVxliShO1dL7fLwwfn1LRt-yOdpOm0aZMNfGLP-nu9rfWC7wWQO3bPV7D5Ub5AItEhLiNC49TSe1s1aUZCr2fXXGvlmXPgVMAbH5KhherRfX80JOSj9KemN_B6zU_RA34Of3YL2vz6XmKHPFhuKBJKOfKiPI1p07rdLajwdr-NATfqCN3JGJoPHycOQNTMMmFFaMwXIYSAReZUpSFKXcWPAVjrNuXFGAwjpeKbBGWU4WB3Uu_LMSdAKHNhuck7afunLC0IRSyFNGWeGSS6sVTqtchApvlCWq-4l6cTTFqtapqKIcBSrWdHAcfWfwTU5rEUJOOP6hrS36115iyF3azsR8R-WsYYx |
| link.rule.ids | 228,230,783,888 |
| linkProvider | Cornell University |
| openUrl | ctx_ver=Z39.88-2004&ctx_enc=info%3Aofi%2Fenc%3AUTF-8&rfr_id=info%3Asid%2Fsummon.serialssolutions.com&rft_val_fmt=info%3Aofi%2Ffmt%3Akev%3Amtx%3Ajournal&rft.genre=article&rft.atitle=Invariant+Quantum+Algorithms+for+Insertion+into+an+Ordered+List&rft.au=Farhi%2C+Edward&rft.au=Goldstone%2C+Jeffrey&rft.au=Gutmann%2C+Sam&rft.au=Sipser%2C+Michael&rft.date=1999-01-19&rft_id=info:doi/10.48550%2Farxiv.quant-ph%2F9901059&rft.externalDocID=quant_ph_9901059 |