Journal article
Wronskians form the inverse system of the arcs of a double point
- Abstract:
- The ideal of the arc scheme of a double point or, equivalently, the differential ideal generated by the ideal of a double point is a primary ideal in an infinite-dimensional polynomial ring supported at the origin. This ideal has a rich combinatorial structure connecting it to singularity theory, partition identities, representation theory, and differential algebra. Macaulay inverse system is a powerful tool for studying the structure of primary ideals which describes an ideal in terms of certain linear differential operators. In the present paper, we show that the inverse system of the ideal of the arc scheme of a double point is precisely a vector space spanned by all the Wronskians of the variables and their formal derivatives. We then apply this characterization to extend our recent result on Poincaré-type series for such ideals.
- Publication status:
- Published
- Peer review status:
- Peer reviewed
Actions
Access Document
- Files:
-
-
(Preview, Version of record, pdf, 336.2KB, Terms of use)
-
- Publisher copy:
- 10.1007/s10801-025-01474-8
Authors
- Publisher:
- Springer
- Journal:
- Journal of Algebraic Combinatorics More from this journal
- Volume:
- 62
- Issue:
- 4
- Article number:
- 53
- Publication date:
- 2025-11-12
- Acceptance date:
- 2025-09-26
- DOI:
- EISSN:
-
1572-9192
- ISSN:
-
0925-9899
- Language:
-
English
- Keywords:
- Pubs id:
-
2348671
- Local pid:
-
pubs:2348671
- Source identifiers:
-
3465225
- Deposit date:
-
2025-11-12
- ARK identifier:
This ORA record was generated from metadata provided by an external service. It has not been edited by the ORA Team.
Terms of use
- Copyright date:
- 2025
- Licence:
- CC Attribution (CC BY)
If you are the owner of this record, you can report an update to it here: Report update to this record