Facta Universitatis-Series Mathematics and Informatics最新文献_第3页

REMARKS ON SUBMANIFOLDS AS ALMOST eta-RICCI-BOURGUIGNON SOLITONS 关于子流形几乎为埃塔-里奇-布吉尼翁孤子的注释

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Facta Universitatis-Series Mathematics and Informatics Pub Date : 2022-08-06 DOI: 10.22190/fumi220318027b

A. Blaga, Cihan Ozgur

引用次数: 1

BASIC APPLICATIONS OF THE q-DERIVATIVE FOR A GENERAL SUBFAMILY OF ANALYTIC FUNCTIONS SUBORDINATE TO k-JACOBSTHAL NUMBERS k- jacobthal数下解析函数一般子族的q导数的基本应用

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Facta Universitatis-Series Mathematics and Informatics Pub Date : 2022-08-06 DOI: 10.22190/fumi211201022a

c{S}ahsene Alti nkaya, Yeliz Kara, Yeşim Sağlam Özkan

引用次数: 0

ON CUBIC (alpha, beta)-METRICS IN FINSLER GEOMETRY 论三次(alpha, beta)-芬斯勒几何中的度量

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Facta Universitatis-Series Mathematics and Informatics Pub Date : 2022-08-06 DOI: 10.22190/fumi220323030t

Hosein Tondro Vishkaei, A. Tayebi

引用次数: 0

ON ZETA AND DIRICHLET BETA FUNCTION FAMILIES AS GENERATORS OF GENERALIZED MATHIEU SERIES, PROVIDING APPROXIMATION AND BOUNDS 关于和狄利克雷函数族作为广义马修级数的生成器，给出了近似和界

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Facta Universitatis-Series Mathematics and Informatics Pub Date : 2022-08-06 DOI: 10.22190/fumi210519018c

P. Cerone

引用次数: 1

CERTAIN RESULTS ON $eta$-RICCI SOLITIONS AND ALMOST $eta$-RICCI SOLITONS 关于$ $-里奇孤子和几乎$ $-里奇孤子的某些结果

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Facta Universitatis-Series Mathematics and Informatics Pub Date : 2022-08-06 DOI: 10.22190/fumi220210025d

S. Dey, S. Azami

引用次数: 0

STEPANOV $rho$-ALMOST PERIODIC FUNCTIONS IN GENERAL METRIC 一般度规中的概周期函数

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Facta Universitatis-Series Mathematics and Informatics Pub Date : 2022-08-06 DOI: 10.22190/fumi211217024k

M. Kostic

引用次数: 1

SOME CHARACTERIZATIONS OF α-COSYMPLECTIC MANIFOLDS ADMITTING ∗-CONFORMAL RICCI SOLITIONS 承认* -共形ricci解的α-余辛流形的一些性质

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Facta Universitatis-Series Mathematics and Informatics Pub Date : 2022-08-06 DOI: 10.22190/fumi220320028d

Sudipto Kumar Das, A. Sarkar

引用次数: 0

ON WARPED PRODUCT MANIFOLDS ADMITTING τ-QUASI RICCI-HARMONIC METRICS 关于允许τ-拟里奇调和度量的弯曲积流形

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Facta Universitatis-Series Mathematics and Informatics Pub Date : 2022-08-06 DOI: 10.22190/fumi211212023g

S. Günsen, L. Onat

引用次数: 0

A NEW NUMERICAL METHOD FOR SOLVING FRACTIONAL NEW NUMERICAL METHOD FOR SOLVING FRACTIONAL DIFFERENTIAL EQUATIONS IN THE SENSE OF CAPUTO-FABRIZIO DERIVATIVE 求解分数阶微分方程的一种新的数值方法，在caputo-fabrizio导数意义上

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Facta Universitatis-Series Mathematics and Informatics Pub Date : 2022-04-12 DOI: 10.22190/fumi210105006m

Leila Moghadam Dizaj Herik, M. Javidi, M. Shafiee

引用次数: 0

ON THE NUMBER OF CYCLES OF GRAPHS AND VC-DIMENSION 关于图的循环数和vc维

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Facta Universitatis-Series Mathematics and Informatics Pub Date : 2022-04-12 DOI: 10.22190/fumi210301011m

A. Mofidi

引用次数: 0