Related references
Note: Only part of the references are listed.LCR and AFD of the Products of Nakagami-m and Nakagami-m Squared Random Variables: Application to Wireless Communications Through Relays
Caslav Stefanovic et al.
WIRELESS PERSONAL COMMUNICATIONS (2022)
On the Distribution of the Sum of Double-Nakagami-m Random Vectors and Application in Randomly Reconfigurable Surfaces
Sotiris A. Tegos et al.
IEEE TRANSACTIONS ON VEHICULAR TECHNOLOGY (2022)
Application of Gaussian Q-Function Approximations in Fluctuating Beckmann Fading Model
Supriya Aggarwal
NATIONAL ACADEMY SCIENCE LETTERS-INDIA (2021)
Automatic Fetal Ultrasound Standard Plane Recognition Based on Deep Learning and IIoT
Bin Pu et al.
IEEE TRANSACTIONS ON INDUSTRIAL INFORMATICS (2021)
UNIQ: Uniform Noise Injection for Non-Uniform Quantization of Neural Networks
Chaim Baskin et al.
ACM TRANSACTIONS ON COMPUTER SYSTEMS (2021)
Mathematical Interpolation and Correction of Three-Dimensional Modelling of High-Speed Railway
Jun Gao et al.
INTELLIGENT AUTOMATION AND SOFT COMPUTING (2020)
Novel Composite Approximation for the Gaussian Q-Function
Zoran H. Peric et al.
ELEKTRONIKA IR ELEKTROTECHNIKA (2020)
Class of tight bounds on the Q-function with closed-form upper bound on relative error
Zoran H. Peric et al.
MATHEMATICAL METHODS IN THE APPLIED SCIENCES (2019)
A Survey-cum-Tutorial on Approximations to Gaussian Q Function for Symbol Error Probability Analysis Over Nakagami-m Fading Channels
Supriya Aggarwal
IEEE COMMUNICATIONS SURVEYS AND TUTORIALS (2019)
An Improved Method for ASEP Evaluation over Fading Channels Based on Q-Function Approximation
Aleksandar V. Markovic et al.
IETE JOURNAL OF RESEARCH (2018)
Proposal of Simple and Accurate Two-Parametric Approximation for the Q-Function
Jelena Nikolic et al.
MATHEMATICAL PROBLEMS IN ENGINEERING (2017)
Tighter Bounds on the Gaussian Q Function and Its Application in Nakagami-m Fading Channel
Dharmendra Sadhwani et al.
IEEE WIRELESS COMMUNICATIONS LETTERS (2017)
Improved Composite Q-Function Approximation and its Application in ASEP of Digital Modulations over Fading Channels
Aleksandar Markovic et al.
ELEKTRONIKA IR ELEKTROTECHNIKA (2017)
Novel approximations for the Q -function with application in SQNR calculation
Jelena Nikolic et al.
DIGITAL SIGNAL PROCESSING (2017)
On Traffic-Aware Partition and Aggregation in MapReduce for Big Data Applications
Huan Ke et al.
IEEE TRANSACTIONS ON PARALLEL AND DISTRIBUTED SYSTEMS (2016)
Modeling and Analysis of Wireless Channels via the Mixture of Gaussian Distribution
Bassant Selim et al.
IEEE TRANSACTIONS ON VEHICULAR TECHNOLOGY (2016)
On approximating Mills ratio
Zhen-Hang Yang et al.
JOURNAL OF INEQUALITIES AND APPLICATIONS (2015)
Approximating Mills ratio
Armengol Gasull et al.
JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS (2014)
Average Level Crossing Rate of Dual Selection Diversity over Correlated Unbalanced Nakagami-m Fading Channels in the Presence of Cochannel Interference
Aleksandra S. Panajotovic et al.
IEEE COMMUNICATIONS LETTERS (2012)
Very Simple Tight Bounds on the Q-Function
Giuseppe Abreu
IEEE TRANSACTIONS ON COMMUNICATIONS (2012)
An Accurate and Efficient Approximation to the Gaussian Q-Function and its Applications in Performance Analysis in Nakagami-m Fading
Qinghua Shi et al.
IEEE COMMUNICATIONS LETTERS (2011)
A Simple Upper Bound of the Gaussian Q-Function with Closed-Form Error Bound
Won Mee Jang
IEEE COMMUNICATIONS LETTERS (2011)
An improved approximation for the Gaussian Q-function
George K. Karagiannidis et al.
IEEE COMMUNICATIONS LETTERS (2007)
Evaluation of Nakagami fading behaviour based on measurements in urban scenarios
Lorenzo Rubio et al.
AEU-INTERNATIONAL JOURNAL OF ELECTRONICS AND COMMUNICATIONS (2007)
On the crossing statistics of phase processes and random FM noise in Nakagami-q mobile fading channels
N Youssef et al.
IEEE TRANSACTIONS ON WIRELESS COMMUNICATIONS (2005)
New exponential bounds and approximations for the computation of error probability in fading channels
M Chiani et al.
IEEE TRANSACTIONS ON WIRELESS COMMUNICATIONS (2003)
Single integral representations of certain integer powers of the Gaussian Q-function and their application
MK Simon
IEEE COMMUNICATIONS LETTERS (2002)
Efficient computation of erfc(x) for large arguments
C Tellambura et al.
IEEE TRANSACTIONS ON COMMUNICATIONS (2000)