@article{MTMT:1352977, title = {New bounds for the generalized Marcum Q-function}, url = {https://m2.mtmt.hu/api/publication/1352977}, author = {Baricz, Árpád and Sun, Yin}, doi = {10.1109/TIT.2009.2021370}, journal-iso = {IEEE T INFORM THEORY}, journal = {IEEE TRANSACTIONS ON INFORMATION THEORY}, volume = {55}, unique-id = {1352977}, issn = {0018-9448}, year = {2009}, eissn = {1557-9654}, pages = {3091-3100} } @article{MTMT:1352995, title = {Approximate average bit error probability for DQPSK over fading channels}, url = {https://m2.mtmt.hu/api/publication/1352995}, author = {Sun, Yin and Baricz, Árpád and Zhao, Ming and Xu, Xibin and Zhou, Shidong}, doi = {10.1049/el.2009.2467}, journal-iso = {ELECTRON LETT}, journal = {ELECTRONICS LETTERS}, volume = {45}, unique-id = {1352995}, issn = {0013-5194}, abstract = {The bit error probability (BEP) of DQPSK with Gray coding over an AWGN channel can be computed simply, although it is hard to integrate and derive the average BEP for fading channels. Presented are novel approximations of the average BEP of DQPSK with Gray coding over fading channels. Numerical results show that the novel formulations are quite accurate.}, year = {2009}, eissn = {1350-911X}, pages = {1177-1179} } @article{MTMT:1352982, title = {Inequalities for the generalized Marcum Q-function}, url = {https://m2.mtmt.hu/api/publication/1352982}, author = {Sun, Yin and Baricz, Árpád}, doi = {10.1016/j.amc.2008.04.009}, journal-iso = {APPL MATH COMPUT}, journal = {APPLIED MATHEMATICS AND COMPUTATION}, volume = {203}, unique-id = {1352982}, issn = {0096-3003}, year = {2008}, eissn = {1873-5649}, pages = {134-141} } @article{MTMT:1416251, title = {Grünbaum-type inequalities for special functions.}, url = {https://m2.mtmt.hu/api/publication/1416251}, author = {Baricz, Árpád}, journal-iso = {J INEQUAL PURE APPL MATH}, journal = {JOURNAL OF INEQUALITIES IN PURE AND APPLIED MATHEMATICS}, volume = {7}, unique-id = {1416251}, issn = {1443-5756}, abstract = {In this short note our aim is to establish some Grünbaum-type inequalities for the complementary error function, the incomplete gamma function and for Mills' ratio of the standard normal distribution, and of the gamma distribution, respectively.}, year = {2006}, pages = {1-8} }