doi.org/10.1007/s00006-019-0969-9
Preview meta tags from the doi.org website.
Linked Hostnames
27- 96 links todoi.org
- 17 links toscholar.google.com
- 14 links tolink.springer.com
- 9 links towww.ams.org
- 9 links towww.springernature.com
- 4 links towww.emis.de
- 3 links toscholar.google.co.uk
- 3 links towww.ncbi.nlm.nih.gov
Thumbnail

Search Engine Appearance
https://doi.org/10.1007/s00006-019-0969-9
On Quaternion Equivalents for Quasi-Fibonacci Numbers, Shortly Quaternaccis - Advances in Applied Clifford Algebras
This paper is devoted to the newly defined families of associated sequences of real polynomials and numbers that arose on a base of quaternions. We present
Bing
On Quaternion Equivalents for Quasi-Fibonacci Numbers, Shortly Quaternaccis - Advances in Applied Clifford Algebras
https://doi.org/10.1007/s00006-019-0969-9
This paper is devoted to the newly defined families of associated sequences of real polynomials and numbers that arose on a base of quaternions. We present
DuckDuckGo
On Quaternion Equivalents for Quasi-Fibonacci Numbers, Shortly Quaternaccis - Advances in Applied Clifford Algebras
This paper is devoted to the newly defined families of associated sequences of real polynomials and numbers that arose on a base of quaternions. We present
General Meta Tags
99- titleOn Quaternion Equivalents for Quasi-Fibonacci Numbers, Shortly Quaternaccis | Advances in Applied Clifford Algebras
- charsetUTF-8
- X-UA-CompatibleIE=edge
- applicable-devicepc,mobile
- viewportwidth=device-width, initial-scale=1
Open Graph Meta Tags
6- og:urlhttps://link.springer.com/article/10.1007/s00006-019-0969-9
- og:typearticle
- og:site_nameSpringerLink
- og:titleOn Quaternion Equivalents for Quasi-Fibonacci Numbers, Shortly Quaternaccis - Advances in Applied Clifford Algebras
- og:descriptionThis paper is devoted to the newly defined families of associated sequences of real polynomials and numbers that arose on a base of quaternions. We present not only the explicit and recurrent formulae for these sequences, but also summation and reduction ones. Some (but not all) of these sequences can be found in OEIS. Moreover, the obtained results also speak a lot about the quaternions structure itself. Also, while examining matrices related to these sequences we discovered some general formulae for powers of so-called arrowhead matrices.
Twitter Meta Tags
6- twitter:site@SpringerLink
- twitter:cardsummary_large_image
- twitter:image:altContent cover image
- twitter:titleOn Quaternion Equivalents for Quasi-Fibonacci Numbers, Shortly Quaternaccis
- twitter:descriptionAdvances in Applied Clifford Algebras - This paper is devoted to the newly defined families of associated sequences of real polynomials and numbers that arose on a base of quaternions. We present...
Item Prop Meta Tags
3- position1
- position2
- position3
Link Tags
9- apple-touch-icon/oscar-static/img/favicons/darwin/apple-touch-icon-6ef0829b9c.png
- canonicalhttps://link.springer.com/article/10.1007/s00006-019-0969-9
- icon/oscar-static/img/favicons/darwin/android-chrome-192x192.png
- icon/oscar-static/img/favicons/darwin/favicon-32x32.png
- icon/oscar-static/img/favicons/darwin/favicon-16x16.png
Emails
1Links
178- http://adsabs.harvard.edu/cgi-bin/nph-data_query?link_type=ABSTRACT&bibcode=2016CSF....82....1T
- http://adsabs.harvard.edu/cgi-bin/nph-data_query?link_type=ABSTRACT&bibcode=2017CSF....98..178H
- http://arxiv.org/abs/1706.01454v4
- http://arxiv.org/abs/1707.03861v2
- http://scholar.google.com/scholar_lookup?&title=%24%24%5Cdelta%20%24%24%20%CE%B4%20-Fibonacci%20and%20%24%24%5Cdelta%20%24%24%20%CE%B4%20-Lucas%20numbers%2C%20%24%24%5Cdelta%20%24%24%20%CE%B4%20-Fibonacci%20and%20%24%24%5Cdelta%20%24%24%20%CE%B4%20-Lucas%20polynomials&journal=Math.%20Slovaca&volume=67&pages=51-70&publication_year=2017&author=Hetmaniok%2CE&author=Pleszczy%C5%84ski%2CM&author=S%C5%82ota%2CD&author=Witu%C5%82a%2CR