Hausdorff dimension of the set concerning with Borel-Bernstein theory in L\uroth expansions
-
-
저자
Luming Shen
-
제어번호
103363947
-
학술지명
대한수학회지
-
권호사항
Vol.
54
No.
4
[
2017
]
-
발행처
대한수학회
-
발행처 URL
http://www.kms.or.kr
-
자료유형
학술저널
-
수록면
1301-1316
-
언어
English
-
출판년도
2017
-
등재정보
KCI등재
-
소장기관
건국대학교 상허기념중앙도서관
경북대학교 중앙도서관
계명대학교 동산도서관
성균관대학교 삼성학술정보관
성균관대학교 삼성학술정보관
영남대학교 과학도서관
-
판매처
'
Hausdorff dimension of the set concerning with Borel-Bernstein theory in L\uroth expansions' 의 참고문헌
-
Zur metrischen Theorie der Lurothschen Entwicklungen der reellen Zahle
T. Salat
Czechoslovak Math. J 18 3 489-522
[1968]
-
Ueber eine eindeutige Entwichelung von Zahlen in eine unendliche Reihe
-
The fractional dimensional theory of continued fractions
I. J. Good
Proc. Cambridge Philos. Soc 37 199-228
[1941]
-
The fractional dimensional theory in Luroth expansion
L. M. Shen
Czechoslovak Math. J 61(136) 3 795-807
[2011]
-
Techniques in Fractal Geometry
-
Reprentations of Real Numbers by Infinite Series
-
On the fractional dimension of sets of continued fractions
-
On the error sum-function of Luroth series
L. M. Shen
J. Math. Anal. Appl 329 2 1440-1445
[2006]
-
On approximation by Luroth series
K. Dajani
J. Theor. Nombres Bordeaux 8 2 331-346
[1996]
-
Luroth series and their ergodic properties
H. Jager
Nederl. Akad. Wetensch. Proc. Ser. A 31 31-42
[1969]
-
Hausdorff dimension of certain sets arising in continued fraction expansions
-
Frequency of digits in the Luroth expansion
-
Fractal Geometry: Mathematical Foundations and Application
-
Ergodic Theory of Numbers
-
Ergodic Theory of Fibred Systems and Metric Number Theory
-
Dimension of Besicovitch-Eggleston sets in the countable symbolic space
-
A note on the largest digits in Luroth expansion
L. M. Shen
Int. J. Number Theory 10 4 1015-1023
[2014]
'
Hausdorff dimension of the set concerning with Borel-Bernstein theory in L\uroth expansions'
의 유사주제(
) 논문